isl_pw_*_eval: fix type of variable
[isl.git] / isl_scheduler.c
blob6c7a951bc59edee3ef894213c47c6af5fd5b1190
1 /*
2 * Copyright 2011 INRIA Saclay
3 * Copyright 2012-2014 Ecole Normale Superieure
4 * Copyright 2015-2016 Sven Verdoolaege
5 * Copyright 2016 INRIA Paris
6 * Copyright 2017 Sven Verdoolaege
8 * Use of this software is governed by the MIT license
10 * Written by Sven Verdoolaege, INRIA Saclay - Ile-de-France,
11 * Parc Club Orsay Universite, ZAC des vignes, 4 rue Jacques Monod,
12 * 91893 Orsay, France
13 * and Ecole Normale Superieure, 45 rue d'Ulm, 75230 Paris, France
14 * and Centre de Recherche Inria de Paris, 2 rue Simone Iff - Voie DQ12,
15 * CS 42112, 75589 Paris Cedex 12, France
18 #include <isl_ctx_private.h>
19 #include <isl_map_private.h>
20 #include <isl_space_private.h>
21 #include <isl_aff_private.h>
22 #include <isl/hash.h>
23 #include <isl/constraint.h>
24 #include <isl/schedule.h>
25 #include <isl_schedule_constraints.h>
26 #include <isl/schedule_node.h>
27 #include <isl_mat_private.h>
28 #include <isl_vec_private.h>
29 #include <isl/set.h>
30 #include <isl_union_set_private.h>
31 #include <isl_seq.h>
32 #include <isl_tab.h>
33 #include <isl_dim_map.h>
34 #include <isl/map_to_basic_set.h>
35 #include <isl_sort.h>
36 #include <isl_options_private.h>
37 #include <isl_tarjan.h>
38 #include <isl_morph.h>
39 #include <isl/ilp.h>
40 #include <isl_val_private.h>
43 * The scheduling algorithm implemented in this file was inspired by
44 * Bondhugula et al., "Automatic Transformations for Communication-Minimized
45 * Parallelization and Locality Optimization in the Polyhedral Model".
47 * For a detailed description of the variant implemented in isl,
48 * see Verdoolaege and Janssens, "Scheduling for PPCG" (2017).
52 /* Internal information about a node that is used during the construction
53 * of a schedule.
54 * space represents the original space in which the domain lives;
55 * that is, the space is not affected by compression
56 * sched is a matrix representation of the schedule being constructed
57 * for this node; if compressed is set, then this schedule is
58 * defined over the compressed domain space
59 * sched_map is an isl_map representation of the same (partial) schedule
60 * sched_map may be NULL; if compressed is set, then this map
61 * is defined over the uncompressed domain space
62 * rank is the number of linearly independent rows in the linear part
63 * of sched
64 * the rows of "vmap" represent a change of basis for the node
65 * variables; the first rank rows span the linear part of
66 * the schedule rows; the remaining rows are linearly independent
67 * the rows of "indep" represent linear combinations of the schedule
68 * coefficients that are non-zero when the schedule coefficients are
69 * linearly independent of previously computed schedule rows.
70 * start is the first variable in the LP problem in the sequences that
71 * represents the schedule coefficients of this node
72 * nvar is the dimension of the (compressed) domain
73 * nparam is the number of parameters or 0 if we are not constructing
74 * a parametric schedule
76 * If compressed is set, then hull represents the constraints
77 * that were used to derive the compression, while compress and
78 * decompress map the original space to the compressed space and
79 * vice versa.
81 * scc is the index of SCC (or WCC) this node belongs to
83 * "cluster" is only used inside extract_clusters and identifies
84 * the cluster of SCCs that the node belongs to.
86 * coincident contains a boolean for each of the rows of the schedule,
87 * indicating whether the corresponding scheduling dimension satisfies
88 * the coincidence constraints in the sense that the corresponding
89 * dependence distances are zero.
91 * If the schedule_treat_coalescing option is set, then
92 * "sizes" contains the sizes of the (compressed) instance set
93 * in each direction. If there is no fixed size in a given direction,
94 * then the corresponding size value is set to infinity.
95 * If the schedule_treat_coalescing option or the schedule_max_coefficient
96 * option is set, then "max" contains the maximal values for
97 * schedule coefficients of the (compressed) variables. If no bound
98 * needs to be imposed on a particular variable, then the corresponding
99 * value is negative.
100 * If not NULL, then "bounds" contains a non-parametric set
101 * in the compressed space that is bounded by the size in each direction.
103 struct isl_sched_node {
104 isl_space *space;
105 int compressed;
106 isl_set *hull;
107 isl_multi_aff *compress;
108 isl_multi_aff *decompress;
109 isl_mat *sched;
110 isl_map *sched_map;
111 int rank;
112 isl_mat *indep;
113 isl_mat *vmap;
114 int start;
115 int nvar;
116 int nparam;
118 int scc;
119 int cluster;
121 int *coincident;
123 isl_multi_val *sizes;
124 isl_basic_set *bounds;
125 isl_vec *max;
128 static int node_has_tuples(const void *entry, const void *val)
130 struct isl_sched_node *node = (struct isl_sched_node *)entry;
131 isl_space *space = (isl_space *) val;
133 return isl_space_has_equal_tuples(node->space, space);
136 static int node_scc_exactly(struct isl_sched_node *node, int scc)
138 return node->scc == scc;
141 static int node_scc_at_most(struct isl_sched_node *node, int scc)
143 return node->scc <= scc;
146 static int node_scc_at_least(struct isl_sched_node *node, int scc)
148 return node->scc >= scc;
151 /* An edge in the dependence graph. An edge may be used to
152 * ensure validity of the generated schedule, to minimize the dependence
153 * distance or both
155 * map is the dependence relation, with i -> j in the map if j depends on i
156 * tagged_condition and tagged_validity contain the union of all tagged
157 * condition or conditional validity dependence relations that
158 * specialize the dependence relation "map"; that is,
159 * if (i -> a) -> (j -> b) is an element of "tagged_condition"
160 * or "tagged_validity", then i -> j is an element of "map".
161 * If these fields are NULL, then they represent the empty relation.
162 * src is the source node
163 * dst is the sink node
165 * types is a bit vector containing the types of this edge.
166 * validity is set if the edge is used to ensure correctness
167 * coincidence is used to enforce zero dependence distances
168 * proximity is set if the edge is used to minimize dependence distances
169 * condition is set if the edge represents a condition
170 * for a conditional validity schedule constraint
171 * local can only be set for condition edges and indicates that
172 * the dependence distance over the edge should be zero
173 * conditional_validity is set if the edge is used to conditionally
174 * ensure correctness
176 * For validity edges, start and end mark the sequence of inequality
177 * constraints in the LP problem that encode the validity constraint
178 * corresponding to this edge.
180 * During clustering, an edge may be marked "no_merge" if it should
181 * not be used to merge clusters.
182 * The weight is also only used during clustering and it is
183 * an indication of how many schedule dimensions on either side
184 * of the schedule constraints can be aligned.
185 * If the weight is negative, then this means that this edge was postponed
186 * by has_bounded_distances or any_no_merge. The original weight can
187 * be retrieved by adding 1 + graph->max_weight, with "graph"
188 * the graph containing this edge.
190 struct isl_sched_edge {
191 isl_map *map;
192 isl_union_map *tagged_condition;
193 isl_union_map *tagged_validity;
195 struct isl_sched_node *src;
196 struct isl_sched_node *dst;
198 unsigned types;
200 int start;
201 int end;
203 int no_merge;
204 int weight;
207 /* Is "edge" marked as being of type "type"?
209 static int is_type(struct isl_sched_edge *edge, enum isl_edge_type type)
211 return ISL_FL_ISSET(edge->types, 1 << type);
214 /* Mark "edge" as being of type "type".
216 static void set_type(struct isl_sched_edge *edge, enum isl_edge_type type)
218 ISL_FL_SET(edge->types, 1 << type);
221 /* No longer mark "edge" as being of type "type"?
223 static void clear_type(struct isl_sched_edge *edge, enum isl_edge_type type)
225 ISL_FL_CLR(edge->types, 1 << type);
228 /* Is "edge" marked as a validity edge?
230 static int is_validity(struct isl_sched_edge *edge)
232 return is_type(edge, isl_edge_validity);
235 /* Mark "edge" as a validity edge.
237 static void set_validity(struct isl_sched_edge *edge)
239 set_type(edge, isl_edge_validity);
242 /* Is "edge" marked as a proximity edge?
244 static int is_proximity(struct isl_sched_edge *edge)
246 return is_type(edge, isl_edge_proximity);
249 /* Is "edge" marked as a local edge?
251 static int is_local(struct isl_sched_edge *edge)
253 return is_type(edge, isl_edge_local);
256 /* Mark "edge" as a local edge.
258 static void set_local(struct isl_sched_edge *edge)
260 set_type(edge, isl_edge_local);
263 /* No longer mark "edge" as a local edge.
265 static void clear_local(struct isl_sched_edge *edge)
267 clear_type(edge, isl_edge_local);
270 /* Is "edge" marked as a coincidence edge?
272 static int is_coincidence(struct isl_sched_edge *edge)
274 return is_type(edge, isl_edge_coincidence);
277 /* Is "edge" marked as a condition edge?
279 static int is_condition(struct isl_sched_edge *edge)
281 return is_type(edge, isl_edge_condition);
284 /* Is "edge" marked as a conditional validity edge?
286 static int is_conditional_validity(struct isl_sched_edge *edge)
288 return is_type(edge, isl_edge_conditional_validity);
291 /* Is "edge" of a type that can appear multiple times between
292 * the same pair of nodes?
294 * Condition edges and conditional validity edges may have tagged
295 * dependence relations, in which case an edge is added for each
296 * pair of tags.
298 static int is_multi_edge_type(struct isl_sched_edge *edge)
300 return is_condition(edge) || is_conditional_validity(edge);
303 /* Internal information about the dependence graph used during
304 * the construction of the schedule.
306 * intra_hmap is a cache, mapping dependence relations to their dual,
307 * for dependences from a node to itself, possibly without
308 * coefficients for the parameters
309 * intra_hmap_param is a cache, mapping dependence relations to their dual,
310 * for dependences from a node to itself, including coefficients
311 * for the parameters
312 * inter_hmap is a cache, mapping dependence relations to their dual,
313 * for dependences between distinct nodes
314 * if compression is involved then the key for these maps
315 * is the original, uncompressed dependence relation, while
316 * the value is the dual of the compressed dependence relation.
318 * n is the number of nodes
319 * node is the list of nodes
320 * maxvar is the maximal number of variables over all nodes
321 * max_row is the allocated number of rows in the schedule
322 * n_row is the current (maximal) number of linearly independent
323 * rows in the node schedules
324 * n_total_row is the current number of rows in the node schedules
325 * band_start is the starting row in the node schedules of the current band
326 * root is set to the original dependence graph from which this graph
327 * is derived through splitting. If this graph is not the result of
328 * splitting, then the root field points to the graph itself.
330 * sorted contains a list of node indices sorted according to the
331 * SCC to which a node belongs
333 * n_edge is the number of edges
334 * edge is the list of edges
335 * max_edge contains the maximal number of edges of each type;
336 * in particular, it contains the number of edges in the inital graph.
337 * edge_table contains pointers into the edge array, hashed on the source
338 * and sink spaces; there is one such table for each type;
339 * a given edge may be referenced from more than one table
340 * if the corresponding relation appears in more than one of the
341 * sets of dependences; however, for each type there is only
342 * a single edge between a given pair of source and sink space
343 * in the entire graph
345 * node_table contains pointers into the node array, hashed on the space tuples
347 * region contains a list of variable sequences that should be non-trivial
349 * lp contains the (I)LP problem used to obtain new schedule rows
351 * src_scc and dst_scc are the source and sink SCCs of an edge with
352 * conflicting constraints
354 * scc represents the number of components
355 * weak is set if the components are weakly connected
357 * max_weight is used during clustering and represents the maximal
358 * weight of the relevant proximity edges.
360 struct isl_sched_graph {
361 isl_map_to_basic_set *intra_hmap;
362 isl_map_to_basic_set *intra_hmap_param;
363 isl_map_to_basic_set *inter_hmap;
365 struct isl_sched_node *node;
366 int n;
367 int maxvar;
368 int max_row;
369 int n_row;
371 int *sorted;
373 int n_total_row;
374 int band_start;
376 struct isl_sched_graph *root;
378 struct isl_sched_edge *edge;
379 int n_edge;
380 int max_edge[isl_edge_last + 1];
381 struct isl_hash_table *edge_table[isl_edge_last + 1];
383 struct isl_hash_table *node_table;
384 struct isl_trivial_region *region;
386 isl_basic_set *lp;
388 int src_scc;
389 int dst_scc;
391 int scc;
392 int weak;
394 int max_weight;
397 /* Initialize node_table based on the list of nodes.
399 static int graph_init_table(isl_ctx *ctx, struct isl_sched_graph *graph)
401 int i;
403 graph->node_table = isl_hash_table_alloc(ctx, graph->n);
404 if (!graph->node_table)
405 return -1;
407 for (i = 0; i < graph->n; ++i) {
408 struct isl_hash_table_entry *entry;
409 uint32_t hash;
411 hash = isl_space_get_tuple_hash(graph->node[i].space);
412 entry = isl_hash_table_find(ctx, graph->node_table, hash,
413 &node_has_tuples,
414 graph->node[i].space, 1);
415 if (!entry)
416 return -1;
417 entry->data = &graph->node[i];
420 return 0;
423 /* Return a pointer to the node that lives within the given space,
424 * an invalid node if there is no such node, or NULL in case of error.
426 static struct isl_sched_node *graph_find_node(isl_ctx *ctx,
427 struct isl_sched_graph *graph, __isl_keep isl_space *space)
429 struct isl_hash_table_entry *entry;
430 uint32_t hash;
432 if (!space)
433 return NULL;
435 hash = isl_space_get_tuple_hash(space);
436 entry = isl_hash_table_find(ctx, graph->node_table, hash,
437 &node_has_tuples, space, 0);
439 return entry ? entry->data : graph->node + graph->n;
442 /* Is "node" a node in "graph"?
444 static int is_node(struct isl_sched_graph *graph,
445 struct isl_sched_node *node)
447 return node && node >= &graph->node[0] && node < &graph->node[graph->n];
450 static int edge_has_src_and_dst(const void *entry, const void *val)
452 const struct isl_sched_edge *edge = entry;
453 const struct isl_sched_edge *temp = val;
455 return edge->src == temp->src && edge->dst == temp->dst;
458 /* Add the given edge to graph->edge_table[type].
460 static isl_stat graph_edge_table_add(isl_ctx *ctx,
461 struct isl_sched_graph *graph, enum isl_edge_type type,
462 struct isl_sched_edge *edge)
464 struct isl_hash_table_entry *entry;
465 uint32_t hash;
467 hash = isl_hash_init();
468 hash = isl_hash_builtin(hash, edge->src);
469 hash = isl_hash_builtin(hash, edge->dst);
470 entry = isl_hash_table_find(ctx, graph->edge_table[type], hash,
471 &edge_has_src_and_dst, edge, 1);
472 if (!entry)
473 return isl_stat_error;
474 entry->data = edge;
476 return isl_stat_ok;
479 /* Add "edge" to all relevant edge tables.
480 * That is, for every type of the edge, add it to the corresponding table.
482 static isl_stat graph_edge_tables_add(isl_ctx *ctx,
483 struct isl_sched_graph *graph, struct isl_sched_edge *edge)
485 enum isl_edge_type t;
487 for (t = isl_edge_first; t <= isl_edge_last; ++t) {
488 if (!is_type(edge, t))
489 continue;
490 if (graph_edge_table_add(ctx, graph, t, edge) < 0)
491 return isl_stat_error;
494 return isl_stat_ok;
497 /* Allocate the edge_tables based on the maximal number of edges of
498 * each type.
500 static int graph_init_edge_tables(isl_ctx *ctx, struct isl_sched_graph *graph)
502 int i;
504 for (i = 0; i <= isl_edge_last; ++i) {
505 graph->edge_table[i] = isl_hash_table_alloc(ctx,
506 graph->max_edge[i]);
507 if (!graph->edge_table[i])
508 return -1;
511 return 0;
514 /* If graph->edge_table[type] contains an edge from the given source
515 * to the given destination, then return the hash table entry of this edge.
516 * Otherwise, return NULL.
518 static struct isl_hash_table_entry *graph_find_edge_entry(
519 struct isl_sched_graph *graph,
520 enum isl_edge_type type,
521 struct isl_sched_node *src, struct isl_sched_node *dst)
523 isl_ctx *ctx = isl_space_get_ctx(src->space);
524 uint32_t hash;
525 struct isl_sched_edge temp = { .src = src, .dst = dst };
527 hash = isl_hash_init();
528 hash = isl_hash_builtin(hash, temp.src);
529 hash = isl_hash_builtin(hash, temp.dst);
530 return isl_hash_table_find(ctx, graph->edge_table[type], hash,
531 &edge_has_src_and_dst, &temp, 0);
535 /* If graph->edge_table[type] contains an edge from the given source
536 * to the given destination, then return this edge.
537 * Otherwise, return NULL.
539 static struct isl_sched_edge *graph_find_edge(struct isl_sched_graph *graph,
540 enum isl_edge_type type,
541 struct isl_sched_node *src, struct isl_sched_node *dst)
543 struct isl_hash_table_entry *entry;
545 entry = graph_find_edge_entry(graph, type, src, dst);
546 if (!entry)
547 return NULL;
549 return entry->data;
552 /* Check whether the dependence graph has an edge of the given type
553 * between the given two nodes.
555 static isl_bool graph_has_edge(struct isl_sched_graph *graph,
556 enum isl_edge_type type,
557 struct isl_sched_node *src, struct isl_sched_node *dst)
559 struct isl_sched_edge *edge;
560 isl_bool empty;
562 edge = graph_find_edge(graph, type, src, dst);
563 if (!edge)
564 return 0;
566 empty = isl_map_plain_is_empty(edge->map);
567 if (empty < 0)
568 return isl_bool_error;
570 return !empty;
573 /* Look for any edge with the same src, dst and map fields as "model".
575 * Return the matching edge if one can be found.
576 * Return "model" if no matching edge is found.
577 * Return NULL on error.
579 static struct isl_sched_edge *graph_find_matching_edge(
580 struct isl_sched_graph *graph, struct isl_sched_edge *model)
582 enum isl_edge_type i;
583 struct isl_sched_edge *edge;
585 for (i = isl_edge_first; i <= isl_edge_last; ++i) {
586 int is_equal;
588 edge = graph_find_edge(graph, i, model->src, model->dst);
589 if (!edge)
590 continue;
591 is_equal = isl_map_plain_is_equal(model->map, edge->map);
592 if (is_equal < 0)
593 return NULL;
594 if (is_equal)
595 return edge;
598 return model;
601 /* Remove the given edge from all the edge_tables that refer to it.
603 static void graph_remove_edge(struct isl_sched_graph *graph,
604 struct isl_sched_edge *edge)
606 isl_ctx *ctx = isl_map_get_ctx(edge->map);
607 enum isl_edge_type i;
609 for (i = isl_edge_first; i <= isl_edge_last; ++i) {
610 struct isl_hash_table_entry *entry;
612 entry = graph_find_edge_entry(graph, i, edge->src, edge->dst);
613 if (!entry)
614 continue;
615 if (entry->data != edge)
616 continue;
617 isl_hash_table_remove(ctx, graph->edge_table[i], entry);
621 /* Check whether the dependence graph has any edge
622 * between the given two nodes.
624 static isl_bool graph_has_any_edge(struct isl_sched_graph *graph,
625 struct isl_sched_node *src, struct isl_sched_node *dst)
627 enum isl_edge_type i;
628 isl_bool r;
630 for (i = isl_edge_first; i <= isl_edge_last; ++i) {
631 r = graph_has_edge(graph, i, src, dst);
632 if (r < 0 || r)
633 return r;
636 return r;
639 /* Check whether the dependence graph has a validity edge
640 * between the given two nodes.
642 * Conditional validity edges are essentially validity edges that
643 * can be ignored if the corresponding condition edges are iteration private.
644 * Here, we are only checking for the presence of validity
645 * edges, so we need to consider the conditional validity edges too.
646 * In particular, this function is used during the detection
647 * of strongly connected components and we cannot ignore
648 * conditional validity edges during this detection.
650 static isl_bool graph_has_validity_edge(struct isl_sched_graph *graph,
651 struct isl_sched_node *src, struct isl_sched_node *dst)
653 isl_bool r;
655 r = graph_has_edge(graph, isl_edge_validity, src, dst);
656 if (r < 0 || r)
657 return r;
659 return graph_has_edge(graph, isl_edge_conditional_validity, src, dst);
662 /* Perform all the required memory allocations for a schedule graph "graph"
663 * with "n_node" nodes and "n_edge" edge and initialize the corresponding
664 * fields.
666 static isl_stat graph_alloc(isl_ctx *ctx, struct isl_sched_graph *graph,
667 int n_node, int n_edge)
669 int i;
671 graph->n = n_node;
672 graph->n_edge = n_edge;
673 graph->node = isl_calloc_array(ctx, struct isl_sched_node, graph->n);
674 graph->sorted = isl_calloc_array(ctx, int, graph->n);
675 graph->region = isl_alloc_array(ctx,
676 struct isl_trivial_region, graph->n);
677 graph->edge = isl_calloc_array(ctx,
678 struct isl_sched_edge, graph->n_edge);
680 graph->intra_hmap = isl_map_to_basic_set_alloc(ctx, 2 * n_edge);
681 graph->intra_hmap_param = isl_map_to_basic_set_alloc(ctx, 2 * n_edge);
682 graph->inter_hmap = isl_map_to_basic_set_alloc(ctx, 2 * n_edge);
684 if (!graph->node || !graph->region || (graph->n_edge && !graph->edge) ||
685 !graph->sorted)
686 return isl_stat_error;
688 for(i = 0; i < graph->n; ++i)
689 graph->sorted[i] = i;
691 return isl_stat_ok;
694 /* Free the memory associated to node "node" in "graph".
695 * The "coincident" field is shared by nodes in a graph and its subgraph.
696 * It therefore only needs to be freed for the original dependence graph,
697 * i.e., one that is not the result of splitting.
699 static void clear_node(struct isl_sched_graph *graph,
700 struct isl_sched_node *node)
702 isl_space_free(node->space);
703 isl_set_free(node->hull);
704 isl_multi_aff_free(node->compress);
705 isl_multi_aff_free(node->decompress);
706 isl_mat_free(node->sched);
707 isl_map_free(node->sched_map);
708 isl_mat_free(node->indep);
709 isl_mat_free(node->vmap);
710 if (graph->root == graph)
711 free(node->coincident);
712 isl_multi_val_free(node->sizes);
713 isl_basic_set_free(node->bounds);
714 isl_vec_free(node->max);
717 static void graph_free(isl_ctx *ctx, struct isl_sched_graph *graph)
719 int i;
721 isl_map_to_basic_set_free(graph->intra_hmap);
722 isl_map_to_basic_set_free(graph->intra_hmap_param);
723 isl_map_to_basic_set_free(graph->inter_hmap);
725 if (graph->node)
726 for (i = 0; i < graph->n; ++i)
727 clear_node(graph, &graph->node[i]);
728 free(graph->node);
729 free(graph->sorted);
730 if (graph->edge)
731 for (i = 0; i < graph->n_edge; ++i) {
732 isl_map_free(graph->edge[i].map);
733 isl_union_map_free(graph->edge[i].tagged_condition);
734 isl_union_map_free(graph->edge[i].tagged_validity);
736 free(graph->edge);
737 free(graph->region);
738 for (i = 0; i <= isl_edge_last; ++i)
739 isl_hash_table_free(ctx, graph->edge_table[i]);
740 isl_hash_table_free(ctx, graph->node_table);
741 isl_basic_set_free(graph->lp);
744 /* For each "set" on which this function is called, increment
745 * graph->n by one and update graph->maxvar.
747 static isl_stat init_n_maxvar(__isl_take isl_set *set, void *user)
749 struct isl_sched_graph *graph = user;
750 int nvar = isl_set_dim(set, isl_dim_set);
752 graph->n++;
753 if (nvar > graph->maxvar)
754 graph->maxvar = nvar;
756 isl_set_free(set);
758 return isl_stat_ok;
761 /* Compute the number of rows that should be allocated for the schedule.
762 * In particular, we need one row for each variable or one row
763 * for each basic map in the dependences.
764 * Note that it is practically impossible to exhaust both
765 * the number of dependences and the number of variables.
767 static isl_stat compute_max_row(struct isl_sched_graph *graph,
768 __isl_keep isl_schedule_constraints *sc)
770 int n_edge;
771 isl_stat r;
772 isl_union_set *domain;
774 graph->n = 0;
775 graph->maxvar = 0;
776 domain = isl_schedule_constraints_get_domain(sc);
777 r = isl_union_set_foreach_set(domain, &init_n_maxvar, graph);
778 isl_union_set_free(domain);
779 if (r < 0)
780 return isl_stat_error;
781 n_edge = isl_schedule_constraints_n_basic_map(sc);
782 if (n_edge < 0)
783 return isl_stat_error;
784 graph->max_row = n_edge + graph->maxvar;
786 return isl_stat_ok;
789 /* Does "bset" have any defining equalities for its set variables?
791 static isl_bool has_any_defining_equality(__isl_keep isl_basic_set *bset)
793 int i, n;
795 if (!bset)
796 return isl_bool_error;
798 n = isl_basic_set_dim(bset, isl_dim_set);
799 for (i = 0; i < n; ++i) {
800 isl_bool has;
802 has = isl_basic_set_has_defining_equality(bset, isl_dim_set, i,
803 NULL);
804 if (has < 0 || has)
805 return has;
808 return isl_bool_false;
811 /* Set the entries of node->max to the value of the schedule_max_coefficient
812 * option, if set.
814 static isl_stat set_max_coefficient(isl_ctx *ctx, struct isl_sched_node *node)
816 int max;
818 max = isl_options_get_schedule_max_coefficient(ctx);
819 if (max == -1)
820 return isl_stat_ok;
822 node->max = isl_vec_alloc(ctx, node->nvar);
823 node->max = isl_vec_set_si(node->max, max);
824 if (!node->max)
825 return isl_stat_error;
827 return isl_stat_ok;
830 /* Set the entries of node->max to the minimum of the schedule_max_coefficient
831 * option (if set) and half of the minimum of the sizes in the other
832 * dimensions. Round up when computing the half such that
833 * if the minimum of the sizes is one, half of the size is taken to be one
834 * rather than zero.
835 * If the global minimum is unbounded (i.e., if both
836 * the schedule_max_coefficient is not set and the sizes in the other
837 * dimensions are unbounded), then store a negative value.
838 * If the schedule coefficient is close to the size of the instance set
839 * in another dimension, then the schedule may represent a loop
840 * coalescing transformation (especially if the coefficient
841 * in that other dimension is one). Forcing the coefficient to be
842 * smaller than or equal to half the minimal size should avoid this
843 * situation.
845 static isl_stat compute_max_coefficient(isl_ctx *ctx,
846 struct isl_sched_node *node)
848 int max;
849 int i, j;
850 isl_vec *v;
852 max = isl_options_get_schedule_max_coefficient(ctx);
853 v = isl_vec_alloc(ctx, node->nvar);
854 if (!v)
855 return isl_stat_error;
857 for (i = 0; i < node->nvar; ++i) {
858 isl_int_set_si(v->el[i], max);
859 isl_int_mul_si(v->el[i], v->el[i], 2);
862 for (i = 0; i < node->nvar; ++i) {
863 isl_val *size;
865 size = isl_multi_val_get_val(node->sizes, i);
866 if (!size)
867 goto error;
868 if (!isl_val_is_int(size)) {
869 isl_val_free(size);
870 continue;
872 for (j = 0; j < node->nvar; ++j) {
873 if (j == i)
874 continue;
875 if (isl_int_is_neg(v->el[j]) ||
876 isl_int_gt(v->el[j], size->n))
877 isl_int_set(v->el[j], size->n);
879 isl_val_free(size);
882 for (i = 0; i < node->nvar; ++i)
883 isl_int_cdiv_q_ui(v->el[i], v->el[i], 2);
885 node->max = v;
886 return isl_stat_ok;
887 error:
888 isl_vec_free(v);
889 return isl_stat_error;
892 /* Compute and return the size of "set" in dimension "dim".
893 * The size is taken to be the difference in values for that variable
894 * for fixed values of the other variables.
895 * This assumes that "set" is convex.
896 * In particular, the variable is first isolated from the other variables
897 * in the range of a map
899 * [i_0, ..., i_dim-1, i_dim+1, ...] -> [i_dim]
901 * and then duplicated
903 * [i_0, ..., i_dim-1, i_dim+1, ...] -> [[i_dim] -> [i_dim']]
905 * The shared variables are then projected out and the maximal value
906 * of i_dim' - i_dim is computed.
908 static __isl_give isl_val *compute_size(__isl_take isl_set *set, int dim)
910 isl_map *map;
911 isl_local_space *ls;
912 isl_aff *obj;
913 isl_val *v;
915 map = isl_set_project_onto_map(set, isl_dim_set, dim, 1);
916 map = isl_map_project_out(map, isl_dim_in, dim, 1);
917 map = isl_map_range_product(map, isl_map_copy(map));
918 map = isl_set_unwrap(isl_map_range(map));
919 set = isl_map_deltas(map);
920 ls = isl_local_space_from_space(isl_set_get_space(set));
921 obj = isl_aff_var_on_domain(ls, isl_dim_set, 0);
922 v = isl_set_max_val(set, obj);
923 isl_aff_free(obj);
924 isl_set_free(set);
926 return v;
929 /* Compute the size of the instance set "set" of "node", after compression,
930 * as well as bounds on the corresponding coefficients, if needed.
932 * The sizes are needed when the schedule_treat_coalescing option is set.
933 * The bounds are needed when the schedule_treat_coalescing option or
934 * the schedule_max_coefficient option is set.
936 * If the schedule_treat_coalescing option is not set, then at most
937 * the bounds need to be set and this is done in set_max_coefficient.
938 * Otherwise, compress the domain if needed, compute the size
939 * in each direction and store the results in node->size.
940 * If the domain is not convex, then the sizes are computed
941 * on a convex superset in order to avoid picking up sizes
942 * that are valid for the individual disjuncts, but not for
943 * the domain as a whole.
944 * Finally, set the bounds on the coefficients based on the sizes
945 * and the schedule_max_coefficient option in compute_max_coefficient.
947 static isl_stat compute_sizes_and_max(isl_ctx *ctx, struct isl_sched_node *node,
948 __isl_take isl_set *set)
950 int j, n;
951 isl_multi_val *mv;
953 if (!isl_options_get_schedule_treat_coalescing(ctx)) {
954 isl_set_free(set);
955 return set_max_coefficient(ctx, node);
958 if (node->compressed)
959 set = isl_set_preimage_multi_aff(set,
960 isl_multi_aff_copy(node->decompress));
961 set = isl_set_from_basic_set(isl_set_simple_hull(set));
962 mv = isl_multi_val_zero(isl_set_get_space(set));
963 n = isl_set_dim(set, isl_dim_set);
964 for (j = 0; j < n; ++j) {
965 isl_val *v;
967 v = compute_size(isl_set_copy(set), j);
968 mv = isl_multi_val_set_val(mv, j, v);
970 node->sizes = mv;
971 isl_set_free(set);
972 if (!node->sizes)
973 return isl_stat_error;
974 return compute_max_coefficient(ctx, node);
977 /* Add a new node to the graph representing the given instance set.
978 * "nvar" is the (possibly compressed) number of variables and
979 * may be smaller than then number of set variables in "set"
980 * if "compressed" is set.
981 * If "compressed" is set, then "hull" represents the constraints
982 * that were used to derive the compression, while "compress" and
983 * "decompress" map the original space to the compressed space and
984 * vice versa.
985 * If "compressed" is not set, then "hull", "compress" and "decompress"
986 * should be NULL.
988 * Compute the size of the instance set and bounds on the coefficients,
989 * if needed.
991 static isl_stat add_node(struct isl_sched_graph *graph,
992 __isl_take isl_set *set, int nvar, int compressed,
993 __isl_take isl_set *hull, __isl_take isl_multi_aff *compress,
994 __isl_take isl_multi_aff *decompress)
996 int nparam;
997 isl_ctx *ctx;
998 isl_mat *sched;
999 isl_space *space;
1000 int *coincident;
1001 struct isl_sched_node *node;
1003 if (!set)
1004 return isl_stat_error;
1006 ctx = isl_set_get_ctx(set);
1007 nparam = isl_set_dim(set, isl_dim_param);
1008 if (!ctx->opt->schedule_parametric)
1009 nparam = 0;
1010 sched = isl_mat_alloc(ctx, 0, 1 + nparam + nvar);
1011 node = &graph->node[graph->n];
1012 graph->n++;
1013 space = isl_set_get_space(set);
1014 node->space = space;
1015 node->nvar = nvar;
1016 node->nparam = nparam;
1017 node->sched = sched;
1018 node->sched_map = NULL;
1019 coincident = isl_calloc_array(ctx, int, graph->max_row);
1020 node->coincident = coincident;
1021 node->compressed = compressed;
1022 node->hull = hull;
1023 node->compress = compress;
1024 node->decompress = decompress;
1025 if (compute_sizes_and_max(ctx, node, set) < 0)
1026 return isl_stat_error;
1028 if (!space || !sched || (graph->max_row && !coincident))
1029 return isl_stat_error;
1030 if (compressed && (!hull || !compress || !decompress))
1031 return isl_stat_error;
1033 return isl_stat_ok;
1036 /* Construct an identifier for node "node", which will represent "set".
1037 * The name of the identifier is either "compressed" or
1038 * "compressed_<name>", with <name> the name of the space of "set".
1039 * The user pointer of the identifier points to "node".
1041 static __isl_give isl_id *construct_compressed_id(__isl_keep isl_set *set,
1042 struct isl_sched_node *node)
1044 isl_bool has_name;
1045 isl_ctx *ctx;
1046 isl_id *id;
1047 isl_printer *p;
1048 const char *name;
1049 char *id_name;
1051 has_name = isl_set_has_tuple_name(set);
1052 if (has_name < 0)
1053 return NULL;
1055 ctx = isl_set_get_ctx(set);
1056 if (!has_name)
1057 return isl_id_alloc(ctx, "compressed", node);
1059 p = isl_printer_to_str(ctx);
1060 name = isl_set_get_tuple_name(set);
1061 p = isl_printer_print_str(p, "compressed_");
1062 p = isl_printer_print_str(p, name);
1063 id_name = isl_printer_get_str(p);
1064 isl_printer_free(p);
1066 id = isl_id_alloc(ctx, id_name, node);
1067 free(id_name);
1069 return id;
1072 /* Add a new node to the graph representing the given set.
1074 * If any of the set variables is defined by an equality, then
1075 * we perform variable compression such that we can perform
1076 * the scheduling on the compressed domain.
1077 * In this case, an identifier is used that references the new node
1078 * such that each compressed space is unique and
1079 * such that the node can be recovered from the compressed space.
1081 static isl_stat extract_node(__isl_take isl_set *set, void *user)
1083 int nvar;
1084 isl_bool has_equality;
1085 isl_id *id;
1086 isl_basic_set *hull;
1087 isl_set *hull_set;
1088 isl_morph *morph;
1089 isl_multi_aff *compress, *decompress;
1090 struct isl_sched_graph *graph = user;
1092 hull = isl_set_affine_hull(isl_set_copy(set));
1093 hull = isl_basic_set_remove_divs(hull);
1094 nvar = isl_set_dim(set, isl_dim_set);
1095 has_equality = has_any_defining_equality(hull);
1097 if (has_equality < 0)
1098 goto error;
1099 if (!has_equality) {
1100 isl_basic_set_free(hull);
1101 return add_node(graph, set, nvar, 0, NULL, NULL, NULL);
1104 id = construct_compressed_id(set, &graph->node[graph->n]);
1105 morph = isl_basic_set_variable_compression_with_id(hull,
1106 isl_dim_set, id);
1107 isl_id_free(id);
1108 nvar = isl_morph_ran_dim(morph, isl_dim_set);
1109 compress = isl_morph_get_var_multi_aff(morph);
1110 morph = isl_morph_inverse(morph);
1111 decompress = isl_morph_get_var_multi_aff(morph);
1112 isl_morph_free(morph);
1114 hull_set = isl_set_from_basic_set(hull);
1115 return add_node(graph, set, nvar, 1, hull_set, compress, decompress);
1116 error:
1117 isl_basic_set_free(hull);
1118 isl_set_free(set);
1119 return isl_stat_error;
1122 struct isl_extract_edge_data {
1123 enum isl_edge_type type;
1124 struct isl_sched_graph *graph;
1127 /* Merge edge2 into edge1, freeing the contents of edge2.
1128 * Return 0 on success and -1 on failure.
1130 * edge1 and edge2 are assumed to have the same value for the map field.
1132 static int merge_edge(struct isl_sched_edge *edge1,
1133 struct isl_sched_edge *edge2)
1135 edge1->types |= edge2->types;
1136 isl_map_free(edge2->map);
1138 if (is_condition(edge2)) {
1139 if (!edge1->tagged_condition)
1140 edge1->tagged_condition = edge2->tagged_condition;
1141 else
1142 edge1->tagged_condition =
1143 isl_union_map_union(edge1->tagged_condition,
1144 edge2->tagged_condition);
1147 if (is_conditional_validity(edge2)) {
1148 if (!edge1->tagged_validity)
1149 edge1->tagged_validity = edge2->tagged_validity;
1150 else
1151 edge1->tagged_validity =
1152 isl_union_map_union(edge1->tagged_validity,
1153 edge2->tagged_validity);
1156 if (is_condition(edge2) && !edge1->tagged_condition)
1157 return -1;
1158 if (is_conditional_validity(edge2) && !edge1->tagged_validity)
1159 return -1;
1161 return 0;
1164 /* Insert dummy tags in domain and range of "map".
1166 * In particular, if "map" is of the form
1168 * A -> B
1170 * then return
1172 * [A -> dummy_tag] -> [B -> dummy_tag]
1174 * where the dummy_tags are identical and equal to any dummy tags
1175 * introduced by any other call to this function.
1177 static __isl_give isl_map *insert_dummy_tags(__isl_take isl_map *map)
1179 static char dummy;
1180 isl_ctx *ctx;
1181 isl_id *id;
1182 isl_space *space;
1183 isl_set *domain, *range;
1185 ctx = isl_map_get_ctx(map);
1187 id = isl_id_alloc(ctx, NULL, &dummy);
1188 space = isl_space_params(isl_map_get_space(map));
1189 space = isl_space_set_from_params(space);
1190 space = isl_space_set_tuple_id(space, isl_dim_set, id);
1191 space = isl_space_map_from_set(space);
1193 domain = isl_map_wrap(map);
1194 range = isl_map_wrap(isl_map_universe(space));
1195 map = isl_map_from_domain_and_range(domain, range);
1196 map = isl_map_zip(map);
1198 return map;
1201 /* Given that at least one of "src" or "dst" is compressed, return
1202 * a map between the spaces of these nodes restricted to the affine
1203 * hull that was used in the compression.
1205 static __isl_give isl_map *extract_hull(struct isl_sched_node *src,
1206 struct isl_sched_node *dst)
1208 isl_set *dom, *ran;
1210 if (src->compressed)
1211 dom = isl_set_copy(src->hull);
1212 else
1213 dom = isl_set_universe(isl_space_copy(src->space));
1214 if (dst->compressed)
1215 ran = isl_set_copy(dst->hull);
1216 else
1217 ran = isl_set_universe(isl_space_copy(dst->space));
1219 return isl_map_from_domain_and_range(dom, ran);
1222 /* Intersect the domains of the nested relations in domain and range
1223 * of "tagged" with "map".
1225 static __isl_give isl_map *map_intersect_domains(__isl_take isl_map *tagged,
1226 __isl_keep isl_map *map)
1228 isl_set *set;
1230 tagged = isl_map_zip(tagged);
1231 set = isl_map_wrap(isl_map_copy(map));
1232 tagged = isl_map_intersect_domain(tagged, set);
1233 tagged = isl_map_zip(tagged);
1234 return tagged;
1237 /* Return a pointer to the node that lives in the domain space of "map",
1238 * an invalid node if there is no such node, or NULL in case of error.
1240 static struct isl_sched_node *find_domain_node(isl_ctx *ctx,
1241 struct isl_sched_graph *graph, __isl_keep isl_map *map)
1243 struct isl_sched_node *node;
1244 isl_space *space;
1246 space = isl_space_domain(isl_map_get_space(map));
1247 node = graph_find_node(ctx, graph, space);
1248 isl_space_free(space);
1250 return node;
1253 /* Return a pointer to the node that lives in the range space of "map",
1254 * an invalid node if there is no such node, or NULL in case of error.
1256 static struct isl_sched_node *find_range_node(isl_ctx *ctx,
1257 struct isl_sched_graph *graph, __isl_keep isl_map *map)
1259 struct isl_sched_node *node;
1260 isl_space *space;
1262 space = isl_space_range(isl_map_get_space(map));
1263 node = graph_find_node(ctx, graph, space);
1264 isl_space_free(space);
1266 return node;
1269 /* Refrain from adding a new edge based on "map".
1270 * Instead, just free the map.
1271 * "tagged" is either a copy of "map" with additional tags or NULL.
1273 static isl_stat skip_edge(__isl_take isl_map *map, __isl_take isl_map *tagged)
1275 isl_map_free(map);
1276 isl_map_free(tagged);
1278 return isl_stat_ok;
1281 /* Add a new edge to the graph based on the given map
1282 * and add it to data->graph->edge_table[data->type].
1283 * If a dependence relation of a given type happens to be identical
1284 * to one of the dependence relations of a type that was added before,
1285 * then we don't create a new edge, but instead mark the original edge
1286 * as also representing a dependence of the current type.
1288 * Edges of type isl_edge_condition or isl_edge_conditional_validity
1289 * may be specified as "tagged" dependence relations. That is, "map"
1290 * may contain elements (i -> a) -> (j -> b), where i -> j denotes
1291 * the dependence on iterations and a and b are tags.
1292 * edge->map is set to the relation containing the elements i -> j,
1293 * while edge->tagged_condition and edge->tagged_validity contain
1294 * the union of all the "map" relations
1295 * for which extract_edge is called that result in the same edge->map.
1297 * If the source or the destination node is compressed, then
1298 * intersect both "map" and "tagged" with the constraints that
1299 * were used to construct the compression.
1300 * This ensures that there are no schedule constraints defined
1301 * outside of these domains, while the scheduler no longer has
1302 * any control over those outside parts.
1304 static isl_stat extract_edge(__isl_take isl_map *map, void *user)
1306 isl_bool empty;
1307 isl_ctx *ctx = isl_map_get_ctx(map);
1308 struct isl_extract_edge_data *data = user;
1309 struct isl_sched_graph *graph = data->graph;
1310 struct isl_sched_node *src, *dst;
1311 struct isl_sched_edge *edge;
1312 isl_map *tagged = NULL;
1314 if (data->type == isl_edge_condition ||
1315 data->type == isl_edge_conditional_validity) {
1316 if (isl_map_can_zip(map)) {
1317 tagged = isl_map_copy(map);
1318 map = isl_set_unwrap(isl_map_domain(isl_map_zip(map)));
1319 } else {
1320 tagged = insert_dummy_tags(isl_map_copy(map));
1324 src = find_domain_node(ctx, graph, map);
1325 dst = find_range_node(ctx, graph, map);
1327 if (!src || !dst)
1328 goto error;
1329 if (!is_node(graph, src) || !is_node(graph, dst))
1330 return skip_edge(map, tagged);
1332 if (src->compressed || dst->compressed) {
1333 isl_map *hull;
1334 hull = extract_hull(src, dst);
1335 if (tagged)
1336 tagged = map_intersect_domains(tagged, hull);
1337 map = isl_map_intersect(map, hull);
1340 empty = isl_map_plain_is_empty(map);
1341 if (empty < 0)
1342 goto error;
1343 if (empty)
1344 return skip_edge(map, tagged);
1346 graph->edge[graph->n_edge].src = src;
1347 graph->edge[graph->n_edge].dst = dst;
1348 graph->edge[graph->n_edge].map = map;
1349 graph->edge[graph->n_edge].types = 0;
1350 graph->edge[graph->n_edge].tagged_condition = NULL;
1351 graph->edge[graph->n_edge].tagged_validity = NULL;
1352 set_type(&graph->edge[graph->n_edge], data->type);
1353 if (data->type == isl_edge_condition)
1354 graph->edge[graph->n_edge].tagged_condition =
1355 isl_union_map_from_map(tagged);
1356 if (data->type == isl_edge_conditional_validity)
1357 graph->edge[graph->n_edge].tagged_validity =
1358 isl_union_map_from_map(tagged);
1360 edge = graph_find_matching_edge(graph, &graph->edge[graph->n_edge]);
1361 if (!edge) {
1362 graph->n_edge++;
1363 return isl_stat_error;
1365 if (edge == &graph->edge[graph->n_edge])
1366 return graph_edge_table_add(ctx, graph, data->type,
1367 &graph->edge[graph->n_edge++]);
1369 if (merge_edge(edge, &graph->edge[graph->n_edge]) < 0)
1370 return isl_stat_error;
1372 return graph_edge_table_add(ctx, graph, data->type, edge);
1373 error:
1374 isl_map_free(map);
1375 isl_map_free(tagged);
1376 return isl_stat_error;
1379 /* Initialize the schedule graph "graph" from the schedule constraints "sc".
1381 * The context is included in the domain before the nodes of
1382 * the graphs are extracted in order to be able to exploit
1383 * any possible additional equalities.
1384 * Note that this intersection is only performed locally here.
1386 static isl_stat graph_init(struct isl_sched_graph *graph,
1387 __isl_keep isl_schedule_constraints *sc)
1389 isl_ctx *ctx;
1390 isl_union_set *domain;
1391 isl_union_map *c;
1392 struct isl_extract_edge_data data;
1393 enum isl_edge_type i;
1394 isl_stat r;
1396 if (!sc)
1397 return isl_stat_error;
1399 ctx = isl_schedule_constraints_get_ctx(sc);
1401 domain = isl_schedule_constraints_get_domain(sc);
1402 graph->n = isl_union_set_n_set(domain);
1403 isl_union_set_free(domain);
1405 if (graph_alloc(ctx, graph, graph->n,
1406 isl_schedule_constraints_n_map(sc)) < 0)
1407 return isl_stat_error;
1409 if (compute_max_row(graph, sc) < 0)
1410 return isl_stat_error;
1411 graph->root = graph;
1412 graph->n = 0;
1413 domain = isl_schedule_constraints_get_domain(sc);
1414 domain = isl_union_set_intersect_params(domain,
1415 isl_schedule_constraints_get_context(sc));
1416 r = isl_union_set_foreach_set(domain, &extract_node, graph);
1417 isl_union_set_free(domain);
1418 if (r < 0)
1419 return isl_stat_error;
1420 if (graph_init_table(ctx, graph) < 0)
1421 return isl_stat_error;
1422 for (i = isl_edge_first; i <= isl_edge_last; ++i) {
1423 c = isl_schedule_constraints_get(sc, i);
1424 graph->max_edge[i] = isl_union_map_n_map(c);
1425 isl_union_map_free(c);
1426 if (!c)
1427 return isl_stat_error;
1429 if (graph_init_edge_tables(ctx, graph) < 0)
1430 return isl_stat_error;
1431 graph->n_edge = 0;
1432 data.graph = graph;
1433 for (i = isl_edge_first; i <= isl_edge_last; ++i) {
1434 isl_stat r;
1436 data.type = i;
1437 c = isl_schedule_constraints_get(sc, i);
1438 r = isl_union_map_foreach_map(c, &extract_edge, &data);
1439 isl_union_map_free(c);
1440 if (r < 0)
1441 return isl_stat_error;
1444 return isl_stat_ok;
1447 /* Check whether there is any dependence from node[j] to node[i]
1448 * or from node[i] to node[j].
1450 static isl_bool node_follows_weak(int i, int j, void *user)
1452 isl_bool f;
1453 struct isl_sched_graph *graph = user;
1455 f = graph_has_any_edge(graph, &graph->node[j], &graph->node[i]);
1456 if (f < 0 || f)
1457 return f;
1458 return graph_has_any_edge(graph, &graph->node[i], &graph->node[j]);
1461 /* Check whether there is a (conditional) validity dependence from node[j]
1462 * to node[i], forcing node[i] to follow node[j].
1464 static isl_bool node_follows_strong(int i, int j, void *user)
1466 struct isl_sched_graph *graph = user;
1468 return graph_has_validity_edge(graph, &graph->node[j], &graph->node[i]);
1471 /* Use Tarjan's algorithm for computing the strongly connected components
1472 * in the dependence graph only considering those edges defined by "follows".
1474 static isl_stat detect_ccs(isl_ctx *ctx, struct isl_sched_graph *graph,
1475 isl_bool (*follows)(int i, int j, void *user))
1477 int i, n;
1478 struct isl_tarjan_graph *g = NULL;
1480 g = isl_tarjan_graph_init(ctx, graph->n, follows, graph);
1481 if (!g)
1482 return isl_stat_error;
1484 graph->scc = 0;
1485 i = 0;
1486 n = graph->n;
1487 while (n) {
1488 while (g->order[i] != -1) {
1489 graph->node[g->order[i]].scc = graph->scc;
1490 --n;
1491 ++i;
1493 ++i;
1494 graph->scc++;
1497 isl_tarjan_graph_free(g);
1499 return isl_stat_ok;
1502 /* Apply Tarjan's algorithm to detect the strongly connected components
1503 * in the dependence graph.
1504 * Only consider the (conditional) validity dependences and clear "weak".
1506 static isl_stat detect_sccs(isl_ctx *ctx, struct isl_sched_graph *graph)
1508 graph->weak = 0;
1509 return detect_ccs(ctx, graph, &node_follows_strong);
1512 /* Apply Tarjan's algorithm to detect the (weakly) connected components
1513 * in the dependence graph.
1514 * Consider all dependences and set "weak".
1516 static isl_stat detect_wccs(isl_ctx *ctx, struct isl_sched_graph *graph)
1518 graph->weak = 1;
1519 return detect_ccs(ctx, graph, &node_follows_weak);
1522 static int cmp_scc(const void *a, const void *b, void *data)
1524 struct isl_sched_graph *graph = data;
1525 const int *i1 = a;
1526 const int *i2 = b;
1528 return graph->node[*i1].scc - graph->node[*i2].scc;
1531 /* Sort the elements of graph->sorted according to the corresponding SCCs.
1533 static int sort_sccs(struct isl_sched_graph *graph)
1535 return isl_sort(graph->sorted, graph->n, sizeof(int), &cmp_scc, graph);
1538 /* Return a non-parametric set in the compressed space of "node" that is
1539 * bounded by the size in each direction
1541 * { [x] : -S_i <= x_i <= S_i }
1543 * If S_i is infinity in direction i, then there are no constraints
1544 * in that direction.
1546 * Cache the result in node->bounds.
1548 static __isl_give isl_basic_set *get_size_bounds(struct isl_sched_node *node)
1550 isl_space *space;
1551 isl_basic_set *bounds;
1552 int i;
1553 unsigned nparam;
1555 if (node->bounds)
1556 return isl_basic_set_copy(node->bounds);
1558 if (node->compressed)
1559 space = isl_multi_aff_get_domain_space(node->decompress);
1560 else
1561 space = isl_space_copy(node->space);
1562 nparam = isl_space_dim(space, isl_dim_param);
1563 space = isl_space_drop_dims(space, isl_dim_param, 0, nparam);
1564 bounds = isl_basic_set_universe(space);
1566 for (i = 0; i < node->nvar; ++i) {
1567 isl_val *size;
1569 size = isl_multi_val_get_val(node->sizes, i);
1570 if (!size)
1571 return isl_basic_set_free(bounds);
1572 if (!isl_val_is_int(size)) {
1573 isl_val_free(size);
1574 continue;
1576 bounds = isl_basic_set_upper_bound_val(bounds, isl_dim_set, i,
1577 isl_val_copy(size));
1578 bounds = isl_basic_set_lower_bound_val(bounds, isl_dim_set, i,
1579 isl_val_neg(size));
1582 node->bounds = isl_basic_set_copy(bounds);
1583 return bounds;
1586 /* Drop some constraints from "delta" that could be exploited
1587 * to construct loop coalescing schedules.
1588 * In particular, drop those constraint that bound the difference
1589 * to the size of the domain.
1590 * First project out the parameters to improve the effectiveness.
1592 static __isl_give isl_set *drop_coalescing_constraints(
1593 __isl_take isl_set *delta, struct isl_sched_node *node)
1595 unsigned nparam;
1596 isl_basic_set *bounds;
1598 bounds = get_size_bounds(node);
1600 nparam = isl_set_dim(delta, isl_dim_param);
1601 delta = isl_set_project_out(delta, isl_dim_param, 0, nparam);
1602 delta = isl_set_remove_divs(delta);
1603 delta = isl_set_plain_gist_basic_set(delta, bounds);
1604 return delta;
1607 /* Given a dependence relation R from "node" to itself,
1608 * construct the set of coefficients of valid constraints for elements
1609 * in that dependence relation.
1610 * In particular, the result contains tuples of coefficients
1611 * c_0, c_n, c_x such that
1613 * c_0 + c_n n + c_x y - c_x x >= 0 for each (x,y) in R
1615 * or, equivalently,
1617 * c_0 + c_n n + c_x d >= 0 for each d in delta R = { y - x | (x,y) in R }
1619 * We choose here to compute the dual of delta R.
1620 * Alternatively, we could have computed the dual of R, resulting
1621 * in a set of tuples c_0, c_n, c_x, c_y, and then
1622 * plugged in (c_0, c_n, c_x, -c_x).
1624 * If "need_param" is set, then the resulting coefficients effectively
1625 * include coefficients for the parameters c_n. Otherwise, they may
1626 * have been projected out already.
1627 * Since the constraints may be different for these two cases,
1628 * they are stored in separate caches.
1629 * In particular, if no parameter coefficients are required and
1630 * the schedule_treat_coalescing option is set, then the parameters
1631 * are projected out and some constraints that could be exploited
1632 * to construct coalescing schedules are removed before the dual
1633 * is computed.
1635 * If "node" has been compressed, then the dependence relation
1636 * is also compressed before the set of coefficients is computed.
1638 static __isl_give isl_basic_set *intra_coefficients(
1639 struct isl_sched_graph *graph, struct isl_sched_node *node,
1640 __isl_take isl_map *map, int need_param)
1642 isl_ctx *ctx;
1643 isl_set *delta;
1644 isl_map *key;
1645 isl_basic_set *coef;
1646 isl_maybe_isl_basic_set m;
1647 isl_map_to_basic_set **hmap = &graph->intra_hmap;
1648 int treat;
1650 if (!map)
1651 return NULL;
1653 ctx = isl_map_get_ctx(map);
1654 treat = !need_param && isl_options_get_schedule_treat_coalescing(ctx);
1655 if (!treat)
1656 hmap = &graph->intra_hmap_param;
1657 m = isl_map_to_basic_set_try_get(*hmap, map);
1658 if (m.valid < 0 || m.valid) {
1659 isl_map_free(map);
1660 return m.value;
1663 key = isl_map_copy(map);
1664 if (node->compressed) {
1665 map = isl_map_preimage_domain_multi_aff(map,
1666 isl_multi_aff_copy(node->decompress));
1667 map = isl_map_preimage_range_multi_aff(map,
1668 isl_multi_aff_copy(node->decompress));
1670 delta = isl_map_deltas(map);
1671 if (treat)
1672 delta = drop_coalescing_constraints(delta, node);
1673 delta = isl_set_remove_divs(delta);
1674 coef = isl_set_coefficients(delta);
1675 *hmap = isl_map_to_basic_set_set(*hmap, key, isl_basic_set_copy(coef));
1677 return coef;
1680 /* Given a dependence relation R, construct the set of coefficients
1681 * of valid constraints for elements in that dependence relation.
1682 * In particular, the result contains tuples of coefficients
1683 * c_0, c_n, c_x, c_y such that
1685 * c_0 + c_n n + c_x x + c_y y >= 0 for each (x,y) in R
1687 * If the source or destination nodes of "edge" have been compressed,
1688 * then the dependence relation is also compressed before
1689 * the set of coefficients is computed.
1691 static __isl_give isl_basic_set *inter_coefficients(
1692 struct isl_sched_graph *graph, struct isl_sched_edge *edge,
1693 __isl_take isl_map *map)
1695 isl_set *set;
1696 isl_map *key;
1697 isl_basic_set *coef;
1698 isl_maybe_isl_basic_set m;
1700 m = isl_map_to_basic_set_try_get(graph->inter_hmap, map);
1701 if (m.valid < 0 || m.valid) {
1702 isl_map_free(map);
1703 return m.value;
1706 key = isl_map_copy(map);
1707 if (edge->src->compressed)
1708 map = isl_map_preimage_domain_multi_aff(map,
1709 isl_multi_aff_copy(edge->src->decompress));
1710 if (edge->dst->compressed)
1711 map = isl_map_preimage_range_multi_aff(map,
1712 isl_multi_aff_copy(edge->dst->decompress));
1713 set = isl_map_wrap(isl_map_remove_divs(map));
1714 coef = isl_set_coefficients(set);
1715 graph->inter_hmap = isl_map_to_basic_set_set(graph->inter_hmap, key,
1716 isl_basic_set_copy(coef));
1718 return coef;
1721 /* Return the position of the coefficients of the variables in
1722 * the coefficients constraints "coef".
1724 * The space of "coef" is of the form
1726 * { coefficients[[cst, params] -> S] }
1728 * Return the position of S.
1730 static int coef_var_offset(__isl_keep isl_basic_set *coef)
1732 int offset;
1733 isl_space *space;
1735 space = isl_space_unwrap(isl_basic_set_get_space(coef));
1736 offset = isl_space_dim(space, isl_dim_in);
1737 isl_space_free(space);
1739 return offset;
1742 /* Return the offset of the coefficient of the constant term of "node"
1743 * within the (I)LP.
1745 * Within each node, the coefficients have the following order:
1746 * - positive and negative parts of c_i_x
1747 * - c_i_n (if parametric)
1748 * - c_i_0
1750 static int node_cst_coef_offset(struct isl_sched_node *node)
1752 return node->start + 2 * node->nvar + node->nparam;
1755 /* Return the offset of the coefficients of the parameters of "node"
1756 * within the (I)LP.
1758 * Within each node, the coefficients have the following order:
1759 * - positive and negative parts of c_i_x
1760 * - c_i_n (if parametric)
1761 * - c_i_0
1763 static int node_par_coef_offset(struct isl_sched_node *node)
1765 return node->start + 2 * node->nvar;
1768 /* Return the offset of the coefficients of the variables of "node"
1769 * within the (I)LP.
1771 * Within each node, the coefficients have the following order:
1772 * - positive and negative parts of c_i_x
1773 * - c_i_n (if parametric)
1774 * - c_i_0
1776 static int node_var_coef_offset(struct isl_sched_node *node)
1778 return node->start;
1781 /* Return the position of the pair of variables encoding
1782 * coefficient "i" of "node".
1784 * The order of these variable pairs is the opposite of
1785 * that of the coefficients, with 2 variables per coefficient.
1787 static int node_var_coef_pos(struct isl_sched_node *node, int i)
1789 return node_var_coef_offset(node) + 2 * (node->nvar - 1 - i);
1792 /* Construct an isl_dim_map for mapping constraints on coefficients
1793 * for "node" to the corresponding positions in graph->lp.
1794 * "offset" is the offset of the coefficients for the variables
1795 * in the input constraints.
1796 * "s" is the sign of the mapping.
1798 * The input constraints are given in terms of the coefficients
1799 * (c_0, c_x) or (c_0, c_n, c_x).
1800 * The mapping produced by this function essentially plugs in
1801 * (0, c_i_x^+ - c_i_x^-) if s = 1 and
1802 * (0, -c_i_x^+ + c_i_x^-) if s = -1 or
1803 * (0, 0, c_i_x^+ - c_i_x^-) if s = 1 and
1804 * (0, 0, -c_i_x^+ + c_i_x^-) if s = -1.
1805 * In graph->lp, the c_i_x^- appear before their c_i_x^+ counterpart.
1806 * Furthermore, the order of these pairs is the opposite of that
1807 * of the corresponding coefficients.
1809 * The caller can extend the mapping to also map the other coefficients
1810 * (and therefore not plug in 0).
1812 static __isl_give isl_dim_map *intra_dim_map(isl_ctx *ctx,
1813 struct isl_sched_graph *graph, struct isl_sched_node *node,
1814 int offset, int s)
1816 int pos;
1817 unsigned total;
1818 isl_dim_map *dim_map;
1820 if (!node || !graph->lp)
1821 return NULL;
1823 total = isl_basic_set_total_dim(graph->lp);
1824 pos = node_var_coef_pos(node, 0);
1825 dim_map = isl_dim_map_alloc(ctx, total);
1826 isl_dim_map_range(dim_map, pos, -2, offset, 1, node->nvar, -s);
1827 isl_dim_map_range(dim_map, pos + 1, -2, offset, 1, node->nvar, s);
1829 return dim_map;
1832 /* Construct an isl_dim_map for mapping constraints on coefficients
1833 * for "src" (node i) and "dst" (node j) to the corresponding positions
1834 * in graph->lp.
1835 * "offset" is the offset of the coefficients for the variables of "src"
1836 * in the input constraints.
1837 * "s" is the sign of the mapping.
1839 * The input constraints are given in terms of the coefficients
1840 * (c_0, c_n, c_x, c_y).
1841 * The mapping produced by this function essentially plugs in
1842 * (c_j_0 - c_i_0, c_j_n - c_i_n,
1843 * -(c_i_x^+ - c_i_x^-), c_j_x^+ - c_j_x^-) if s = 1 and
1844 * (-c_j_0 + c_i_0, -c_j_n + c_i_n,
1845 * c_i_x^+ - c_i_x^-, -(c_j_x^+ - c_j_x^-)) if s = -1.
1846 * In graph->lp, the c_*^- appear before their c_*^+ counterpart.
1847 * Furthermore, the order of these pairs is the opposite of that
1848 * of the corresponding coefficients.
1850 * The caller can further extend the mapping.
1852 static __isl_give isl_dim_map *inter_dim_map(isl_ctx *ctx,
1853 struct isl_sched_graph *graph, struct isl_sched_node *src,
1854 struct isl_sched_node *dst, int offset, int s)
1856 int pos;
1857 unsigned total;
1858 isl_dim_map *dim_map;
1860 if (!src || !dst || !graph->lp)
1861 return NULL;
1863 total = isl_basic_set_total_dim(graph->lp);
1864 dim_map = isl_dim_map_alloc(ctx, total);
1866 pos = node_cst_coef_offset(dst);
1867 isl_dim_map_range(dim_map, pos, 0, 0, 0, 1, s);
1868 pos = node_par_coef_offset(dst);
1869 isl_dim_map_range(dim_map, pos, 1, 1, 1, dst->nparam, s);
1870 pos = node_var_coef_pos(dst, 0);
1871 isl_dim_map_range(dim_map, pos, -2, offset + src->nvar, 1,
1872 dst->nvar, -s);
1873 isl_dim_map_range(dim_map, pos + 1, -2, offset + src->nvar, 1,
1874 dst->nvar, s);
1876 pos = node_cst_coef_offset(src);
1877 isl_dim_map_range(dim_map, pos, 0, 0, 0, 1, -s);
1878 pos = node_par_coef_offset(src);
1879 isl_dim_map_range(dim_map, pos, 1, 1, 1, src->nparam, -s);
1880 pos = node_var_coef_pos(src, 0);
1881 isl_dim_map_range(dim_map, pos, -2, offset, 1, src->nvar, s);
1882 isl_dim_map_range(dim_map, pos + 1, -2, offset, 1, src->nvar, -s);
1884 return dim_map;
1887 /* Add the constraints from "src" to "dst" using "dim_map",
1888 * after making sure there is enough room in "dst" for the extra constraints.
1890 static __isl_give isl_basic_set *add_constraints_dim_map(
1891 __isl_take isl_basic_set *dst, __isl_take isl_basic_set *src,
1892 __isl_take isl_dim_map *dim_map)
1894 int n_eq, n_ineq;
1896 n_eq = isl_basic_set_n_equality(src);
1897 n_ineq = isl_basic_set_n_inequality(src);
1898 dst = isl_basic_set_extend_constraints(dst, n_eq, n_ineq);
1899 dst = isl_basic_set_add_constraints_dim_map(dst, src, dim_map);
1900 return dst;
1903 /* Add constraints to graph->lp that force validity for the given
1904 * dependence from a node i to itself.
1905 * That is, add constraints that enforce
1907 * (c_i_0 + c_i_n n + c_i_x y) - (c_i_0 + c_i_n n + c_i_x x)
1908 * = c_i_x (y - x) >= 0
1910 * for each (x,y) in R.
1911 * We obtain general constraints on coefficients (c_0, c_x)
1912 * of valid constraints for (y - x) and then plug in (0, c_i_x^+ - c_i_x^-),
1913 * where c_i_x = c_i_x^+ - c_i_x^-, with c_i_x^+ and c_i_x^- non-negative.
1914 * In graph->lp, the c_i_x^- appear before their c_i_x^+ counterpart.
1915 * Note that the result of intra_coefficients may also contain
1916 * parameter coefficients c_n, in which case 0 is plugged in for them as well.
1918 static isl_stat add_intra_validity_constraints(struct isl_sched_graph *graph,
1919 struct isl_sched_edge *edge)
1921 int offset;
1922 isl_map *map = isl_map_copy(edge->map);
1923 isl_ctx *ctx = isl_map_get_ctx(map);
1924 isl_dim_map *dim_map;
1925 isl_basic_set *coef;
1926 struct isl_sched_node *node = edge->src;
1928 coef = intra_coefficients(graph, node, map, 0);
1930 offset = coef_var_offset(coef);
1932 if (!coef)
1933 return isl_stat_error;
1935 dim_map = intra_dim_map(ctx, graph, node, offset, 1);
1936 graph->lp = add_constraints_dim_map(graph->lp, coef, dim_map);
1938 return isl_stat_ok;
1941 /* Add constraints to graph->lp that force validity for the given
1942 * dependence from node i to node j.
1943 * That is, add constraints that enforce
1945 * (c_j_0 + c_j_n n + c_j_x y) - (c_i_0 + c_i_n n + c_i_x x) >= 0
1947 * for each (x,y) in R.
1948 * We obtain general constraints on coefficients (c_0, c_n, c_x, c_y)
1949 * of valid constraints for R and then plug in
1950 * (c_j_0 - c_i_0, c_j_n - c_i_n, -(c_i_x^+ - c_i_x^-), c_j_x^+ - c_j_x^-),
1951 * where c_* = c_*^+ - c_*^-, with c_*^+ and c_*^- non-negative.
1952 * In graph->lp, the c_*^- appear before their c_*^+ counterpart.
1954 static isl_stat add_inter_validity_constraints(struct isl_sched_graph *graph,
1955 struct isl_sched_edge *edge)
1957 int offset;
1958 isl_map *map;
1959 isl_ctx *ctx;
1960 isl_dim_map *dim_map;
1961 isl_basic_set *coef;
1962 struct isl_sched_node *src = edge->src;
1963 struct isl_sched_node *dst = edge->dst;
1965 if (!graph->lp)
1966 return isl_stat_error;
1968 map = isl_map_copy(edge->map);
1969 ctx = isl_map_get_ctx(map);
1970 coef = inter_coefficients(graph, edge, map);
1972 offset = coef_var_offset(coef);
1974 if (!coef)
1975 return isl_stat_error;
1977 dim_map = inter_dim_map(ctx, graph, src, dst, offset, 1);
1979 edge->start = graph->lp->n_ineq;
1980 graph->lp = add_constraints_dim_map(graph->lp, coef, dim_map);
1981 if (!graph->lp)
1982 return isl_stat_error;
1983 edge->end = graph->lp->n_ineq;
1985 return isl_stat_ok;
1988 /* Add constraints to graph->lp that bound the dependence distance for the given
1989 * dependence from a node i to itself.
1990 * If s = 1, we add the constraint
1992 * c_i_x (y - x) <= m_0 + m_n n
1994 * or
1996 * -c_i_x (y - x) + m_0 + m_n n >= 0
1998 * for each (x,y) in R.
1999 * If s = -1, we add the constraint
2001 * -c_i_x (y - x) <= m_0 + m_n n
2003 * or
2005 * c_i_x (y - x) + m_0 + m_n n >= 0
2007 * for each (x,y) in R.
2008 * We obtain general constraints on coefficients (c_0, c_n, c_x)
2009 * of valid constraints for (y - x) and then plug in (m_0, m_n, -s * c_i_x),
2010 * with each coefficient (except m_0) represented as a pair of non-negative
2011 * coefficients.
2014 * If "local" is set, then we add constraints
2016 * c_i_x (y - x) <= 0
2018 * or
2020 * -c_i_x (y - x) <= 0
2022 * instead, forcing the dependence distance to be (less than or) equal to 0.
2023 * That is, we plug in (0, 0, -s * c_i_x),
2024 * intra_coefficients is not required to have c_n in its result when
2025 * "local" is set. If they are missing, then (0, -s * c_i_x) is plugged in.
2026 * Note that dependences marked local are treated as validity constraints
2027 * by add_all_validity_constraints and therefore also have
2028 * their distances bounded by 0 from below.
2030 static isl_stat add_intra_proximity_constraints(struct isl_sched_graph *graph,
2031 struct isl_sched_edge *edge, int s, int local)
2033 int offset;
2034 unsigned nparam;
2035 isl_map *map = isl_map_copy(edge->map);
2036 isl_ctx *ctx = isl_map_get_ctx(map);
2037 isl_dim_map *dim_map;
2038 isl_basic_set *coef;
2039 struct isl_sched_node *node = edge->src;
2041 coef = intra_coefficients(graph, node, map, !local);
2043 offset = coef_var_offset(coef);
2045 if (!coef)
2046 return isl_stat_error;
2048 nparam = isl_space_dim(node->space, isl_dim_param);
2049 dim_map = intra_dim_map(ctx, graph, node, offset, -s);
2051 if (!local) {
2052 isl_dim_map_range(dim_map, 1, 0, 0, 0, 1, 1);
2053 isl_dim_map_range(dim_map, 4, 2, 1, 1, nparam, -1);
2054 isl_dim_map_range(dim_map, 5, 2, 1, 1, nparam, 1);
2056 graph->lp = add_constraints_dim_map(graph->lp, coef, dim_map);
2058 return isl_stat_ok;
2061 /* Add constraints to graph->lp that bound the dependence distance for the given
2062 * dependence from node i to node j.
2063 * If s = 1, we add the constraint
2065 * (c_j_0 + c_j_n n + c_j_x y) - (c_i_0 + c_i_n n + c_i_x x)
2066 * <= m_0 + m_n n
2068 * or
2070 * -(c_j_0 + c_j_n n + c_j_x y) + (c_i_0 + c_i_n n + c_i_x x) +
2071 * m_0 + m_n n >= 0
2073 * for each (x,y) in R.
2074 * If s = -1, we add the constraint
2076 * -((c_j_0 + c_j_n n + c_j_x y) - (c_i_0 + c_i_n n + c_i_x x))
2077 * <= m_0 + m_n n
2079 * or
2081 * (c_j_0 + c_j_n n + c_j_x y) - (c_i_0 + c_i_n n + c_i_x x) +
2082 * m_0 + m_n n >= 0
2084 * for each (x,y) in R.
2085 * We obtain general constraints on coefficients (c_0, c_n, c_x, c_y)
2086 * of valid constraints for R and then plug in
2087 * (m_0 - s*c_j_0 + s*c_i_0, m_n - s*c_j_n + s*c_i_n,
2088 * s*c_i_x, -s*c_j_x)
2089 * with each coefficient (except m_0, c_*_0 and c_*_n)
2090 * represented as a pair of non-negative coefficients.
2093 * If "local" is set (and s = 1), then we add constraints
2095 * (c_j_0 + c_j_n n + c_j_x y) - (c_i_0 + c_i_n n + c_i_x x) <= 0
2097 * or
2099 * -((c_j_0 + c_j_n n + c_j_x y) + (c_i_0 + c_i_n n + c_i_x x)) >= 0
2101 * instead, forcing the dependence distance to be (less than or) equal to 0.
2102 * That is, we plug in
2103 * (-s*c_j_0 + s*c_i_0, -s*c_j_n + s*c_i_n, s*c_i_x, -s*c_j_x).
2104 * Note that dependences marked local are treated as validity constraints
2105 * by add_all_validity_constraints and therefore also have
2106 * their distances bounded by 0 from below.
2108 static isl_stat add_inter_proximity_constraints(struct isl_sched_graph *graph,
2109 struct isl_sched_edge *edge, int s, int local)
2111 int offset;
2112 unsigned nparam;
2113 isl_map *map = isl_map_copy(edge->map);
2114 isl_ctx *ctx = isl_map_get_ctx(map);
2115 isl_dim_map *dim_map;
2116 isl_basic_set *coef;
2117 struct isl_sched_node *src = edge->src;
2118 struct isl_sched_node *dst = edge->dst;
2120 coef = inter_coefficients(graph, edge, map);
2122 offset = coef_var_offset(coef);
2124 if (!coef)
2125 return isl_stat_error;
2127 nparam = isl_space_dim(src->space, isl_dim_param);
2128 dim_map = inter_dim_map(ctx, graph, src, dst, offset, -s);
2130 if (!local) {
2131 isl_dim_map_range(dim_map, 1, 0, 0, 0, 1, 1);
2132 isl_dim_map_range(dim_map, 4, 2, 1, 1, nparam, -1);
2133 isl_dim_map_range(dim_map, 5, 2, 1, 1, nparam, 1);
2136 graph->lp = add_constraints_dim_map(graph->lp, coef, dim_map);
2138 return isl_stat_ok;
2141 /* Should the distance over "edge" be forced to zero?
2142 * That is, is it marked as a local edge?
2143 * If "use_coincidence" is set, then coincidence edges are treated
2144 * as local edges.
2146 static int force_zero(struct isl_sched_edge *edge, int use_coincidence)
2148 return is_local(edge) || (use_coincidence && is_coincidence(edge));
2151 /* Add all validity constraints to graph->lp.
2153 * An edge that is forced to be local needs to have its dependence
2154 * distances equal to zero. We take care of bounding them by 0 from below
2155 * here. add_all_proximity_constraints takes care of bounding them by 0
2156 * from above.
2158 * If "use_coincidence" is set, then we treat coincidence edges as local edges.
2159 * Otherwise, we ignore them.
2161 static int add_all_validity_constraints(struct isl_sched_graph *graph,
2162 int use_coincidence)
2164 int i;
2166 for (i = 0; i < graph->n_edge; ++i) {
2167 struct isl_sched_edge *edge = &graph->edge[i];
2168 int zero;
2170 zero = force_zero(edge, use_coincidence);
2171 if (!is_validity(edge) && !zero)
2172 continue;
2173 if (edge->src != edge->dst)
2174 continue;
2175 if (add_intra_validity_constraints(graph, edge) < 0)
2176 return -1;
2179 for (i = 0; i < graph->n_edge; ++i) {
2180 struct isl_sched_edge *edge = &graph->edge[i];
2181 int zero;
2183 zero = force_zero(edge, use_coincidence);
2184 if (!is_validity(edge) && !zero)
2185 continue;
2186 if (edge->src == edge->dst)
2187 continue;
2188 if (add_inter_validity_constraints(graph, edge) < 0)
2189 return -1;
2192 return 0;
2195 /* Add constraints to graph->lp that bound the dependence distance
2196 * for all dependence relations.
2197 * If a given proximity dependence is identical to a validity
2198 * dependence, then the dependence distance is already bounded
2199 * from below (by zero), so we only need to bound the distance
2200 * from above. (This includes the case of "local" dependences
2201 * which are treated as validity dependence by add_all_validity_constraints.)
2202 * Otherwise, we need to bound the distance both from above and from below.
2204 * If "use_coincidence" is set, then we treat coincidence edges as local edges.
2205 * Otherwise, we ignore them.
2207 static int add_all_proximity_constraints(struct isl_sched_graph *graph,
2208 int use_coincidence)
2210 int i;
2212 for (i = 0; i < graph->n_edge; ++i) {
2213 struct isl_sched_edge *edge = &graph->edge[i];
2214 int zero;
2216 zero = force_zero(edge, use_coincidence);
2217 if (!is_proximity(edge) && !zero)
2218 continue;
2219 if (edge->src == edge->dst &&
2220 add_intra_proximity_constraints(graph, edge, 1, zero) < 0)
2221 return -1;
2222 if (edge->src != edge->dst &&
2223 add_inter_proximity_constraints(graph, edge, 1, zero) < 0)
2224 return -1;
2225 if (is_validity(edge) || zero)
2226 continue;
2227 if (edge->src == edge->dst &&
2228 add_intra_proximity_constraints(graph, edge, -1, 0) < 0)
2229 return -1;
2230 if (edge->src != edge->dst &&
2231 add_inter_proximity_constraints(graph, edge, -1, 0) < 0)
2232 return -1;
2235 return 0;
2238 /* Normalize the rows of "indep" such that all rows are lexicographically
2239 * positive and such that each row contains as many final zeros as possible,
2240 * given the choice for the previous rows.
2241 * Do this by performing elementary row operations.
2243 static __isl_give isl_mat *normalize_independent(__isl_take isl_mat *indep)
2245 indep = isl_mat_reverse_gauss(indep);
2246 indep = isl_mat_lexnonneg_rows(indep);
2247 return indep;
2250 /* Compute a basis for the rows in the linear part of the schedule
2251 * and extend this basis to a full basis. The remaining rows
2252 * can then be used to force linear independence from the rows
2253 * in the schedule.
2255 * In particular, given the schedule rows S, we compute
2257 * S = H Q
2258 * S U = H
2260 * with H the Hermite normal form of S. That is, all but the
2261 * first rank columns of H are zero and so each row in S is
2262 * a linear combination of the first rank rows of Q.
2263 * The matrix Q can be used as a variable transformation
2264 * that isolates the directions of S in the first rank rows.
2265 * Transposing S U = H yields
2267 * U^T S^T = H^T
2269 * with all but the first rank rows of H^T zero.
2270 * The last rows of U^T are therefore linear combinations
2271 * of schedule coefficients that are all zero on schedule
2272 * coefficients that are linearly dependent on the rows of S.
2273 * At least one of these combinations is non-zero on
2274 * linearly independent schedule coefficients.
2275 * The rows are normalized to involve as few of the last
2276 * coefficients as possible and to have a positive initial value.
2278 static int node_update_vmap(struct isl_sched_node *node)
2280 isl_mat *H, *U, *Q;
2281 int n_row = isl_mat_rows(node->sched);
2283 H = isl_mat_sub_alloc(node->sched, 0, n_row,
2284 1 + node->nparam, node->nvar);
2286 H = isl_mat_left_hermite(H, 0, &U, &Q);
2287 isl_mat_free(node->indep);
2288 isl_mat_free(node->vmap);
2289 node->vmap = Q;
2290 node->indep = isl_mat_transpose(U);
2291 node->rank = isl_mat_initial_non_zero_cols(H);
2292 node->indep = isl_mat_drop_rows(node->indep, 0, node->rank);
2293 node->indep = normalize_independent(node->indep);
2294 isl_mat_free(H);
2296 if (!node->indep || !node->vmap || node->rank < 0)
2297 return -1;
2298 return 0;
2301 /* Is "edge" marked as a validity or a conditional validity edge?
2303 static int is_any_validity(struct isl_sched_edge *edge)
2305 return is_validity(edge) || is_conditional_validity(edge);
2308 /* How many times should we count the constraints in "edge"?
2310 * We count as follows
2311 * validity -> 1 (>= 0)
2312 * validity+proximity -> 2 (>= 0 and upper bound)
2313 * proximity -> 2 (lower and upper bound)
2314 * local(+any) -> 2 (>= 0 and <= 0)
2316 * If an edge is only marked conditional_validity then it counts
2317 * as zero since it is only checked afterwards.
2319 * If "use_coincidence" is set, then we treat coincidence edges as local edges.
2320 * Otherwise, we ignore them.
2322 static int edge_multiplicity(struct isl_sched_edge *edge, int use_coincidence)
2324 if (is_proximity(edge) || force_zero(edge, use_coincidence))
2325 return 2;
2326 if (is_validity(edge))
2327 return 1;
2328 return 0;
2331 /* How many times should the constraints in "edge" be counted
2332 * as a parametric intra-node constraint?
2334 * Only proximity edges that are not forced zero need
2335 * coefficient constraints that include coefficients for parameters.
2336 * If the edge is also a validity edge, then only
2337 * an upper bound is introduced. Otherwise, both lower and upper bounds
2338 * are introduced.
2340 static int parametric_intra_edge_multiplicity(struct isl_sched_edge *edge,
2341 int use_coincidence)
2343 if (edge->src != edge->dst)
2344 return 0;
2345 if (!is_proximity(edge))
2346 return 0;
2347 if (force_zero(edge, use_coincidence))
2348 return 0;
2349 if (is_validity(edge))
2350 return 1;
2351 else
2352 return 2;
2355 /* Add "f" times the number of equality and inequality constraints of "bset"
2356 * to "n_eq" and "n_ineq" and free "bset".
2358 static isl_stat update_count(__isl_take isl_basic_set *bset,
2359 int f, int *n_eq, int *n_ineq)
2361 if (!bset)
2362 return isl_stat_error;
2364 *n_eq += isl_basic_set_n_equality(bset);
2365 *n_ineq += isl_basic_set_n_inequality(bset);
2366 isl_basic_set_free(bset);
2368 return isl_stat_ok;
2371 /* Count the number of equality and inequality constraints
2372 * that will be added for the given map.
2374 * The edges that require parameter coefficients are counted separately.
2376 * "use_coincidence" is set if we should take into account coincidence edges.
2378 static isl_stat count_map_constraints(struct isl_sched_graph *graph,
2379 struct isl_sched_edge *edge, __isl_take isl_map *map,
2380 int *n_eq, int *n_ineq, int use_coincidence)
2382 isl_map *copy;
2383 isl_basic_set *coef;
2384 int f = edge_multiplicity(edge, use_coincidence);
2385 int fp = parametric_intra_edge_multiplicity(edge, use_coincidence);
2387 if (f == 0) {
2388 isl_map_free(map);
2389 return isl_stat_ok;
2392 if (edge->src != edge->dst) {
2393 coef = inter_coefficients(graph, edge, map);
2394 return update_count(coef, f, n_eq, n_ineq);
2397 if (fp > 0) {
2398 copy = isl_map_copy(map);
2399 coef = intra_coefficients(graph, edge->src, copy, 1);
2400 if (update_count(coef, fp, n_eq, n_ineq) < 0)
2401 goto error;
2404 if (f > fp) {
2405 copy = isl_map_copy(map);
2406 coef = intra_coefficients(graph, edge->src, copy, 0);
2407 if (update_count(coef, f - fp, n_eq, n_ineq) < 0)
2408 goto error;
2411 isl_map_free(map);
2412 return isl_stat_ok;
2413 error:
2414 isl_map_free(map);
2415 return isl_stat_error;
2418 /* Count the number of equality and inequality constraints
2419 * that will be added to the main lp problem.
2420 * We count as follows
2421 * validity -> 1 (>= 0)
2422 * validity+proximity -> 2 (>= 0 and upper bound)
2423 * proximity -> 2 (lower and upper bound)
2424 * local(+any) -> 2 (>= 0 and <= 0)
2426 * If "use_coincidence" is set, then we treat coincidence edges as local edges.
2427 * Otherwise, we ignore them.
2429 static int count_constraints(struct isl_sched_graph *graph,
2430 int *n_eq, int *n_ineq, int use_coincidence)
2432 int i;
2434 *n_eq = *n_ineq = 0;
2435 for (i = 0; i < graph->n_edge; ++i) {
2436 struct isl_sched_edge *edge = &graph->edge[i];
2437 isl_map *map = isl_map_copy(edge->map);
2439 if (count_map_constraints(graph, edge, map, n_eq, n_ineq,
2440 use_coincidence) < 0)
2441 return -1;
2444 return 0;
2447 /* Count the number of constraints that will be added by
2448 * add_bound_constant_constraints to bound the values of the constant terms
2449 * and increment *n_eq and *n_ineq accordingly.
2451 * In practice, add_bound_constant_constraints only adds inequalities.
2453 static isl_stat count_bound_constant_constraints(isl_ctx *ctx,
2454 struct isl_sched_graph *graph, int *n_eq, int *n_ineq)
2456 if (isl_options_get_schedule_max_constant_term(ctx) == -1)
2457 return isl_stat_ok;
2459 *n_ineq += graph->n;
2461 return isl_stat_ok;
2464 /* Add constraints to bound the values of the constant terms in the schedule,
2465 * if requested by the user.
2467 * The maximal value of the constant terms is defined by the option
2468 * "schedule_max_constant_term".
2470 static isl_stat add_bound_constant_constraints(isl_ctx *ctx,
2471 struct isl_sched_graph *graph)
2473 int i, k;
2474 int max;
2475 int total;
2477 max = isl_options_get_schedule_max_constant_term(ctx);
2478 if (max == -1)
2479 return isl_stat_ok;
2481 total = isl_basic_set_dim(graph->lp, isl_dim_set);
2483 for (i = 0; i < graph->n; ++i) {
2484 struct isl_sched_node *node = &graph->node[i];
2485 int pos;
2487 k = isl_basic_set_alloc_inequality(graph->lp);
2488 if (k < 0)
2489 return isl_stat_error;
2490 isl_seq_clr(graph->lp->ineq[k], 1 + total);
2491 pos = node_cst_coef_offset(node);
2492 isl_int_set_si(graph->lp->ineq[k][1 + pos], -1);
2493 isl_int_set_si(graph->lp->ineq[k][0], max);
2496 return isl_stat_ok;
2499 /* Count the number of constraints that will be added by
2500 * add_bound_coefficient_constraints and increment *n_eq and *n_ineq
2501 * accordingly.
2503 * In practice, add_bound_coefficient_constraints only adds inequalities.
2505 static int count_bound_coefficient_constraints(isl_ctx *ctx,
2506 struct isl_sched_graph *graph, int *n_eq, int *n_ineq)
2508 int i;
2510 if (isl_options_get_schedule_max_coefficient(ctx) == -1 &&
2511 !isl_options_get_schedule_treat_coalescing(ctx))
2512 return 0;
2514 for (i = 0; i < graph->n; ++i)
2515 *n_ineq += graph->node[i].nparam + 2 * graph->node[i].nvar;
2517 return 0;
2520 /* Add constraints to graph->lp that bound the values of
2521 * the parameter schedule coefficients of "node" to "max" and
2522 * the variable schedule coefficients to the corresponding entry
2523 * in node->max.
2524 * In either case, a negative value means that no bound needs to be imposed.
2526 * For parameter coefficients, this amounts to adding a constraint
2528 * c_n <= max
2530 * i.e.,
2532 * -c_n + max >= 0
2534 * The variables coefficients are, however, not represented directly.
2535 * Instead, the variable coefficients c_x are written as differences
2536 * c_x = c_x^+ - c_x^-.
2537 * That is,
2539 * -max_i <= c_x_i <= max_i
2541 * is encoded as
2543 * -max_i <= c_x_i^+ - c_x_i^- <= max_i
2545 * or
2547 * -(c_x_i^+ - c_x_i^-) + max_i >= 0
2548 * c_x_i^+ - c_x_i^- + max_i >= 0
2550 static isl_stat node_add_coefficient_constraints(isl_ctx *ctx,
2551 struct isl_sched_graph *graph, struct isl_sched_node *node, int max)
2553 int i, j, k;
2554 int total;
2555 isl_vec *ineq;
2557 total = isl_basic_set_dim(graph->lp, isl_dim_set);
2559 for (j = 0; j < node->nparam; ++j) {
2560 int dim;
2562 if (max < 0)
2563 continue;
2565 k = isl_basic_set_alloc_inequality(graph->lp);
2566 if (k < 0)
2567 return isl_stat_error;
2568 dim = 1 + node_par_coef_offset(node) + j;
2569 isl_seq_clr(graph->lp->ineq[k], 1 + total);
2570 isl_int_set_si(graph->lp->ineq[k][dim], -1);
2571 isl_int_set_si(graph->lp->ineq[k][0], max);
2574 ineq = isl_vec_alloc(ctx, 1 + total);
2575 ineq = isl_vec_clr(ineq);
2576 if (!ineq)
2577 return isl_stat_error;
2578 for (i = 0; i < node->nvar; ++i) {
2579 int pos = 1 + node_var_coef_pos(node, i);
2581 if (isl_int_is_neg(node->max->el[i]))
2582 continue;
2584 isl_int_set_si(ineq->el[pos], 1);
2585 isl_int_set_si(ineq->el[pos + 1], -1);
2586 isl_int_set(ineq->el[0], node->max->el[i]);
2588 k = isl_basic_set_alloc_inequality(graph->lp);
2589 if (k < 0)
2590 goto error;
2591 isl_seq_cpy(graph->lp->ineq[k], ineq->el, 1 + total);
2593 isl_seq_neg(ineq->el + pos, ineq->el + pos, 2);
2594 k = isl_basic_set_alloc_inequality(graph->lp);
2595 if (k < 0)
2596 goto error;
2597 isl_seq_cpy(graph->lp->ineq[k], ineq->el, 1 + total);
2599 isl_seq_clr(ineq->el + pos, 2);
2601 isl_vec_free(ineq);
2603 return isl_stat_ok;
2604 error:
2605 isl_vec_free(ineq);
2606 return isl_stat_error;
2609 /* Add constraints that bound the values of the variable and parameter
2610 * coefficients of the schedule.
2612 * The maximal value of the coefficients is defined by the option
2613 * 'schedule_max_coefficient' and the entries in node->max.
2614 * These latter entries are only set if either the schedule_max_coefficient
2615 * option or the schedule_treat_coalescing option is set.
2617 static isl_stat add_bound_coefficient_constraints(isl_ctx *ctx,
2618 struct isl_sched_graph *graph)
2620 int i;
2621 int max;
2623 max = isl_options_get_schedule_max_coefficient(ctx);
2625 if (max == -1 && !isl_options_get_schedule_treat_coalescing(ctx))
2626 return isl_stat_ok;
2628 for (i = 0; i < graph->n; ++i) {
2629 struct isl_sched_node *node = &graph->node[i];
2631 if (node_add_coefficient_constraints(ctx, graph, node, max) < 0)
2632 return isl_stat_error;
2635 return isl_stat_ok;
2638 /* Add a constraint to graph->lp that equates the value at position
2639 * "sum_pos" to the sum of the "n" values starting at "first".
2641 static isl_stat add_sum_constraint(struct isl_sched_graph *graph,
2642 int sum_pos, int first, int n)
2644 int i, k;
2645 int total;
2647 total = isl_basic_set_dim(graph->lp, isl_dim_set);
2649 k = isl_basic_set_alloc_equality(graph->lp);
2650 if (k < 0)
2651 return isl_stat_error;
2652 isl_seq_clr(graph->lp->eq[k], 1 + total);
2653 isl_int_set_si(graph->lp->eq[k][1 + sum_pos], -1);
2654 for (i = 0; i < n; ++i)
2655 isl_int_set_si(graph->lp->eq[k][1 + first + i], 1);
2657 return isl_stat_ok;
2660 /* Add a constraint to graph->lp that equates the value at position
2661 * "sum_pos" to the sum of the parameter coefficients of all nodes.
2663 static isl_stat add_param_sum_constraint(struct isl_sched_graph *graph,
2664 int sum_pos)
2666 int i, j, k;
2667 int total;
2669 total = isl_basic_set_dim(graph->lp, isl_dim_set);
2671 k = isl_basic_set_alloc_equality(graph->lp);
2672 if (k < 0)
2673 return isl_stat_error;
2674 isl_seq_clr(graph->lp->eq[k], 1 + total);
2675 isl_int_set_si(graph->lp->eq[k][1 + sum_pos], -1);
2676 for (i = 0; i < graph->n; ++i) {
2677 int pos = 1 + node_par_coef_offset(&graph->node[i]);
2679 for (j = 0; j < graph->node[i].nparam; ++j)
2680 isl_int_set_si(graph->lp->eq[k][pos + j], 1);
2683 return isl_stat_ok;
2686 /* Add a constraint to graph->lp that equates the value at position
2687 * "sum_pos" to the sum of the variable coefficients of all nodes.
2689 static isl_stat add_var_sum_constraint(struct isl_sched_graph *graph,
2690 int sum_pos)
2692 int i, j, k;
2693 int total;
2695 total = isl_basic_set_dim(graph->lp, isl_dim_set);
2697 k = isl_basic_set_alloc_equality(graph->lp);
2698 if (k < 0)
2699 return isl_stat_error;
2700 isl_seq_clr(graph->lp->eq[k], 1 + total);
2701 isl_int_set_si(graph->lp->eq[k][1 + sum_pos], -1);
2702 for (i = 0; i < graph->n; ++i) {
2703 struct isl_sched_node *node = &graph->node[i];
2704 int pos = 1 + node_var_coef_offset(node);
2706 for (j = 0; j < 2 * node->nvar; ++j)
2707 isl_int_set_si(graph->lp->eq[k][pos + j], 1);
2710 return isl_stat_ok;
2713 /* Construct an ILP problem for finding schedule coefficients
2714 * that result in non-negative, but small dependence distances
2715 * over all dependences.
2716 * In particular, the dependence distances over proximity edges
2717 * are bounded by m_0 + m_n n and we compute schedule coefficients
2718 * with small values (preferably zero) of m_n and m_0.
2720 * All variables of the ILP are non-negative. The actual coefficients
2721 * may be negative, so each coefficient is represented as the difference
2722 * of two non-negative variables. The negative part always appears
2723 * immediately before the positive part.
2724 * Other than that, the variables have the following order
2726 * - sum of positive and negative parts of m_n coefficients
2727 * - m_0
2728 * - sum of all c_n coefficients
2729 * (unconstrained when computing non-parametric schedules)
2730 * - sum of positive and negative parts of all c_x coefficients
2731 * - positive and negative parts of m_n coefficients
2732 * - for each node
2733 * - positive and negative parts of c_i_x, in opposite order
2734 * - c_i_n (if parametric)
2735 * - c_i_0
2737 * The constraints are those from the edges plus two or three equalities
2738 * to express the sums.
2740 * If "use_coincidence" is set, then we treat coincidence edges as local edges.
2741 * Otherwise, we ignore them.
2743 static isl_stat setup_lp(isl_ctx *ctx, struct isl_sched_graph *graph,
2744 int use_coincidence)
2746 int i;
2747 unsigned nparam;
2748 unsigned total;
2749 isl_space *space;
2750 int parametric;
2751 int param_pos;
2752 int n_eq, n_ineq;
2754 parametric = ctx->opt->schedule_parametric;
2755 nparam = isl_space_dim(graph->node[0].space, isl_dim_param);
2756 param_pos = 4;
2757 total = param_pos + 2 * nparam;
2758 for (i = 0; i < graph->n; ++i) {
2759 struct isl_sched_node *node = &graph->node[graph->sorted[i]];
2760 if (node_update_vmap(node) < 0)
2761 return isl_stat_error;
2762 node->start = total;
2763 total += 1 + node->nparam + 2 * node->nvar;
2766 if (count_constraints(graph, &n_eq, &n_ineq, use_coincidence) < 0)
2767 return isl_stat_error;
2768 if (count_bound_constant_constraints(ctx, graph, &n_eq, &n_ineq) < 0)
2769 return isl_stat_error;
2770 if (count_bound_coefficient_constraints(ctx, graph, &n_eq, &n_ineq) < 0)
2771 return isl_stat_error;
2773 space = isl_space_set_alloc(ctx, 0, total);
2774 isl_basic_set_free(graph->lp);
2775 n_eq += 2 + parametric;
2777 graph->lp = isl_basic_set_alloc_space(space, 0, n_eq, n_ineq);
2779 if (add_sum_constraint(graph, 0, param_pos, 2 * nparam) < 0)
2780 return isl_stat_error;
2781 if (parametric && add_param_sum_constraint(graph, 2) < 0)
2782 return isl_stat_error;
2783 if (add_var_sum_constraint(graph, 3) < 0)
2784 return isl_stat_error;
2785 if (add_bound_constant_constraints(ctx, graph) < 0)
2786 return isl_stat_error;
2787 if (add_bound_coefficient_constraints(ctx, graph) < 0)
2788 return isl_stat_error;
2789 if (add_all_validity_constraints(graph, use_coincidence) < 0)
2790 return isl_stat_error;
2791 if (add_all_proximity_constraints(graph, use_coincidence) < 0)
2792 return isl_stat_error;
2794 return isl_stat_ok;
2797 /* Analyze the conflicting constraint found by
2798 * isl_tab_basic_set_non_trivial_lexmin. If it corresponds to the validity
2799 * constraint of one of the edges between distinct nodes, living, moreover
2800 * in distinct SCCs, then record the source and sink SCC as this may
2801 * be a good place to cut between SCCs.
2803 static int check_conflict(int con, void *user)
2805 int i;
2806 struct isl_sched_graph *graph = user;
2808 if (graph->src_scc >= 0)
2809 return 0;
2811 con -= graph->lp->n_eq;
2813 if (con >= graph->lp->n_ineq)
2814 return 0;
2816 for (i = 0; i < graph->n_edge; ++i) {
2817 if (!is_validity(&graph->edge[i]))
2818 continue;
2819 if (graph->edge[i].src == graph->edge[i].dst)
2820 continue;
2821 if (graph->edge[i].src->scc == graph->edge[i].dst->scc)
2822 continue;
2823 if (graph->edge[i].start > con)
2824 continue;
2825 if (graph->edge[i].end <= con)
2826 continue;
2827 graph->src_scc = graph->edge[i].src->scc;
2828 graph->dst_scc = graph->edge[i].dst->scc;
2831 return 0;
2834 /* Check whether the next schedule row of the given node needs to be
2835 * non-trivial. Lower-dimensional domains may have some trivial rows,
2836 * but as soon as the number of remaining required non-trivial rows
2837 * is as large as the number or remaining rows to be computed,
2838 * all remaining rows need to be non-trivial.
2840 static int needs_row(struct isl_sched_graph *graph, struct isl_sched_node *node)
2842 return node->nvar - node->rank >= graph->maxvar - graph->n_row;
2845 /* Construct a non-triviality region with triviality directions
2846 * corresponding to the rows of "indep".
2847 * The rows of "indep" are expressed in terms of the schedule coefficients c_i,
2848 * while the triviality directions are expressed in terms of
2849 * pairs of non-negative variables c^+_i - c^-_i, with c^-_i appearing
2850 * before c^+_i. Furthermore,
2851 * the pairs of non-negative variables representing the coefficients
2852 * are stored in the opposite order.
2854 static __isl_give isl_mat *construct_trivial(__isl_keep isl_mat *indep)
2856 isl_ctx *ctx;
2857 isl_mat *mat;
2858 int i, j, n, n_var;
2860 if (!indep)
2861 return NULL;
2863 ctx = isl_mat_get_ctx(indep);
2864 n = isl_mat_rows(indep);
2865 n_var = isl_mat_cols(indep);
2866 mat = isl_mat_alloc(ctx, n, 2 * n_var);
2867 if (!mat)
2868 return NULL;
2869 for (i = 0; i < n; ++i) {
2870 for (j = 0; j < n_var; ++j) {
2871 int nj = n_var - 1 - j;
2872 isl_int_neg(mat->row[i][2 * nj], indep->row[i][j]);
2873 isl_int_set(mat->row[i][2 * nj + 1], indep->row[i][j]);
2877 return mat;
2880 /* Solve the ILP problem constructed in setup_lp.
2881 * For each node such that all the remaining rows of its schedule
2882 * need to be non-trivial, we construct a non-triviality region.
2883 * This region imposes that the next row is independent of previous rows.
2884 * In particular, the non-triviality region enforces that at least
2885 * one of the linear combinations in the rows of node->indep is non-zero.
2887 static __isl_give isl_vec *solve_lp(isl_ctx *ctx, struct isl_sched_graph *graph)
2889 int i;
2890 isl_vec *sol;
2891 isl_basic_set *lp;
2893 for (i = 0; i < graph->n; ++i) {
2894 struct isl_sched_node *node = &graph->node[i];
2895 isl_mat *trivial;
2897 graph->region[i].pos = node_var_coef_offset(node);
2898 if (needs_row(graph, node))
2899 trivial = construct_trivial(node->indep);
2900 else
2901 trivial = isl_mat_zero(ctx, 0, 0);
2902 graph->region[i].trivial = trivial;
2904 lp = isl_basic_set_copy(graph->lp);
2905 sol = isl_tab_basic_set_non_trivial_lexmin(lp, 2, graph->n,
2906 graph->region, &check_conflict, graph);
2907 for (i = 0; i < graph->n; ++i)
2908 isl_mat_free(graph->region[i].trivial);
2909 return sol;
2912 /* Extract the coefficients for the variables of "node" from "sol".
2914 * Each schedule coefficient c_i_x is represented as the difference
2915 * between two non-negative variables c_i_x^+ - c_i_x^-.
2916 * The c_i_x^- appear before their c_i_x^+ counterpart.
2917 * Furthermore, the order of these pairs is the opposite of that
2918 * of the corresponding coefficients.
2920 * Return c_i_x = c_i_x^+ - c_i_x^-
2922 static __isl_give isl_vec *extract_var_coef(struct isl_sched_node *node,
2923 __isl_keep isl_vec *sol)
2925 int i;
2926 int pos;
2927 isl_vec *csol;
2929 if (!sol)
2930 return NULL;
2931 csol = isl_vec_alloc(isl_vec_get_ctx(sol), node->nvar);
2932 if (!csol)
2933 return NULL;
2935 pos = 1 + node_var_coef_offset(node);
2936 for (i = 0; i < node->nvar; ++i)
2937 isl_int_sub(csol->el[node->nvar - 1 - i],
2938 sol->el[pos + 2 * i + 1], sol->el[pos + 2 * i]);
2940 return csol;
2943 /* Update the schedules of all nodes based on the given solution
2944 * of the LP problem.
2945 * The new row is added to the current band.
2946 * All possibly negative coefficients are encoded as a difference
2947 * of two non-negative variables, so we need to perform the subtraction
2948 * here.
2950 * If coincident is set, then the caller guarantees that the new
2951 * row satisfies the coincidence constraints.
2953 static int update_schedule(struct isl_sched_graph *graph,
2954 __isl_take isl_vec *sol, int coincident)
2956 int i, j;
2957 isl_vec *csol = NULL;
2959 if (!sol)
2960 goto error;
2961 if (sol->size == 0)
2962 isl_die(sol->ctx, isl_error_internal,
2963 "no solution found", goto error);
2964 if (graph->n_total_row >= graph->max_row)
2965 isl_die(sol->ctx, isl_error_internal,
2966 "too many schedule rows", goto error);
2968 for (i = 0; i < graph->n; ++i) {
2969 struct isl_sched_node *node = &graph->node[i];
2970 int pos;
2971 int row = isl_mat_rows(node->sched);
2973 isl_vec_free(csol);
2974 csol = extract_var_coef(node, sol);
2975 if (!csol)
2976 goto error;
2978 isl_map_free(node->sched_map);
2979 node->sched_map = NULL;
2980 node->sched = isl_mat_add_rows(node->sched, 1);
2981 if (!node->sched)
2982 goto error;
2983 pos = node_cst_coef_offset(node);
2984 node->sched = isl_mat_set_element(node->sched,
2985 row, 0, sol->el[1 + pos]);
2986 pos = node_par_coef_offset(node);
2987 for (j = 0; j < node->nparam; ++j)
2988 node->sched = isl_mat_set_element(node->sched,
2989 row, 1 + j, sol->el[1 + pos + j]);
2990 for (j = 0; j < node->nvar; ++j)
2991 node->sched = isl_mat_set_element(node->sched,
2992 row, 1 + node->nparam + j, csol->el[j]);
2993 node->coincident[graph->n_total_row] = coincident;
2995 isl_vec_free(sol);
2996 isl_vec_free(csol);
2998 graph->n_row++;
2999 graph->n_total_row++;
3001 return 0;
3002 error:
3003 isl_vec_free(sol);
3004 isl_vec_free(csol);
3005 return -1;
3008 /* Convert row "row" of node->sched into an isl_aff living in "ls"
3009 * and return this isl_aff.
3011 static __isl_give isl_aff *extract_schedule_row(__isl_take isl_local_space *ls,
3012 struct isl_sched_node *node, int row)
3014 int j;
3015 isl_int v;
3016 isl_aff *aff;
3018 isl_int_init(v);
3020 aff = isl_aff_zero_on_domain(ls);
3021 if (isl_mat_get_element(node->sched, row, 0, &v) < 0)
3022 goto error;
3023 aff = isl_aff_set_constant(aff, v);
3024 for (j = 0; j < node->nparam; ++j) {
3025 if (isl_mat_get_element(node->sched, row, 1 + j, &v) < 0)
3026 goto error;
3027 aff = isl_aff_set_coefficient(aff, isl_dim_param, j, v);
3029 for (j = 0; j < node->nvar; ++j) {
3030 if (isl_mat_get_element(node->sched, row,
3031 1 + node->nparam + j, &v) < 0)
3032 goto error;
3033 aff = isl_aff_set_coefficient(aff, isl_dim_in, j, v);
3036 isl_int_clear(v);
3038 return aff;
3039 error:
3040 isl_int_clear(v);
3041 isl_aff_free(aff);
3042 return NULL;
3045 /* Convert the "n" rows starting at "first" of node->sched into a multi_aff
3046 * and return this multi_aff.
3048 * The result is defined over the uncompressed node domain.
3050 static __isl_give isl_multi_aff *node_extract_partial_schedule_multi_aff(
3051 struct isl_sched_node *node, int first, int n)
3053 int i;
3054 isl_space *space;
3055 isl_local_space *ls;
3056 isl_aff *aff;
3057 isl_multi_aff *ma;
3058 int nrow;
3060 if (!node)
3061 return NULL;
3062 nrow = isl_mat_rows(node->sched);
3063 if (node->compressed)
3064 space = isl_multi_aff_get_domain_space(node->decompress);
3065 else
3066 space = isl_space_copy(node->space);
3067 ls = isl_local_space_from_space(isl_space_copy(space));
3068 space = isl_space_from_domain(space);
3069 space = isl_space_add_dims(space, isl_dim_out, n);
3070 ma = isl_multi_aff_zero(space);
3072 for (i = first; i < first + n; ++i) {
3073 aff = extract_schedule_row(isl_local_space_copy(ls), node, i);
3074 ma = isl_multi_aff_set_aff(ma, i - first, aff);
3077 isl_local_space_free(ls);
3079 if (node->compressed)
3080 ma = isl_multi_aff_pullback_multi_aff(ma,
3081 isl_multi_aff_copy(node->compress));
3083 return ma;
3086 /* Convert node->sched into a multi_aff and return this multi_aff.
3088 * The result is defined over the uncompressed node domain.
3090 static __isl_give isl_multi_aff *node_extract_schedule_multi_aff(
3091 struct isl_sched_node *node)
3093 int nrow;
3095 nrow = isl_mat_rows(node->sched);
3096 return node_extract_partial_schedule_multi_aff(node, 0, nrow);
3099 /* Convert node->sched into a map and return this map.
3101 * The result is cached in node->sched_map, which needs to be released
3102 * whenever node->sched is updated.
3103 * It is defined over the uncompressed node domain.
3105 static __isl_give isl_map *node_extract_schedule(struct isl_sched_node *node)
3107 if (!node->sched_map) {
3108 isl_multi_aff *ma;
3110 ma = node_extract_schedule_multi_aff(node);
3111 node->sched_map = isl_map_from_multi_aff(ma);
3114 return isl_map_copy(node->sched_map);
3117 /* Construct a map that can be used to update a dependence relation
3118 * based on the current schedule.
3119 * That is, construct a map expressing that source and sink
3120 * are executed within the same iteration of the current schedule.
3121 * This map can then be intersected with the dependence relation.
3122 * This is not the most efficient way, but this shouldn't be a critical
3123 * operation.
3125 static __isl_give isl_map *specializer(struct isl_sched_node *src,
3126 struct isl_sched_node *dst)
3128 isl_map *src_sched, *dst_sched;
3130 src_sched = node_extract_schedule(src);
3131 dst_sched = node_extract_schedule(dst);
3132 return isl_map_apply_range(src_sched, isl_map_reverse(dst_sched));
3135 /* Intersect the domains of the nested relations in domain and range
3136 * of "umap" with "map".
3138 static __isl_give isl_union_map *intersect_domains(
3139 __isl_take isl_union_map *umap, __isl_keep isl_map *map)
3141 isl_union_set *uset;
3143 umap = isl_union_map_zip(umap);
3144 uset = isl_union_set_from_set(isl_map_wrap(isl_map_copy(map)));
3145 umap = isl_union_map_intersect_domain(umap, uset);
3146 umap = isl_union_map_zip(umap);
3147 return umap;
3150 /* Update the dependence relation of the given edge based
3151 * on the current schedule.
3152 * If the dependence is carried completely by the current schedule, then
3153 * it is removed from the edge_tables. It is kept in the list of edges
3154 * as otherwise all edge_tables would have to be recomputed.
3156 * If the edge is of a type that can appear multiple times
3157 * between the same pair of nodes, then it is added to
3158 * the edge table (again). This prevents the situation
3159 * where none of these edges is referenced from the edge table
3160 * because the one that was referenced turned out to be empty and
3161 * was therefore removed from the table.
3163 static isl_stat update_edge(isl_ctx *ctx, struct isl_sched_graph *graph,
3164 struct isl_sched_edge *edge)
3166 int empty;
3167 isl_map *id;
3169 id = specializer(edge->src, edge->dst);
3170 edge->map = isl_map_intersect(edge->map, isl_map_copy(id));
3171 if (!edge->map)
3172 goto error;
3174 if (edge->tagged_condition) {
3175 edge->tagged_condition =
3176 intersect_domains(edge->tagged_condition, id);
3177 if (!edge->tagged_condition)
3178 goto error;
3180 if (edge->tagged_validity) {
3181 edge->tagged_validity =
3182 intersect_domains(edge->tagged_validity, id);
3183 if (!edge->tagged_validity)
3184 goto error;
3187 empty = isl_map_plain_is_empty(edge->map);
3188 if (empty < 0)
3189 goto error;
3190 if (empty) {
3191 graph_remove_edge(graph, edge);
3192 } else if (is_multi_edge_type(edge)) {
3193 if (graph_edge_tables_add(ctx, graph, edge) < 0)
3194 goto error;
3197 isl_map_free(id);
3198 return isl_stat_ok;
3199 error:
3200 isl_map_free(id);
3201 return isl_stat_error;
3204 /* Does the domain of "umap" intersect "uset"?
3206 static int domain_intersects(__isl_keep isl_union_map *umap,
3207 __isl_keep isl_union_set *uset)
3209 int empty;
3211 umap = isl_union_map_copy(umap);
3212 umap = isl_union_map_intersect_domain(umap, isl_union_set_copy(uset));
3213 empty = isl_union_map_is_empty(umap);
3214 isl_union_map_free(umap);
3216 return empty < 0 ? -1 : !empty;
3219 /* Does the range of "umap" intersect "uset"?
3221 static int range_intersects(__isl_keep isl_union_map *umap,
3222 __isl_keep isl_union_set *uset)
3224 int empty;
3226 umap = isl_union_map_copy(umap);
3227 umap = isl_union_map_intersect_range(umap, isl_union_set_copy(uset));
3228 empty = isl_union_map_is_empty(umap);
3229 isl_union_map_free(umap);
3231 return empty < 0 ? -1 : !empty;
3234 /* Are the condition dependences of "edge" local with respect to
3235 * the current schedule?
3237 * That is, are domain and range of the condition dependences mapped
3238 * to the same point?
3240 * In other words, is the condition false?
3242 static int is_condition_false(struct isl_sched_edge *edge)
3244 isl_union_map *umap;
3245 isl_map *map, *sched, *test;
3246 int empty, local;
3248 empty = isl_union_map_is_empty(edge->tagged_condition);
3249 if (empty < 0 || empty)
3250 return empty;
3252 umap = isl_union_map_copy(edge->tagged_condition);
3253 umap = isl_union_map_zip(umap);
3254 umap = isl_union_set_unwrap(isl_union_map_domain(umap));
3255 map = isl_map_from_union_map(umap);
3257 sched = node_extract_schedule(edge->src);
3258 map = isl_map_apply_domain(map, sched);
3259 sched = node_extract_schedule(edge->dst);
3260 map = isl_map_apply_range(map, sched);
3262 test = isl_map_identity(isl_map_get_space(map));
3263 local = isl_map_is_subset(map, test);
3264 isl_map_free(map);
3265 isl_map_free(test);
3267 return local;
3270 /* For each conditional validity constraint that is adjacent
3271 * to a condition with domain in condition_source or range in condition_sink,
3272 * turn it into an unconditional validity constraint.
3274 static int unconditionalize_adjacent_validity(struct isl_sched_graph *graph,
3275 __isl_take isl_union_set *condition_source,
3276 __isl_take isl_union_set *condition_sink)
3278 int i;
3280 condition_source = isl_union_set_coalesce(condition_source);
3281 condition_sink = isl_union_set_coalesce(condition_sink);
3283 for (i = 0; i < graph->n_edge; ++i) {
3284 int adjacent;
3285 isl_union_map *validity;
3287 if (!is_conditional_validity(&graph->edge[i]))
3288 continue;
3289 if (is_validity(&graph->edge[i]))
3290 continue;
3292 validity = graph->edge[i].tagged_validity;
3293 adjacent = domain_intersects(validity, condition_sink);
3294 if (adjacent >= 0 && !adjacent)
3295 adjacent = range_intersects(validity, condition_source);
3296 if (adjacent < 0)
3297 goto error;
3298 if (!adjacent)
3299 continue;
3301 set_validity(&graph->edge[i]);
3304 isl_union_set_free(condition_source);
3305 isl_union_set_free(condition_sink);
3306 return 0;
3307 error:
3308 isl_union_set_free(condition_source);
3309 isl_union_set_free(condition_sink);
3310 return -1;
3313 /* Update the dependence relations of all edges based on the current schedule
3314 * and enforce conditional validity constraints that are adjacent
3315 * to satisfied condition constraints.
3317 * First check if any of the condition constraints are satisfied
3318 * (i.e., not local to the outer schedule) and keep track of
3319 * their domain and range.
3320 * Then update all dependence relations (which removes the non-local
3321 * constraints).
3322 * Finally, if any condition constraints turned out to be satisfied,
3323 * then turn all adjacent conditional validity constraints into
3324 * unconditional validity constraints.
3326 static int update_edges(isl_ctx *ctx, struct isl_sched_graph *graph)
3328 int i;
3329 int any = 0;
3330 isl_union_set *source, *sink;
3332 source = isl_union_set_empty(isl_space_params_alloc(ctx, 0));
3333 sink = isl_union_set_empty(isl_space_params_alloc(ctx, 0));
3334 for (i = 0; i < graph->n_edge; ++i) {
3335 int local;
3336 isl_union_set *uset;
3337 isl_union_map *umap;
3339 if (!is_condition(&graph->edge[i]))
3340 continue;
3341 if (is_local(&graph->edge[i]))
3342 continue;
3343 local = is_condition_false(&graph->edge[i]);
3344 if (local < 0)
3345 goto error;
3346 if (local)
3347 continue;
3349 any = 1;
3351 umap = isl_union_map_copy(graph->edge[i].tagged_condition);
3352 uset = isl_union_map_domain(umap);
3353 source = isl_union_set_union(source, uset);
3355 umap = isl_union_map_copy(graph->edge[i].tagged_condition);
3356 uset = isl_union_map_range(umap);
3357 sink = isl_union_set_union(sink, uset);
3360 for (i = 0; i < graph->n_edge; ++i) {
3361 if (update_edge(ctx, graph, &graph->edge[i]) < 0)
3362 goto error;
3365 if (any)
3366 return unconditionalize_adjacent_validity(graph, source, sink);
3368 isl_union_set_free(source);
3369 isl_union_set_free(sink);
3370 return 0;
3371 error:
3372 isl_union_set_free(source);
3373 isl_union_set_free(sink);
3374 return -1;
3377 static void next_band(struct isl_sched_graph *graph)
3379 graph->band_start = graph->n_total_row;
3382 /* Return the union of the universe domains of the nodes in "graph"
3383 * that satisfy "pred".
3385 static __isl_give isl_union_set *isl_sched_graph_domain(isl_ctx *ctx,
3386 struct isl_sched_graph *graph,
3387 int (*pred)(struct isl_sched_node *node, int data), int data)
3389 int i;
3390 isl_set *set;
3391 isl_union_set *dom;
3393 for (i = 0; i < graph->n; ++i)
3394 if (pred(&graph->node[i], data))
3395 break;
3397 if (i >= graph->n)
3398 isl_die(ctx, isl_error_internal,
3399 "empty component", return NULL);
3401 set = isl_set_universe(isl_space_copy(graph->node[i].space));
3402 dom = isl_union_set_from_set(set);
3404 for (i = i + 1; i < graph->n; ++i) {
3405 if (!pred(&graph->node[i], data))
3406 continue;
3407 set = isl_set_universe(isl_space_copy(graph->node[i].space));
3408 dom = isl_union_set_union(dom, isl_union_set_from_set(set));
3411 return dom;
3414 /* Return a list of unions of universe domains, where each element
3415 * in the list corresponds to an SCC (or WCC) indexed by node->scc.
3417 static __isl_give isl_union_set_list *extract_sccs(isl_ctx *ctx,
3418 struct isl_sched_graph *graph)
3420 int i;
3421 isl_union_set_list *filters;
3423 filters = isl_union_set_list_alloc(ctx, graph->scc);
3424 for (i = 0; i < graph->scc; ++i) {
3425 isl_union_set *dom;
3427 dom = isl_sched_graph_domain(ctx, graph, &node_scc_exactly, i);
3428 filters = isl_union_set_list_add(filters, dom);
3431 return filters;
3434 /* Return a list of two unions of universe domains, one for the SCCs up
3435 * to and including graph->src_scc and another for the other SCCs.
3437 static __isl_give isl_union_set_list *extract_split(isl_ctx *ctx,
3438 struct isl_sched_graph *graph)
3440 isl_union_set *dom;
3441 isl_union_set_list *filters;
3443 filters = isl_union_set_list_alloc(ctx, 2);
3444 dom = isl_sched_graph_domain(ctx, graph,
3445 &node_scc_at_most, graph->src_scc);
3446 filters = isl_union_set_list_add(filters, dom);
3447 dom = isl_sched_graph_domain(ctx, graph,
3448 &node_scc_at_least, graph->src_scc + 1);
3449 filters = isl_union_set_list_add(filters, dom);
3451 return filters;
3454 /* Copy nodes that satisfy node_pred from the src dependence graph
3455 * to the dst dependence graph.
3457 static isl_stat copy_nodes(struct isl_sched_graph *dst,
3458 struct isl_sched_graph *src,
3459 int (*node_pred)(struct isl_sched_node *node, int data), int data)
3461 int i;
3463 dst->n = 0;
3464 for (i = 0; i < src->n; ++i) {
3465 int j;
3467 if (!node_pred(&src->node[i], data))
3468 continue;
3470 j = dst->n;
3471 dst->node[j].space = isl_space_copy(src->node[i].space);
3472 dst->node[j].compressed = src->node[i].compressed;
3473 dst->node[j].hull = isl_set_copy(src->node[i].hull);
3474 dst->node[j].compress =
3475 isl_multi_aff_copy(src->node[i].compress);
3476 dst->node[j].decompress =
3477 isl_multi_aff_copy(src->node[i].decompress);
3478 dst->node[j].nvar = src->node[i].nvar;
3479 dst->node[j].nparam = src->node[i].nparam;
3480 dst->node[j].sched = isl_mat_copy(src->node[i].sched);
3481 dst->node[j].sched_map = isl_map_copy(src->node[i].sched_map);
3482 dst->node[j].coincident = src->node[i].coincident;
3483 dst->node[j].sizes = isl_multi_val_copy(src->node[i].sizes);
3484 dst->node[j].bounds = isl_basic_set_copy(src->node[i].bounds);
3485 dst->node[j].max = isl_vec_copy(src->node[i].max);
3486 dst->n++;
3488 if (!dst->node[j].space || !dst->node[j].sched)
3489 return isl_stat_error;
3490 if (dst->node[j].compressed &&
3491 (!dst->node[j].hull || !dst->node[j].compress ||
3492 !dst->node[j].decompress))
3493 return isl_stat_error;
3496 return isl_stat_ok;
3499 /* Copy non-empty edges that satisfy edge_pred from the src dependence graph
3500 * to the dst dependence graph.
3501 * If the source or destination node of the edge is not in the destination
3502 * graph, then it must be a backward proximity edge and it should simply
3503 * be ignored.
3505 static isl_stat copy_edges(isl_ctx *ctx, struct isl_sched_graph *dst,
3506 struct isl_sched_graph *src,
3507 int (*edge_pred)(struct isl_sched_edge *edge, int data), int data)
3509 int i;
3511 dst->n_edge = 0;
3512 for (i = 0; i < src->n_edge; ++i) {
3513 struct isl_sched_edge *edge = &src->edge[i];
3514 isl_map *map;
3515 isl_union_map *tagged_condition;
3516 isl_union_map *tagged_validity;
3517 struct isl_sched_node *dst_src, *dst_dst;
3519 if (!edge_pred(edge, data))
3520 continue;
3522 if (isl_map_plain_is_empty(edge->map))
3523 continue;
3525 dst_src = graph_find_node(ctx, dst, edge->src->space);
3526 dst_dst = graph_find_node(ctx, dst, edge->dst->space);
3527 if (!dst_src || !dst_dst)
3528 return isl_stat_error;
3529 if (!is_node(dst, dst_src) || !is_node(dst, dst_dst)) {
3530 if (is_validity(edge) || is_conditional_validity(edge))
3531 isl_die(ctx, isl_error_internal,
3532 "backward (conditional) validity edge",
3533 return isl_stat_error);
3534 continue;
3537 map = isl_map_copy(edge->map);
3538 tagged_condition = isl_union_map_copy(edge->tagged_condition);
3539 tagged_validity = isl_union_map_copy(edge->tagged_validity);
3541 dst->edge[dst->n_edge].src = dst_src;
3542 dst->edge[dst->n_edge].dst = dst_dst;
3543 dst->edge[dst->n_edge].map = map;
3544 dst->edge[dst->n_edge].tagged_condition = tagged_condition;
3545 dst->edge[dst->n_edge].tagged_validity = tagged_validity;
3546 dst->edge[dst->n_edge].types = edge->types;
3547 dst->n_edge++;
3549 if (edge->tagged_condition && !tagged_condition)
3550 return isl_stat_error;
3551 if (edge->tagged_validity && !tagged_validity)
3552 return isl_stat_error;
3554 if (graph_edge_tables_add(ctx, dst,
3555 &dst->edge[dst->n_edge - 1]) < 0)
3556 return isl_stat_error;
3559 return isl_stat_ok;
3562 /* Compute the maximal number of variables over all nodes.
3563 * This is the maximal number of linearly independent schedule
3564 * rows that we need to compute.
3565 * Just in case we end up in a part of the dependence graph
3566 * with only lower-dimensional domains, we make sure we will
3567 * compute the required amount of extra linearly independent rows.
3569 static int compute_maxvar(struct isl_sched_graph *graph)
3571 int i;
3573 graph->maxvar = 0;
3574 for (i = 0; i < graph->n; ++i) {
3575 struct isl_sched_node *node = &graph->node[i];
3576 int nvar;
3578 if (node_update_vmap(node) < 0)
3579 return -1;
3580 nvar = node->nvar + graph->n_row - node->rank;
3581 if (nvar > graph->maxvar)
3582 graph->maxvar = nvar;
3585 return 0;
3588 /* Extract the subgraph of "graph" that consists of the nodes satisfying
3589 * "node_pred" and the edges satisfying "edge_pred" and store
3590 * the result in "sub".
3592 static isl_stat extract_sub_graph(isl_ctx *ctx, struct isl_sched_graph *graph,
3593 int (*node_pred)(struct isl_sched_node *node, int data),
3594 int (*edge_pred)(struct isl_sched_edge *edge, int data),
3595 int data, struct isl_sched_graph *sub)
3597 int i, n = 0, n_edge = 0;
3598 int t;
3600 for (i = 0; i < graph->n; ++i)
3601 if (node_pred(&graph->node[i], data))
3602 ++n;
3603 for (i = 0; i < graph->n_edge; ++i)
3604 if (edge_pred(&graph->edge[i], data))
3605 ++n_edge;
3606 if (graph_alloc(ctx, sub, n, n_edge) < 0)
3607 return isl_stat_error;
3608 sub->root = graph->root;
3609 if (copy_nodes(sub, graph, node_pred, data) < 0)
3610 return isl_stat_error;
3611 if (graph_init_table(ctx, sub) < 0)
3612 return isl_stat_error;
3613 for (t = 0; t <= isl_edge_last; ++t)
3614 sub->max_edge[t] = graph->max_edge[t];
3615 if (graph_init_edge_tables(ctx, sub) < 0)
3616 return isl_stat_error;
3617 if (copy_edges(ctx, sub, graph, edge_pred, data) < 0)
3618 return isl_stat_error;
3619 sub->n_row = graph->n_row;
3620 sub->max_row = graph->max_row;
3621 sub->n_total_row = graph->n_total_row;
3622 sub->band_start = graph->band_start;
3624 return isl_stat_ok;
3627 static __isl_give isl_schedule_node *compute_schedule(isl_schedule_node *node,
3628 struct isl_sched_graph *graph);
3629 static __isl_give isl_schedule_node *compute_schedule_wcc(
3630 isl_schedule_node *node, struct isl_sched_graph *graph);
3632 /* Compute a schedule for a subgraph of "graph". In particular, for
3633 * the graph composed of nodes that satisfy node_pred and edges that
3634 * that satisfy edge_pred.
3635 * If the subgraph is known to consist of a single component, then wcc should
3636 * be set and then we call compute_schedule_wcc on the constructed subgraph.
3637 * Otherwise, we call compute_schedule, which will check whether the subgraph
3638 * is connected.
3640 * The schedule is inserted at "node" and the updated schedule node
3641 * is returned.
3643 static __isl_give isl_schedule_node *compute_sub_schedule(
3644 __isl_take isl_schedule_node *node, isl_ctx *ctx,
3645 struct isl_sched_graph *graph,
3646 int (*node_pred)(struct isl_sched_node *node, int data),
3647 int (*edge_pred)(struct isl_sched_edge *edge, int data),
3648 int data, int wcc)
3650 struct isl_sched_graph split = { 0 };
3652 if (extract_sub_graph(ctx, graph, node_pred, edge_pred, data,
3653 &split) < 0)
3654 goto error;
3656 if (wcc)
3657 node = compute_schedule_wcc(node, &split);
3658 else
3659 node = compute_schedule(node, &split);
3661 graph_free(ctx, &split);
3662 return node;
3663 error:
3664 graph_free(ctx, &split);
3665 return isl_schedule_node_free(node);
3668 static int edge_scc_exactly(struct isl_sched_edge *edge, int scc)
3670 return edge->src->scc == scc && edge->dst->scc == scc;
3673 static int edge_dst_scc_at_most(struct isl_sched_edge *edge, int scc)
3675 return edge->dst->scc <= scc;
3678 static int edge_src_scc_at_least(struct isl_sched_edge *edge, int scc)
3680 return edge->src->scc >= scc;
3683 /* Reset the current band by dropping all its schedule rows.
3685 static isl_stat reset_band(struct isl_sched_graph *graph)
3687 int i;
3688 int drop;
3690 drop = graph->n_total_row - graph->band_start;
3691 graph->n_total_row -= drop;
3692 graph->n_row -= drop;
3694 for (i = 0; i < graph->n; ++i) {
3695 struct isl_sched_node *node = &graph->node[i];
3697 isl_map_free(node->sched_map);
3698 node->sched_map = NULL;
3700 node->sched = isl_mat_drop_rows(node->sched,
3701 graph->band_start, drop);
3703 if (!node->sched)
3704 return isl_stat_error;
3707 return isl_stat_ok;
3710 /* Split the current graph into two parts and compute a schedule for each
3711 * part individually. In particular, one part consists of all SCCs up
3712 * to and including graph->src_scc, while the other part contains the other
3713 * SCCs. The split is enforced by a sequence node inserted at position "node"
3714 * in the schedule tree. Return the updated schedule node.
3715 * If either of these two parts consists of a sequence, then it is spliced
3716 * into the sequence containing the two parts.
3718 * The current band is reset. It would be possible to reuse
3719 * the previously computed rows as the first rows in the next
3720 * band, but recomputing them may result in better rows as we are looking
3721 * at a smaller part of the dependence graph.
3723 static __isl_give isl_schedule_node *compute_split_schedule(
3724 __isl_take isl_schedule_node *node, struct isl_sched_graph *graph)
3726 int is_seq;
3727 isl_ctx *ctx;
3728 isl_union_set_list *filters;
3730 if (!node)
3731 return NULL;
3733 if (reset_band(graph) < 0)
3734 return isl_schedule_node_free(node);
3736 next_band(graph);
3738 ctx = isl_schedule_node_get_ctx(node);
3739 filters = extract_split(ctx, graph);
3740 node = isl_schedule_node_insert_sequence(node, filters);
3741 node = isl_schedule_node_child(node, 1);
3742 node = isl_schedule_node_child(node, 0);
3744 node = compute_sub_schedule(node, ctx, graph,
3745 &node_scc_at_least, &edge_src_scc_at_least,
3746 graph->src_scc + 1, 0);
3747 is_seq = isl_schedule_node_get_type(node) == isl_schedule_node_sequence;
3748 node = isl_schedule_node_parent(node);
3749 node = isl_schedule_node_parent(node);
3750 if (is_seq)
3751 node = isl_schedule_node_sequence_splice_child(node, 1);
3752 node = isl_schedule_node_child(node, 0);
3753 node = isl_schedule_node_child(node, 0);
3754 node = compute_sub_schedule(node, ctx, graph,
3755 &node_scc_at_most, &edge_dst_scc_at_most,
3756 graph->src_scc, 0);
3757 is_seq = isl_schedule_node_get_type(node) == isl_schedule_node_sequence;
3758 node = isl_schedule_node_parent(node);
3759 node = isl_schedule_node_parent(node);
3760 if (is_seq)
3761 node = isl_schedule_node_sequence_splice_child(node, 0);
3763 return node;
3766 /* Insert a band node at position "node" in the schedule tree corresponding
3767 * to the current band in "graph". Mark the band node permutable
3768 * if "permutable" is set.
3769 * The partial schedules and the coincidence property are extracted
3770 * from the graph nodes.
3771 * Return the updated schedule node.
3773 static __isl_give isl_schedule_node *insert_current_band(
3774 __isl_take isl_schedule_node *node, struct isl_sched_graph *graph,
3775 int permutable)
3777 int i;
3778 int start, end, n;
3779 isl_multi_aff *ma;
3780 isl_multi_pw_aff *mpa;
3781 isl_multi_union_pw_aff *mupa;
3783 if (!node)
3784 return NULL;
3786 if (graph->n < 1)
3787 isl_die(isl_schedule_node_get_ctx(node), isl_error_internal,
3788 "graph should have at least one node",
3789 return isl_schedule_node_free(node));
3791 start = graph->band_start;
3792 end = graph->n_total_row;
3793 n = end - start;
3795 ma = node_extract_partial_schedule_multi_aff(&graph->node[0], start, n);
3796 mpa = isl_multi_pw_aff_from_multi_aff(ma);
3797 mupa = isl_multi_union_pw_aff_from_multi_pw_aff(mpa);
3799 for (i = 1; i < graph->n; ++i) {
3800 isl_multi_union_pw_aff *mupa_i;
3802 ma = node_extract_partial_schedule_multi_aff(&graph->node[i],
3803 start, n);
3804 mpa = isl_multi_pw_aff_from_multi_aff(ma);
3805 mupa_i = isl_multi_union_pw_aff_from_multi_pw_aff(mpa);
3806 mupa = isl_multi_union_pw_aff_union_add(mupa, mupa_i);
3808 node = isl_schedule_node_insert_partial_schedule(node, mupa);
3810 for (i = 0; i < n; ++i)
3811 node = isl_schedule_node_band_member_set_coincident(node, i,
3812 graph->node[0].coincident[start + i]);
3813 node = isl_schedule_node_band_set_permutable(node, permutable);
3815 return node;
3818 /* Update the dependence relations based on the current schedule,
3819 * add the current band to "node" and then continue with the computation
3820 * of the next band.
3821 * Return the updated schedule node.
3823 static __isl_give isl_schedule_node *compute_next_band(
3824 __isl_take isl_schedule_node *node,
3825 struct isl_sched_graph *graph, int permutable)
3827 isl_ctx *ctx;
3829 if (!node)
3830 return NULL;
3832 ctx = isl_schedule_node_get_ctx(node);
3833 if (update_edges(ctx, graph) < 0)
3834 return isl_schedule_node_free(node);
3835 node = insert_current_band(node, graph, permutable);
3836 next_band(graph);
3838 node = isl_schedule_node_child(node, 0);
3839 node = compute_schedule(node, graph);
3840 node = isl_schedule_node_parent(node);
3842 return node;
3845 /* Add the constraints "coef" derived from an edge from "node" to itself
3846 * to graph->lp in order to respect the dependences and to try and carry them.
3847 * "pos" is the sequence number of the edge that needs to be carried.
3848 * "coef" represents general constraints on coefficients (c_0, c_x)
3849 * of valid constraints for (y - x) with x and y instances of the node.
3851 * The constraints added to graph->lp need to enforce
3853 * (c_j_0 + c_j_x y) - (c_j_0 + c_j_x x)
3854 * = c_j_x (y - x) >= e_i
3856 * for each (x,y) in the dependence relation of the edge.
3857 * That is, (-e_i, c_j_x) needs to be plugged in for (c_0, c_x),
3858 * taking into account that each coefficient in c_j_x is represented
3859 * as a pair of non-negative coefficients.
3861 static isl_stat add_intra_constraints(struct isl_sched_graph *graph,
3862 struct isl_sched_node *node, __isl_take isl_basic_set *coef, int pos)
3864 int offset;
3865 isl_ctx *ctx;
3866 isl_dim_map *dim_map;
3868 if (!coef)
3869 return isl_stat_error;
3871 ctx = isl_basic_set_get_ctx(coef);
3872 offset = coef_var_offset(coef);
3873 dim_map = intra_dim_map(ctx, graph, node, offset, 1);
3874 isl_dim_map_range(dim_map, 3 + pos, 0, 0, 0, 1, -1);
3875 graph->lp = add_constraints_dim_map(graph->lp, coef, dim_map);
3877 return isl_stat_ok;
3880 /* Add the constraints "coef" derived from an edge from "src" to "dst"
3881 * to graph->lp in order to respect the dependences and to try and carry them.
3882 * "pos" is the sequence number of the edge that needs to be carried or
3883 * -1 if no attempt should be made to carry the dependences.
3884 * "coef" represents general constraints on coefficients (c_0, c_n, c_x, c_y)
3885 * of valid constraints for (x, y) with x and y instances of "src" and "dst".
3887 * The constraints added to graph->lp need to enforce
3889 * (c_k_0 + c_k_n n + c_k_x y) - (c_j_0 + c_j_n n + c_j_x x) >= e_i
3891 * for each (x,y) in the dependence relation of the edge or
3893 * (c_k_0 + c_k_n n + c_k_x y) - (c_j_0 + c_j_n n + c_j_x x) >= 0
3895 * if pos is -1.
3896 * That is,
3897 * (-e_i + c_k_0 - c_j_0, c_k_n - c_j_n, -c_j_x, c_k_x)
3898 * or
3899 * (c_k_0 - c_j_0, c_k_n - c_j_n, -c_j_x, c_k_x)
3900 * needs to be plugged in for (c_0, c_n, c_x, c_y),
3901 * taking into account that each coefficient in c_j_x and c_k_x is represented
3902 * as a pair of non-negative coefficients.
3904 static isl_stat add_inter_constraints(struct isl_sched_graph *graph,
3905 struct isl_sched_node *src, struct isl_sched_node *dst,
3906 __isl_take isl_basic_set *coef, int pos)
3908 int offset;
3909 isl_ctx *ctx;
3910 isl_dim_map *dim_map;
3912 if (!coef)
3913 return isl_stat_error;
3915 ctx = isl_basic_set_get_ctx(coef);
3916 offset = coef_var_offset(coef);
3917 dim_map = inter_dim_map(ctx, graph, src, dst, offset, 1);
3918 if (pos >= 0)
3919 isl_dim_map_range(dim_map, 3 + pos, 0, 0, 0, 1, -1);
3920 graph->lp = add_constraints_dim_map(graph->lp, coef, dim_map);
3922 return isl_stat_ok;
3925 /* Data structure for keeping track of the data needed
3926 * to exploit non-trivial lineality spaces.
3928 * "any_non_trivial" is true if there are any non-trivial lineality spaces.
3929 * If "any_non_trivial" is not true, then "equivalent" and "mask" may be NULL.
3930 * "equivalent" connects instances to other instances on the same line(s).
3931 * "mask" contains the domain spaces of "equivalent".
3932 * Any instance set not in "mask" does not have a non-trivial lineality space.
3934 struct isl_exploit_lineality_data {
3935 isl_bool any_non_trivial;
3936 isl_union_map *equivalent;
3937 isl_union_set *mask;
3940 /* Data structure collecting information used during the construction
3941 * of an LP for carrying dependences.
3943 * "intra" is a sequence of coefficient constraints for intra-node edges.
3944 * "inter" is a sequence of coefficient constraints for inter-node edges.
3945 * "lineality" contains data used to exploit non-trivial lineality spaces.
3947 struct isl_carry {
3948 isl_basic_set_list *intra;
3949 isl_basic_set_list *inter;
3950 struct isl_exploit_lineality_data lineality;
3953 /* Free all the data stored in "carry".
3955 static void isl_carry_clear(struct isl_carry *carry)
3957 isl_basic_set_list_free(carry->intra);
3958 isl_basic_set_list_free(carry->inter);
3959 isl_union_map_free(carry->lineality.equivalent);
3960 isl_union_set_free(carry->lineality.mask);
3963 /* Return a pointer to the node in "graph" that lives in "space".
3964 * If the requested node has been compressed, then "space"
3965 * corresponds to the compressed space.
3966 * The graph is assumed to have such a node.
3967 * Return NULL in case of error.
3969 * First try and see if "space" is the space of an uncompressed node.
3970 * If so, return that node.
3971 * Otherwise, "space" was constructed by construct_compressed_id and
3972 * contains a user pointer pointing to the node in the tuple id.
3973 * However, this node belongs to the original dependence graph.
3974 * If "graph" is a subgraph of this original dependence graph,
3975 * then the node with the same space still needs to be looked up
3976 * in the current graph.
3978 static struct isl_sched_node *graph_find_compressed_node(isl_ctx *ctx,
3979 struct isl_sched_graph *graph, __isl_keep isl_space *space)
3981 isl_id *id;
3982 struct isl_sched_node *node;
3984 if (!space)
3985 return NULL;
3987 node = graph_find_node(ctx, graph, space);
3988 if (!node)
3989 return NULL;
3990 if (is_node(graph, node))
3991 return node;
3993 id = isl_space_get_tuple_id(space, isl_dim_set);
3994 node = isl_id_get_user(id);
3995 isl_id_free(id);
3997 if (!node)
3998 return NULL;
4000 if (!is_node(graph->root, node))
4001 isl_die(ctx, isl_error_internal,
4002 "space points to invalid node", return NULL);
4003 if (graph != graph->root)
4004 node = graph_find_node(ctx, graph, node->space);
4005 if (!is_node(graph, node))
4006 isl_die(ctx, isl_error_internal,
4007 "unable to find node", return NULL);
4009 return node;
4012 /* Internal data structure for add_all_constraints.
4014 * "graph" is the schedule constraint graph for which an LP problem
4015 * is being constructed.
4016 * "carry_inter" indicates whether inter-node edges should be carried.
4017 * "pos" is the position of the next edge that needs to be carried.
4019 struct isl_add_all_constraints_data {
4020 isl_ctx *ctx;
4021 struct isl_sched_graph *graph;
4022 int carry_inter;
4023 int pos;
4026 /* Add the constraints "coef" derived from an edge from a node to itself
4027 * to data->graph->lp in order to respect the dependences and
4028 * to try and carry them.
4030 * The space of "coef" is of the form
4032 * coefficients[[c_cst] -> S[c_x]]
4034 * with S[c_x] the (compressed) space of the node.
4035 * Extract the node from the space and call add_intra_constraints.
4037 static isl_stat lp_add_intra(__isl_take isl_basic_set *coef, void *user)
4039 struct isl_add_all_constraints_data *data = user;
4040 isl_space *space;
4041 struct isl_sched_node *node;
4043 space = isl_basic_set_get_space(coef);
4044 space = isl_space_range(isl_space_unwrap(space));
4045 node = graph_find_compressed_node(data->ctx, data->graph, space);
4046 isl_space_free(space);
4047 return add_intra_constraints(data->graph, node, coef, data->pos++);
4050 /* Add the constraints "coef" derived from an edge from a node j
4051 * to a node k to data->graph->lp in order to respect the dependences and
4052 * to try and carry them (provided data->carry_inter is set).
4054 * The space of "coef" is of the form
4056 * coefficients[[c_cst, c_n] -> [S_j[c_x] -> S_k[c_y]]]
4058 * with S_j[c_x] and S_k[c_y] the (compressed) spaces of the nodes.
4059 * Extract the nodes from the space and call add_inter_constraints.
4061 static isl_stat lp_add_inter(__isl_take isl_basic_set *coef, void *user)
4063 struct isl_add_all_constraints_data *data = user;
4064 isl_space *space, *dom;
4065 struct isl_sched_node *src, *dst;
4066 int pos;
4068 space = isl_basic_set_get_space(coef);
4069 space = isl_space_unwrap(isl_space_range(isl_space_unwrap(space)));
4070 dom = isl_space_domain(isl_space_copy(space));
4071 src = graph_find_compressed_node(data->ctx, data->graph, dom);
4072 isl_space_free(dom);
4073 space = isl_space_range(space);
4074 dst = graph_find_compressed_node(data->ctx, data->graph, space);
4075 isl_space_free(space);
4077 pos = data->carry_inter ? data->pos++ : -1;
4078 return add_inter_constraints(data->graph, src, dst, coef, pos);
4081 /* Add constraints to graph->lp that force all (conditional) validity
4082 * dependences to be respected and attempt to carry them.
4083 * "intra" is the sequence of coefficient constraints for intra-node edges.
4084 * "inter" is the sequence of coefficient constraints for inter-node edges.
4085 * "carry_inter" indicates whether inter-node edges should be carried or
4086 * only respected.
4088 static isl_stat add_all_constraints(isl_ctx *ctx, struct isl_sched_graph *graph,
4089 __isl_keep isl_basic_set_list *intra,
4090 __isl_keep isl_basic_set_list *inter, int carry_inter)
4092 struct isl_add_all_constraints_data data = { ctx, graph, carry_inter };
4094 data.pos = 0;
4095 if (isl_basic_set_list_foreach(intra, &lp_add_intra, &data) < 0)
4096 return isl_stat_error;
4097 if (isl_basic_set_list_foreach(inter, &lp_add_inter, &data) < 0)
4098 return isl_stat_error;
4099 return isl_stat_ok;
4102 /* Internal data structure for count_all_constraints
4103 * for keeping track of the number of equality and inequality constraints.
4105 struct isl_sched_count {
4106 int n_eq;
4107 int n_ineq;
4110 /* Add the number of equality and inequality constraints of "bset"
4111 * to data->n_eq and data->n_ineq.
4113 static isl_stat bset_update_count(__isl_take isl_basic_set *bset, void *user)
4115 struct isl_sched_count *data = user;
4117 return update_count(bset, 1, &data->n_eq, &data->n_ineq);
4120 /* Count the number of equality and inequality constraints
4121 * that will be added to the carry_lp problem.
4122 * We count each edge exactly once.
4123 * "intra" is the sequence of coefficient constraints for intra-node edges.
4124 * "inter" is the sequence of coefficient constraints for inter-node edges.
4126 static isl_stat count_all_constraints(__isl_keep isl_basic_set_list *intra,
4127 __isl_keep isl_basic_set_list *inter, int *n_eq, int *n_ineq)
4129 struct isl_sched_count data;
4131 data.n_eq = data.n_ineq = 0;
4132 if (isl_basic_set_list_foreach(inter, &bset_update_count, &data) < 0)
4133 return isl_stat_error;
4134 if (isl_basic_set_list_foreach(intra, &bset_update_count, &data) < 0)
4135 return isl_stat_error;
4137 *n_eq = data.n_eq;
4138 *n_ineq = data.n_ineq;
4140 return isl_stat_ok;
4143 /* Construct an LP problem for finding schedule coefficients
4144 * such that the schedule carries as many validity dependences as possible.
4145 * In particular, for each dependence i, we bound the dependence distance
4146 * from below by e_i, with 0 <= e_i <= 1 and then maximize the sum
4147 * of all e_i's. Dependences with e_i = 0 in the solution are simply
4148 * respected, while those with e_i > 0 (in practice e_i = 1) are carried.
4149 * "intra" is the sequence of coefficient constraints for intra-node edges.
4150 * "inter" is the sequence of coefficient constraints for inter-node edges.
4151 * "n_edge" is the total number of edges.
4152 * "carry_inter" indicates whether inter-node edges should be carried or
4153 * only respected. That is, if "carry_inter" is not set, then
4154 * no e_i variables are introduced for the inter-node edges.
4156 * All variables of the LP are non-negative. The actual coefficients
4157 * may be negative, so each coefficient is represented as the difference
4158 * of two non-negative variables. The negative part always appears
4159 * immediately before the positive part.
4160 * Other than that, the variables have the following order
4162 * - sum of (1 - e_i) over all edges
4163 * - sum of all c_n coefficients
4164 * (unconstrained when computing non-parametric schedules)
4165 * - sum of positive and negative parts of all c_x coefficients
4166 * - for each edge
4167 * - e_i
4168 * - for each node
4169 * - positive and negative parts of c_i_x, in opposite order
4170 * - c_i_n (if parametric)
4171 * - c_i_0
4173 * The constraints are those from the (validity) edges plus three equalities
4174 * to express the sums and n_edge inequalities to express e_i <= 1.
4176 static isl_stat setup_carry_lp(isl_ctx *ctx, struct isl_sched_graph *graph,
4177 int n_edge, __isl_keep isl_basic_set_list *intra,
4178 __isl_keep isl_basic_set_list *inter, int carry_inter)
4180 int i;
4181 int k;
4182 isl_space *dim;
4183 unsigned total;
4184 int n_eq, n_ineq;
4186 total = 3 + n_edge;
4187 for (i = 0; i < graph->n; ++i) {
4188 struct isl_sched_node *node = &graph->node[graph->sorted[i]];
4189 node->start = total;
4190 total += 1 + node->nparam + 2 * node->nvar;
4193 if (count_all_constraints(intra, inter, &n_eq, &n_ineq) < 0)
4194 return isl_stat_error;
4196 dim = isl_space_set_alloc(ctx, 0, total);
4197 isl_basic_set_free(graph->lp);
4198 n_eq += 3;
4199 n_ineq += n_edge;
4200 graph->lp = isl_basic_set_alloc_space(dim, 0, n_eq, n_ineq);
4201 graph->lp = isl_basic_set_set_rational(graph->lp);
4203 k = isl_basic_set_alloc_equality(graph->lp);
4204 if (k < 0)
4205 return isl_stat_error;
4206 isl_seq_clr(graph->lp->eq[k], 1 + total);
4207 isl_int_set_si(graph->lp->eq[k][0], -n_edge);
4208 isl_int_set_si(graph->lp->eq[k][1], 1);
4209 for (i = 0; i < n_edge; ++i)
4210 isl_int_set_si(graph->lp->eq[k][4 + i], 1);
4212 if (add_param_sum_constraint(graph, 1) < 0)
4213 return isl_stat_error;
4214 if (add_var_sum_constraint(graph, 2) < 0)
4215 return isl_stat_error;
4217 for (i = 0; i < n_edge; ++i) {
4218 k = isl_basic_set_alloc_inequality(graph->lp);
4219 if (k < 0)
4220 return isl_stat_error;
4221 isl_seq_clr(graph->lp->ineq[k], 1 + total);
4222 isl_int_set_si(graph->lp->ineq[k][4 + i], -1);
4223 isl_int_set_si(graph->lp->ineq[k][0], 1);
4226 if (add_all_constraints(ctx, graph, intra, inter, carry_inter) < 0)
4227 return isl_stat_error;
4229 return isl_stat_ok;
4232 static __isl_give isl_schedule_node *compute_component_schedule(
4233 __isl_take isl_schedule_node *node, struct isl_sched_graph *graph,
4234 int wcc);
4236 /* If the schedule_split_scaled option is set and if the linear
4237 * parts of the scheduling rows for all nodes in the graphs have
4238 * a non-trivial common divisor, then remove this
4239 * common divisor from the linear part.
4240 * Otherwise, insert a band node directly and continue with
4241 * the construction of the schedule.
4243 * If a non-trivial common divisor is found, then
4244 * the linear part is reduced and the remainder is ignored.
4245 * The pieces of the graph that are assigned different remainders
4246 * form (groups of) strongly connected components within
4247 * the scaled down band. If needed, they can therefore
4248 * be ordered along this remainder in a sequence node.
4249 * However, this ordering is not enforced here in order to allow
4250 * the scheduler to combine some of the strongly connected components.
4252 static __isl_give isl_schedule_node *split_scaled(
4253 __isl_take isl_schedule_node *node, struct isl_sched_graph *graph)
4255 int i;
4256 int row;
4257 isl_ctx *ctx;
4258 isl_int gcd, gcd_i;
4260 if (!node)
4261 return NULL;
4263 ctx = isl_schedule_node_get_ctx(node);
4264 if (!ctx->opt->schedule_split_scaled)
4265 return compute_next_band(node, graph, 0);
4266 if (graph->n <= 1)
4267 return compute_next_band(node, graph, 0);
4269 isl_int_init(gcd);
4270 isl_int_init(gcd_i);
4272 isl_int_set_si(gcd, 0);
4274 row = isl_mat_rows(graph->node[0].sched) - 1;
4276 for (i = 0; i < graph->n; ++i) {
4277 struct isl_sched_node *node = &graph->node[i];
4278 int cols = isl_mat_cols(node->sched);
4280 isl_seq_gcd(node->sched->row[row] + 1, cols - 1, &gcd_i);
4281 isl_int_gcd(gcd, gcd, gcd_i);
4284 isl_int_clear(gcd_i);
4286 if (isl_int_cmp_si(gcd, 1) <= 0) {
4287 isl_int_clear(gcd);
4288 return compute_next_band(node, graph, 0);
4291 for (i = 0; i < graph->n; ++i) {
4292 struct isl_sched_node *node = &graph->node[i];
4294 isl_int_fdiv_q(node->sched->row[row][0],
4295 node->sched->row[row][0], gcd);
4296 isl_int_mul(node->sched->row[row][0],
4297 node->sched->row[row][0], gcd);
4298 node->sched = isl_mat_scale_down_row(node->sched, row, gcd);
4299 if (!node->sched)
4300 goto error;
4303 isl_int_clear(gcd);
4305 return compute_next_band(node, graph, 0);
4306 error:
4307 isl_int_clear(gcd);
4308 return isl_schedule_node_free(node);
4311 /* Is the schedule row "sol" trivial on node "node"?
4312 * That is, is the solution zero on the dimensions linearly independent of
4313 * the previously found solutions?
4314 * Return 1 if the solution is trivial, 0 if it is not and -1 on error.
4316 * Each coefficient is represented as the difference between
4317 * two non-negative values in "sol".
4318 * We construct the schedule row s and check if it is linearly
4319 * independent of previously computed schedule rows
4320 * by computing T s, with T the linear combinations that are zero
4321 * on linearly dependent schedule rows.
4322 * If the result consists of all zeros, then the solution is trivial.
4324 static int is_trivial(struct isl_sched_node *node, __isl_keep isl_vec *sol)
4326 int trivial;
4327 isl_vec *node_sol;
4329 if (!sol)
4330 return -1;
4331 if (node->nvar == node->rank)
4332 return 0;
4334 node_sol = extract_var_coef(node, sol);
4335 node_sol = isl_mat_vec_product(isl_mat_copy(node->indep), node_sol);
4336 if (!node_sol)
4337 return -1;
4339 trivial = isl_seq_first_non_zero(node_sol->el,
4340 node->nvar - node->rank) == -1;
4342 isl_vec_free(node_sol);
4344 return trivial;
4347 /* Is the schedule row "sol" trivial on any node where it should
4348 * not be trivial?
4349 * Return 1 if any solution is trivial, 0 if they are not and -1 on error.
4351 static int is_any_trivial(struct isl_sched_graph *graph,
4352 __isl_keep isl_vec *sol)
4354 int i;
4356 for (i = 0; i < graph->n; ++i) {
4357 struct isl_sched_node *node = &graph->node[i];
4358 int trivial;
4360 if (!needs_row(graph, node))
4361 continue;
4362 trivial = is_trivial(node, sol);
4363 if (trivial < 0 || trivial)
4364 return trivial;
4367 return 0;
4370 /* Does the schedule represented by "sol" perform loop coalescing on "node"?
4371 * If so, return the position of the coalesced dimension.
4372 * Otherwise, return node->nvar or -1 on error.
4374 * In particular, look for pairs of coefficients c_i and c_j such that
4375 * |c_j/c_i| > ceil(size_i/2), i.e., |c_j| > |c_i * ceil(size_i/2)|.
4376 * If any such pair is found, then return i.
4377 * If size_i is infinity, then no check on c_i needs to be performed.
4379 static int find_node_coalescing(struct isl_sched_node *node,
4380 __isl_keep isl_vec *sol)
4382 int i, j;
4383 isl_int max;
4384 isl_vec *csol;
4386 if (node->nvar <= 1)
4387 return node->nvar;
4389 csol = extract_var_coef(node, sol);
4390 if (!csol)
4391 return -1;
4392 isl_int_init(max);
4393 for (i = 0; i < node->nvar; ++i) {
4394 isl_val *v;
4396 if (isl_int_is_zero(csol->el[i]))
4397 continue;
4398 v = isl_multi_val_get_val(node->sizes, i);
4399 if (!v)
4400 goto error;
4401 if (!isl_val_is_int(v)) {
4402 isl_val_free(v);
4403 continue;
4405 v = isl_val_div_ui(v, 2);
4406 v = isl_val_ceil(v);
4407 if (!v)
4408 goto error;
4409 isl_int_mul(max, v->n, csol->el[i]);
4410 isl_val_free(v);
4412 for (j = 0; j < node->nvar; ++j) {
4413 if (j == i)
4414 continue;
4415 if (isl_int_abs_gt(csol->el[j], max))
4416 break;
4418 if (j < node->nvar)
4419 break;
4422 isl_int_clear(max);
4423 isl_vec_free(csol);
4424 return i;
4425 error:
4426 isl_int_clear(max);
4427 isl_vec_free(csol);
4428 return -1;
4431 /* Force the schedule coefficient at position "pos" of "node" to be zero
4432 * in "tl".
4433 * The coefficient is encoded as the difference between two non-negative
4434 * variables. Force these two variables to have the same value.
4436 static __isl_give isl_tab_lexmin *zero_out_node_coef(
4437 __isl_take isl_tab_lexmin *tl, struct isl_sched_node *node, int pos)
4439 int dim;
4440 isl_ctx *ctx;
4441 isl_vec *eq;
4443 ctx = isl_space_get_ctx(node->space);
4444 dim = isl_tab_lexmin_dim(tl);
4445 if (dim < 0)
4446 return isl_tab_lexmin_free(tl);
4447 eq = isl_vec_alloc(ctx, 1 + dim);
4448 eq = isl_vec_clr(eq);
4449 if (!eq)
4450 return isl_tab_lexmin_free(tl);
4452 pos = 1 + node_var_coef_pos(node, pos);
4453 isl_int_set_si(eq->el[pos], 1);
4454 isl_int_set_si(eq->el[pos + 1], -1);
4455 tl = isl_tab_lexmin_add_eq(tl, eq->el);
4456 isl_vec_free(eq);
4458 return tl;
4461 /* Return the lexicographically smallest rational point in the basic set
4462 * from which "tl" was constructed, double checking that this input set
4463 * was not empty.
4465 static __isl_give isl_vec *non_empty_solution(__isl_keep isl_tab_lexmin *tl)
4467 isl_vec *sol;
4469 sol = isl_tab_lexmin_get_solution(tl);
4470 if (!sol)
4471 return NULL;
4472 if (sol->size == 0)
4473 isl_die(isl_vec_get_ctx(sol), isl_error_internal,
4474 "error in schedule construction",
4475 return isl_vec_free(sol));
4476 return sol;
4479 /* Does the solution "sol" of the LP problem constructed by setup_carry_lp
4480 * carry any of the "n_edge" groups of dependences?
4481 * The value in the first position is the sum of (1 - e_i) over all "n_edge"
4482 * edges, with 0 <= e_i <= 1 equal to 1 when the dependences represented
4483 * by the edge are carried by the solution.
4484 * If the sum of the (1 - e_i) is smaller than "n_edge" then at least
4485 * one of those is carried.
4487 * Note that despite the fact that the problem is solved using a rational
4488 * solver, the solution is guaranteed to be integral.
4489 * Specifically, the dependence distance lower bounds e_i (and therefore
4490 * also their sum) are integers. See Lemma 5 of [1].
4492 * Any potential denominator of the sum is cleared by this function.
4493 * The denominator is not relevant for any of the other elements
4494 * in the solution.
4496 * [1] P. Feautrier, Some Efficient Solutions to the Affine Scheduling
4497 * Problem, Part II: Multi-Dimensional Time.
4498 * In Intl. Journal of Parallel Programming, 1992.
4500 static int carries_dependences(__isl_keep isl_vec *sol, int n_edge)
4502 isl_int_divexact(sol->el[1], sol->el[1], sol->el[0]);
4503 isl_int_set_si(sol->el[0], 1);
4504 return isl_int_cmp_si(sol->el[1], n_edge) < 0;
4507 /* Return the lexicographically smallest rational point in "lp",
4508 * assuming that all variables are non-negative and performing some
4509 * additional sanity checks.
4510 * If "want_integral" is set, then compute the lexicographically smallest
4511 * integer point instead.
4512 * In particular, "lp" should not be empty by construction.
4513 * Double check that this is the case.
4514 * If dependences are not carried for any of the "n_edge" edges,
4515 * then return an empty vector.
4517 * If the schedule_treat_coalescing option is set and
4518 * if the computed schedule performs loop coalescing on a given node,
4519 * i.e., if it is of the form
4521 * c_i i + c_j j + ...
4523 * with |c_j/c_i| >= size_i, then force the coefficient c_i to be zero
4524 * to cut out this solution. Repeat this process until no more loop
4525 * coalescing occurs or until no more dependences can be carried.
4526 * In the latter case, revert to the previously computed solution.
4528 * If the caller requests an integral solution and if coalescing should
4529 * be treated, then perform the coalescing treatment first as
4530 * an integral solution computed before coalescing treatment
4531 * would carry the same number of edges and would therefore probably
4532 * also be coalescing.
4534 * To allow the coalescing treatment to be performed first,
4535 * the initial solution is allowed to be rational and it is only
4536 * cut out (if needed) in the next iteration, if no coalescing measures
4537 * were taken.
4539 static __isl_give isl_vec *non_neg_lexmin(struct isl_sched_graph *graph,
4540 __isl_take isl_basic_set *lp, int n_edge, int want_integral)
4542 int i, pos, cut;
4543 isl_ctx *ctx;
4544 isl_tab_lexmin *tl;
4545 isl_vec *sol = NULL, *prev;
4546 int treat_coalescing;
4547 int try_again;
4549 if (!lp)
4550 return NULL;
4551 ctx = isl_basic_set_get_ctx(lp);
4552 treat_coalescing = isl_options_get_schedule_treat_coalescing(ctx);
4553 tl = isl_tab_lexmin_from_basic_set(lp);
4555 cut = 0;
4556 do {
4557 int integral;
4559 try_again = 0;
4560 if (cut)
4561 tl = isl_tab_lexmin_cut_to_integer(tl);
4562 prev = sol;
4563 sol = non_empty_solution(tl);
4564 if (!sol)
4565 goto error;
4567 integral = isl_int_is_one(sol->el[0]);
4568 if (!carries_dependences(sol, n_edge)) {
4569 if (!prev)
4570 prev = isl_vec_alloc(ctx, 0);
4571 isl_vec_free(sol);
4572 sol = prev;
4573 break;
4575 prev = isl_vec_free(prev);
4576 cut = want_integral && !integral;
4577 if (cut)
4578 try_again = 1;
4579 if (!treat_coalescing)
4580 continue;
4581 for (i = 0; i < graph->n; ++i) {
4582 struct isl_sched_node *node = &graph->node[i];
4584 pos = find_node_coalescing(node, sol);
4585 if (pos < 0)
4586 goto error;
4587 if (pos < node->nvar)
4588 break;
4590 if (i < graph->n) {
4591 try_again = 1;
4592 tl = zero_out_node_coef(tl, &graph->node[i], pos);
4593 cut = 0;
4595 } while (try_again);
4597 isl_tab_lexmin_free(tl);
4599 return sol;
4600 error:
4601 isl_tab_lexmin_free(tl);
4602 isl_vec_free(prev);
4603 isl_vec_free(sol);
4604 return NULL;
4607 /* If "edge" is an edge from a node to itself, then add the corresponding
4608 * dependence relation to "umap".
4609 * If "node" has been compressed, then the dependence relation
4610 * is also compressed first.
4612 static __isl_give isl_union_map *add_intra(__isl_take isl_union_map *umap,
4613 struct isl_sched_edge *edge)
4615 isl_map *map;
4616 struct isl_sched_node *node = edge->src;
4618 if (edge->src != edge->dst)
4619 return umap;
4621 map = isl_map_copy(edge->map);
4622 if (node->compressed) {
4623 map = isl_map_preimage_domain_multi_aff(map,
4624 isl_multi_aff_copy(node->decompress));
4625 map = isl_map_preimage_range_multi_aff(map,
4626 isl_multi_aff_copy(node->decompress));
4628 umap = isl_union_map_add_map(umap, map);
4629 return umap;
4632 /* If "edge" is an edge from a node to another node, then add the corresponding
4633 * dependence relation to "umap".
4634 * If the source or destination nodes of "edge" have been compressed,
4635 * then the dependence relation is also compressed first.
4637 static __isl_give isl_union_map *add_inter(__isl_take isl_union_map *umap,
4638 struct isl_sched_edge *edge)
4640 isl_map *map;
4642 if (edge->src == edge->dst)
4643 return umap;
4645 map = isl_map_copy(edge->map);
4646 if (edge->src->compressed)
4647 map = isl_map_preimage_domain_multi_aff(map,
4648 isl_multi_aff_copy(edge->src->decompress));
4649 if (edge->dst->compressed)
4650 map = isl_map_preimage_range_multi_aff(map,
4651 isl_multi_aff_copy(edge->dst->decompress));
4652 umap = isl_union_map_add_map(umap, map);
4653 return umap;
4656 /* Internal data structure used by union_drop_coalescing_constraints
4657 * to collect bounds on all relevant statements.
4659 * "graph" is the schedule constraint graph for which an LP problem
4660 * is being constructed.
4661 * "bounds" collects the bounds.
4663 struct isl_collect_bounds_data {
4664 isl_ctx *ctx;
4665 struct isl_sched_graph *graph;
4666 isl_union_set *bounds;
4669 /* Add the size bounds for the node with instance deltas in "set"
4670 * to data->bounds.
4672 static isl_stat collect_bounds(__isl_take isl_set *set, void *user)
4674 struct isl_collect_bounds_data *data = user;
4675 struct isl_sched_node *node;
4676 isl_space *space;
4677 isl_set *bounds;
4679 space = isl_set_get_space(set);
4680 isl_set_free(set);
4682 node = graph_find_compressed_node(data->ctx, data->graph, space);
4683 isl_space_free(space);
4685 bounds = isl_set_from_basic_set(get_size_bounds(node));
4686 data->bounds = isl_union_set_add_set(data->bounds, bounds);
4688 return isl_stat_ok;
4691 /* Drop some constraints from "delta" that could be exploited
4692 * to construct loop coalescing schedules.
4693 * In particular, drop those constraint that bound the difference
4694 * to the size of the domain.
4695 * Do this for each set/node in "delta" separately.
4696 * The parameters are assumed to have been projected out by the caller.
4698 static __isl_give isl_union_set *union_drop_coalescing_constraints(isl_ctx *ctx,
4699 struct isl_sched_graph *graph, __isl_take isl_union_set *delta)
4701 struct isl_collect_bounds_data data = { ctx, graph };
4703 data.bounds = isl_union_set_empty(isl_space_params_alloc(ctx, 0));
4704 if (isl_union_set_foreach_set(delta, &collect_bounds, &data) < 0)
4705 data.bounds = isl_union_set_free(data.bounds);
4706 delta = isl_union_set_plain_gist(delta, data.bounds);
4708 return delta;
4711 /* Given a non-trivial lineality space "lineality", add the corresponding
4712 * universe set to data->mask and add a map from elements to
4713 * other elements along the lines in "lineality" to data->equivalent.
4714 * If this is the first time this function gets called
4715 * (data->any_non_trivial is still false), then set data->any_non_trivial and
4716 * initialize data->mask and data->equivalent.
4718 * In particular, if the lineality space is defined by equality constraints
4720 * E x = 0
4722 * then construct an affine mapping
4724 * f : x -> E x
4726 * and compute the equivalence relation of having the same image under f:
4728 * { x -> x' : E x = E x' }
4730 static isl_stat add_non_trivial_lineality(__isl_take isl_basic_set *lineality,
4731 struct isl_exploit_lineality_data *data)
4733 isl_mat *eq;
4734 isl_space *space;
4735 isl_set *univ;
4736 isl_multi_aff *ma;
4737 isl_multi_pw_aff *mpa;
4738 isl_map *map;
4739 int n;
4741 if (!lineality)
4742 return isl_stat_error;
4743 if (isl_basic_set_dim(lineality, isl_dim_div) != 0)
4744 isl_die(isl_basic_set_get_ctx(lineality), isl_error_internal,
4745 "local variables not allowed", goto error);
4747 space = isl_basic_set_get_space(lineality);
4748 if (!data->any_non_trivial) {
4749 data->equivalent = isl_union_map_empty(isl_space_copy(space));
4750 data->mask = isl_union_set_empty(isl_space_copy(space));
4752 data->any_non_trivial = isl_bool_true;
4754 univ = isl_set_universe(isl_space_copy(space));
4755 data->mask = isl_union_set_add_set(data->mask, univ);
4757 eq = isl_basic_set_extract_equalities(lineality);
4758 n = isl_mat_rows(eq);
4759 eq = isl_mat_insert_zero_rows(eq, 0, 1);
4760 eq = isl_mat_set_element_si(eq, 0, 0, 1);
4761 space = isl_space_from_domain(space);
4762 space = isl_space_add_dims(space, isl_dim_out, n);
4763 ma = isl_multi_aff_from_aff_mat(space, eq);
4764 mpa = isl_multi_pw_aff_from_multi_aff(ma);
4765 map = isl_multi_pw_aff_eq_map(mpa, isl_multi_pw_aff_copy(mpa));
4766 data->equivalent = isl_union_map_add_map(data->equivalent, map);
4768 isl_basic_set_free(lineality);
4769 return isl_stat_ok;
4770 error:
4771 isl_basic_set_free(lineality);
4772 return isl_stat_error;
4775 /* Check if the lineality space "set" is non-trivial (i.e., is not just
4776 * the origin or, in other words, satisfies a number of equality constraints
4777 * that is smaller than the dimension of the set).
4778 * If so, extend data->mask and data->equivalent accordingly.
4780 * The input should not have any local variables already, but
4781 * isl_set_remove_divs is called to make sure it does not.
4783 static isl_stat add_lineality(__isl_take isl_set *set, void *user)
4785 struct isl_exploit_lineality_data *data = user;
4786 isl_basic_set *hull;
4787 int dim, n_eq;
4789 set = isl_set_remove_divs(set);
4790 hull = isl_set_unshifted_simple_hull(set);
4791 dim = isl_basic_set_dim(hull, isl_dim_set);
4792 n_eq = isl_basic_set_n_equality(hull);
4793 if (!hull)
4794 return isl_stat_error;
4795 if (dim != n_eq)
4796 return add_non_trivial_lineality(hull, data);
4797 isl_basic_set_free(hull);
4798 return isl_stat_ok;
4801 /* Check if the difference set on intra-node schedule constraints "intra"
4802 * has any non-trivial lineality space.
4803 * If so, then extend the difference set to a difference set
4804 * on equivalent elements. That is, if "intra" is
4806 * { y - x : (x,y) \in V }
4808 * and elements are equivalent if they have the same image under f,
4809 * then return
4811 * { y' - x' : (x,y) \in V and f(x) = f(x') and f(y) = f(y') }
4813 * or, since f is linear,
4815 * { y' - x' : (x,y) \in V and f(y - x) = f(y' - x') }
4817 * The results of the search for non-trivial lineality spaces is stored
4818 * in "data".
4820 static __isl_give isl_union_set *exploit_intra_lineality(
4821 __isl_take isl_union_set *intra,
4822 struct isl_exploit_lineality_data *data)
4824 isl_union_set *lineality;
4825 isl_union_set *uset;
4827 data->any_non_trivial = isl_bool_false;
4828 lineality = isl_union_set_copy(intra);
4829 lineality = isl_union_set_combined_lineality_space(lineality);
4830 if (isl_union_set_foreach_set(lineality, &add_lineality, data) < 0)
4831 data->any_non_trivial = isl_bool_error;
4832 isl_union_set_free(lineality);
4834 if (data->any_non_trivial < 0)
4835 return isl_union_set_free(intra);
4836 if (!data->any_non_trivial)
4837 return intra;
4839 uset = isl_union_set_copy(intra);
4840 intra = isl_union_set_subtract(intra, isl_union_set_copy(data->mask));
4841 uset = isl_union_set_apply(uset, isl_union_map_copy(data->equivalent));
4842 intra = isl_union_set_union(intra, uset);
4844 intra = isl_union_set_remove_divs(intra);
4846 return intra;
4849 /* If the difference set on intra-node schedule constraints was found to have
4850 * any non-trivial lineality space by exploit_intra_lineality,
4851 * as recorded in "data", then extend the inter-node
4852 * schedule constraints "inter" to schedule constraints on equivalent elements.
4853 * That is, if "inter" is V and
4854 * elements are equivalent if they have the same image under f, then return
4856 * { (x', y') : (x,y) \in V and f(x) = f(x') and f(y) = f(y') }
4858 static __isl_give isl_union_map *exploit_inter_lineality(
4859 __isl_take isl_union_map *inter,
4860 struct isl_exploit_lineality_data *data)
4862 isl_union_map *umap;
4864 if (data->any_non_trivial < 0)
4865 return isl_union_map_free(inter);
4866 if (!data->any_non_trivial)
4867 return inter;
4869 umap = isl_union_map_copy(inter);
4870 inter = isl_union_map_subtract_range(inter,
4871 isl_union_set_copy(data->mask));
4872 umap = isl_union_map_apply_range(umap,
4873 isl_union_map_copy(data->equivalent));
4874 inter = isl_union_map_union(inter, umap);
4875 umap = isl_union_map_copy(inter);
4876 inter = isl_union_map_subtract_domain(inter,
4877 isl_union_set_copy(data->mask));
4878 umap = isl_union_map_apply_range(isl_union_map_copy(data->equivalent),
4879 umap);
4880 inter = isl_union_map_union(inter, umap);
4882 inter = isl_union_map_remove_divs(inter);
4884 return inter;
4887 /* For each (conditional) validity edge in "graph",
4888 * add the corresponding dependence relation using "add"
4889 * to a collection of dependence relations and return the result.
4890 * If "coincidence" is set, then coincidence edges are considered as well.
4892 static __isl_give isl_union_map *collect_validity(struct isl_sched_graph *graph,
4893 __isl_give isl_union_map *(*add)(__isl_take isl_union_map *umap,
4894 struct isl_sched_edge *edge), int coincidence)
4896 int i;
4897 isl_space *space;
4898 isl_union_map *umap;
4900 space = isl_space_copy(graph->node[0].space);
4901 umap = isl_union_map_empty(space);
4903 for (i = 0; i < graph->n_edge; ++i) {
4904 struct isl_sched_edge *edge = &graph->edge[i];
4906 if (!is_any_validity(edge) &&
4907 (!coincidence || !is_coincidence(edge)))
4908 continue;
4910 umap = add(umap, edge);
4913 return umap;
4916 /* Project out all parameters from "uset" and return the result.
4918 static __isl_give isl_union_set *union_set_drop_parameters(
4919 __isl_take isl_union_set *uset)
4921 unsigned nparam;
4923 nparam = isl_union_set_dim(uset, isl_dim_param);
4924 return isl_union_set_project_out(uset, isl_dim_param, 0, nparam);
4927 /* For each dependence relation on a (conditional) validity edge
4928 * from a node to itself,
4929 * construct the set of coefficients of valid constraints for elements
4930 * in that dependence relation and collect the results.
4931 * If "coincidence" is set, then coincidence edges are considered as well.
4933 * In particular, for each dependence relation R, constraints
4934 * on coefficients (c_0, c_x) are constructed such that
4936 * c_0 + c_x d >= 0 for each d in delta R = { y - x | (x,y) in R }
4938 * If the schedule_treat_coalescing option is set, then some constraints
4939 * that could be exploited to construct coalescing schedules
4940 * are removed before the dual is computed, but after the parameters
4941 * have been projected out.
4942 * The entire computation is essentially the same as that performed
4943 * by intra_coefficients, except that it operates on multiple
4944 * edges together and that the parameters are always projected out.
4946 * Additionally, exploit any non-trivial lineality space
4947 * in the difference set after removing coalescing constraints and
4948 * store the results of the non-trivial lineality space detection in "data".
4949 * The procedure is currently run unconditionally, but it is unlikely
4950 * to find any non-trivial lineality spaces if no coalescing constraints
4951 * have been removed.
4953 * Note that if a dependence relation is a union of basic maps,
4954 * then each basic map needs to be treated individually as it may only
4955 * be possible to carry the dependences expressed by some of those
4956 * basic maps and not all of them.
4957 * The collected validity constraints are therefore not coalesced and
4958 * it is assumed that they are not coalesced automatically.
4959 * Duplicate basic maps can be removed, however.
4960 * In particular, if the same basic map appears as a disjunct
4961 * in multiple edges, then it only needs to be carried once.
4963 static __isl_give isl_basic_set_list *collect_intra_validity(isl_ctx *ctx,
4964 struct isl_sched_graph *graph, int coincidence,
4965 struct isl_exploit_lineality_data *data)
4967 isl_union_map *intra;
4968 isl_union_set *delta;
4969 isl_basic_set_list *list;
4971 intra = collect_validity(graph, &add_intra, coincidence);
4972 delta = isl_union_map_deltas(intra);
4973 delta = union_set_drop_parameters(delta);
4974 delta = isl_union_set_remove_divs(delta);
4975 if (isl_options_get_schedule_treat_coalescing(ctx))
4976 delta = union_drop_coalescing_constraints(ctx, graph, delta);
4977 delta = exploit_intra_lineality(delta, data);
4978 list = isl_union_set_get_basic_set_list(delta);
4979 isl_union_set_free(delta);
4981 return isl_basic_set_list_coefficients(list);
4984 /* For each dependence relation on a (conditional) validity edge
4985 * from a node to some other node,
4986 * construct the set of coefficients of valid constraints for elements
4987 * in that dependence relation and collect the results.
4988 * If "coincidence" is set, then coincidence edges are considered as well.
4990 * In particular, for each dependence relation R, constraints
4991 * on coefficients (c_0, c_n, c_x, c_y) are constructed such that
4993 * c_0 + c_n n + c_x x + c_y y >= 0 for each (x,y) in R
4995 * This computation is essentially the same as that performed
4996 * by inter_coefficients, except that it operates on multiple
4997 * edges together.
4999 * Additionally, exploit any non-trivial lineality space
5000 * that may have been discovered by collect_intra_validity
5001 * (as stored in "data").
5003 * Note that if a dependence relation is a union of basic maps,
5004 * then each basic map needs to be treated individually as it may only
5005 * be possible to carry the dependences expressed by some of those
5006 * basic maps and not all of them.
5007 * The collected validity constraints are therefore not coalesced and
5008 * it is assumed that they are not coalesced automatically.
5009 * Duplicate basic maps can be removed, however.
5010 * In particular, if the same basic map appears as a disjunct
5011 * in multiple edges, then it only needs to be carried once.
5013 static __isl_give isl_basic_set_list *collect_inter_validity(
5014 struct isl_sched_graph *graph, int coincidence,
5015 struct isl_exploit_lineality_data *data)
5017 isl_union_map *inter;
5018 isl_union_set *wrap;
5019 isl_basic_set_list *list;
5021 inter = collect_validity(graph, &add_inter, coincidence);
5022 inter = exploit_inter_lineality(inter, data);
5023 inter = isl_union_map_remove_divs(inter);
5024 wrap = isl_union_map_wrap(inter);
5025 list = isl_union_set_get_basic_set_list(wrap);
5026 isl_union_set_free(wrap);
5027 return isl_basic_set_list_coefficients(list);
5030 /* Construct an LP problem for finding schedule coefficients
5031 * such that the schedule carries as many of the "n_edge" groups of
5032 * dependences as possible based on the corresponding coefficient
5033 * constraints and return the lexicographically smallest non-trivial solution.
5034 * "intra" is the sequence of coefficient constraints for intra-node edges.
5035 * "inter" is the sequence of coefficient constraints for inter-node edges.
5036 * If "want_integral" is set, then compute an integral solution
5037 * for the coefficients rather than using the numerators
5038 * of a rational solution.
5039 * "carry_inter" indicates whether inter-node edges should be carried or
5040 * only respected.
5042 * If none of the "n_edge" groups can be carried
5043 * then return an empty vector.
5045 static __isl_give isl_vec *compute_carrying_sol_coef(isl_ctx *ctx,
5046 struct isl_sched_graph *graph, int n_edge,
5047 __isl_keep isl_basic_set_list *intra,
5048 __isl_keep isl_basic_set_list *inter, int want_integral,
5049 int carry_inter)
5051 isl_basic_set *lp;
5053 if (setup_carry_lp(ctx, graph, n_edge, intra, inter, carry_inter) < 0)
5054 return NULL;
5056 lp = isl_basic_set_copy(graph->lp);
5057 return non_neg_lexmin(graph, lp, n_edge, want_integral);
5060 /* Construct an LP problem for finding schedule coefficients
5061 * such that the schedule carries as many of the validity dependences
5062 * as possible and
5063 * return the lexicographically smallest non-trivial solution.
5064 * If "fallback" is set, then the carrying is performed as a fallback
5065 * for the Pluto-like scheduler.
5066 * If "coincidence" is set, then try and carry coincidence edges as well.
5068 * The variable "n_edge" stores the number of groups that should be carried.
5069 * If none of the "n_edge" groups can be carried
5070 * then return an empty vector.
5071 * If, moreover, "n_edge" is zero, then the LP problem does not even
5072 * need to be constructed.
5074 * If a fallback solution is being computed, then compute an integral solution
5075 * for the coefficients rather than using the numerators
5076 * of a rational solution.
5078 * If a fallback solution is being computed, if there are any intra-node
5079 * dependences, and if requested by the user, then first try
5080 * to only carry those intra-node dependences.
5081 * If this fails to carry any dependences, then try again
5082 * with the inter-node dependences included.
5084 static __isl_give isl_vec *compute_carrying_sol(isl_ctx *ctx,
5085 struct isl_sched_graph *graph, int fallback, int coincidence)
5087 int n_intra, n_inter;
5088 int n_edge;
5089 struct isl_carry carry = { 0 };
5090 isl_vec *sol;
5092 carry.intra = collect_intra_validity(ctx, graph, coincidence,
5093 &carry.lineality);
5094 carry.inter = collect_inter_validity(graph, coincidence,
5095 &carry.lineality);
5096 if (!carry.intra || !carry.inter)
5097 goto error;
5098 n_intra = isl_basic_set_list_n_basic_set(carry.intra);
5099 n_inter = isl_basic_set_list_n_basic_set(carry.inter);
5101 if (fallback && n_intra > 0 &&
5102 isl_options_get_schedule_carry_self_first(ctx)) {
5103 sol = compute_carrying_sol_coef(ctx, graph, n_intra,
5104 carry.intra, carry.inter, fallback, 0);
5105 if (!sol || sol->size != 0 || n_inter == 0) {
5106 isl_carry_clear(&carry);
5107 return sol;
5109 isl_vec_free(sol);
5112 n_edge = n_intra + n_inter;
5113 if (n_edge == 0) {
5114 isl_carry_clear(&carry);
5115 return isl_vec_alloc(ctx, 0);
5118 sol = compute_carrying_sol_coef(ctx, graph, n_edge,
5119 carry.intra, carry.inter, fallback, 1);
5120 isl_carry_clear(&carry);
5121 return sol;
5122 error:
5123 isl_carry_clear(&carry);
5124 return NULL;
5127 /* Construct a schedule row for each node such that as many validity dependences
5128 * as possible are carried and then continue with the next band.
5129 * If "fallback" is set, then the carrying is performed as a fallback
5130 * for the Pluto-like scheduler.
5131 * If "coincidence" is set, then try and carry coincidence edges as well.
5133 * If there are no validity dependences, then no dependence can be carried and
5134 * the procedure is guaranteed to fail. If there is more than one component,
5135 * then try computing a schedule on each component separately
5136 * to prevent or at least postpone this failure.
5138 * If a schedule row is computed, then check that dependences are carried
5139 * for at least one of the edges.
5141 * If the computed schedule row turns out to be trivial on one or
5142 * more nodes where it should not be trivial, then we throw it away
5143 * and try again on each component separately.
5145 * If there is only one component, then we accept the schedule row anyway,
5146 * but we do not consider it as a complete row and therefore do not
5147 * increment graph->n_row. Note that the ranks of the nodes that
5148 * do get a non-trivial schedule part will get updated regardless and
5149 * graph->maxvar is computed based on these ranks. The test for
5150 * whether more schedule rows are required in compute_schedule_wcc
5151 * is therefore not affected.
5153 * Insert a band corresponding to the schedule row at position "node"
5154 * of the schedule tree and continue with the construction of the schedule.
5155 * This insertion and the continued construction is performed by split_scaled
5156 * after optionally checking for non-trivial common divisors.
5158 static __isl_give isl_schedule_node *carry(__isl_take isl_schedule_node *node,
5159 struct isl_sched_graph *graph, int fallback, int coincidence)
5161 int trivial;
5162 isl_ctx *ctx;
5163 isl_vec *sol;
5165 if (!node)
5166 return NULL;
5168 ctx = isl_schedule_node_get_ctx(node);
5169 sol = compute_carrying_sol(ctx, graph, fallback, coincidence);
5170 if (!sol)
5171 return isl_schedule_node_free(node);
5172 if (sol->size == 0) {
5173 isl_vec_free(sol);
5174 if (graph->scc > 1)
5175 return compute_component_schedule(node, graph, 1);
5176 isl_die(ctx, isl_error_unknown, "unable to carry dependences",
5177 return isl_schedule_node_free(node));
5180 trivial = is_any_trivial(graph, sol);
5181 if (trivial < 0) {
5182 sol = isl_vec_free(sol);
5183 } else if (trivial && graph->scc > 1) {
5184 isl_vec_free(sol);
5185 return compute_component_schedule(node, graph, 1);
5188 if (update_schedule(graph, sol, 0) < 0)
5189 return isl_schedule_node_free(node);
5190 if (trivial)
5191 graph->n_row--;
5193 return split_scaled(node, graph);
5196 /* Construct a schedule row for each node such that as many validity dependences
5197 * as possible are carried and then continue with the next band.
5198 * Do so as a fallback for the Pluto-like scheduler.
5199 * If "coincidence" is set, then try and carry coincidence edges as well.
5201 static __isl_give isl_schedule_node *carry_fallback(
5202 __isl_take isl_schedule_node *node, struct isl_sched_graph *graph,
5203 int coincidence)
5205 return carry(node, graph, 1, coincidence);
5208 /* Construct a schedule row for each node such that as many validity dependences
5209 * as possible are carried and then continue with the next band.
5210 * Do so for the case where the Feautrier scheduler was selected
5211 * by the user.
5213 static __isl_give isl_schedule_node *carry_feautrier(
5214 __isl_take isl_schedule_node *node, struct isl_sched_graph *graph)
5216 return carry(node, graph, 0, 0);
5219 /* Construct a schedule row for each node such that as many validity dependences
5220 * as possible are carried and then continue with the next band.
5221 * Do so as a fallback for the Pluto-like scheduler.
5223 static __isl_give isl_schedule_node *carry_dependences(
5224 __isl_take isl_schedule_node *node, struct isl_sched_graph *graph)
5226 return carry_fallback(node, graph, 0);
5229 /* Construct a schedule row for each node such that as many validity or
5230 * coincidence dependences as possible are carried and
5231 * then continue with the next band.
5232 * Do so as a fallback for the Pluto-like scheduler.
5234 static __isl_give isl_schedule_node *carry_coincidence(
5235 __isl_take isl_schedule_node *node, struct isl_sched_graph *graph)
5237 return carry_fallback(node, graph, 1);
5240 /* Topologically sort statements mapped to the same schedule iteration
5241 * and add insert a sequence node in front of "node"
5242 * corresponding to this order.
5243 * If "initialized" is set, then it may be assumed that compute_maxvar
5244 * has been called on the current band. Otherwise, call
5245 * compute_maxvar if and before carry_dependences gets called.
5247 * If it turns out to be impossible to sort the statements apart,
5248 * because different dependences impose different orderings
5249 * on the statements, then we extend the schedule such that
5250 * it carries at least one more dependence.
5252 static __isl_give isl_schedule_node *sort_statements(
5253 __isl_take isl_schedule_node *node, struct isl_sched_graph *graph,
5254 int initialized)
5256 isl_ctx *ctx;
5257 isl_union_set_list *filters;
5259 if (!node)
5260 return NULL;
5262 ctx = isl_schedule_node_get_ctx(node);
5263 if (graph->n < 1)
5264 isl_die(ctx, isl_error_internal,
5265 "graph should have at least one node",
5266 return isl_schedule_node_free(node));
5268 if (graph->n == 1)
5269 return node;
5271 if (update_edges(ctx, graph) < 0)
5272 return isl_schedule_node_free(node);
5274 if (graph->n_edge == 0)
5275 return node;
5277 if (detect_sccs(ctx, graph) < 0)
5278 return isl_schedule_node_free(node);
5280 next_band(graph);
5281 if (graph->scc < graph->n) {
5282 if (!initialized && compute_maxvar(graph) < 0)
5283 return isl_schedule_node_free(node);
5284 return carry_dependences(node, graph);
5287 filters = extract_sccs(ctx, graph);
5288 node = isl_schedule_node_insert_sequence(node, filters);
5290 return node;
5293 /* Are there any (non-empty) (conditional) validity edges in the graph?
5295 static int has_validity_edges(struct isl_sched_graph *graph)
5297 int i;
5299 for (i = 0; i < graph->n_edge; ++i) {
5300 int empty;
5302 empty = isl_map_plain_is_empty(graph->edge[i].map);
5303 if (empty < 0)
5304 return -1;
5305 if (empty)
5306 continue;
5307 if (is_any_validity(&graph->edge[i]))
5308 return 1;
5311 return 0;
5314 /* Should we apply a Feautrier step?
5315 * That is, did the user request the Feautrier algorithm and are
5316 * there any validity dependences (left)?
5318 static int need_feautrier_step(isl_ctx *ctx, struct isl_sched_graph *graph)
5320 if (ctx->opt->schedule_algorithm != ISL_SCHEDULE_ALGORITHM_FEAUTRIER)
5321 return 0;
5323 return has_validity_edges(graph);
5326 /* Compute a schedule for a connected dependence graph using Feautrier's
5327 * multi-dimensional scheduling algorithm and return the updated schedule node.
5329 * The original algorithm is described in [1].
5330 * The main idea is to minimize the number of scheduling dimensions, by
5331 * trying to satisfy as many dependences as possible per scheduling dimension.
5333 * [1] P. Feautrier, Some Efficient Solutions to the Affine Scheduling
5334 * Problem, Part II: Multi-Dimensional Time.
5335 * In Intl. Journal of Parallel Programming, 1992.
5337 static __isl_give isl_schedule_node *compute_schedule_wcc_feautrier(
5338 isl_schedule_node *node, struct isl_sched_graph *graph)
5340 return carry_feautrier(node, graph);
5343 /* Turn off the "local" bit on all (condition) edges.
5345 static void clear_local_edges(struct isl_sched_graph *graph)
5347 int i;
5349 for (i = 0; i < graph->n_edge; ++i)
5350 if (is_condition(&graph->edge[i]))
5351 clear_local(&graph->edge[i]);
5354 /* Does "graph" have both condition and conditional validity edges?
5356 static int need_condition_check(struct isl_sched_graph *graph)
5358 int i;
5359 int any_condition = 0;
5360 int any_conditional_validity = 0;
5362 for (i = 0; i < graph->n_edge; ++i) {
5363 if (is_condition(&graph->edge[i]))
5364 any_condition = 1;
5365 if (is_conditional_validity(&graph->edge[i]))
5366 any_conditional_validity = 1;
5369 return any_condition && any_conditional_validity;
5372 /* Does "graph" contain any coincidence edge?
5374 static int has_any_coincidence(struct isl_sched_graph *graph)
5376 int i;
5378 for (i = 0; i < graph->n_edge; ++i)
5379 if (is_coincidence(&graph->edge[i]))
5380 return 1;
5382 return 0;
5385 /* Extract the final schedule row as a map with the iteration domain
5386 * of "node" as domain.
5388 static __isl_give isl_map *final_row(struct isl_sched_node *node)
5390 isl_multi_aff *ma;
5391 int row;
5393 row = isl_mat_rows(node->sched) - 1;
5394 ma = node_extract_partial_schedule_multi_aff(node, row, 1);
5395 return isl_map_from_multi_aff(ma);
5398 /* Is the conditional validity dependence in the edge with index "edge_index"
5399 * violated by the latest (i.e., final) row of the schedule?
5400 * That is, is i scheduled after j
5401 * for any conditional validity dependence i -> j?
5403 static int is_violated(struct isl_sched_graph *graph, int edge_index)
5405 isl_map *src_sched, *dst_sched, *map;
5406 struct isl_sched_edge *edge = &graph->edge[edge_index];
5407 int empty;
5409 src_sched = final_row(edge->src);
5410 dst_sched = final_row(edge->dst);
5411 map = isl_map_copy(edge->map);
5412 map = isl_map_apply_domain(map, src_sched);
5413 map = isl_map_apply_range(map, dst_sched);
5414 map = isl_map_order_gt(map, isl_dim_in, 0, isl_dim_out, 0);
5415 empty = isl_map_is_empty(map);
5416 isl_map_free(map);
5418 if (empty < 0)
5419 return -1;
5421 return !empty;
5424 /* Does "graph" have any satisfied condition edges that
5425 * are adjacent to the conditional validity constraint with
5426 * domain "conditional_source" and range "conditional_sink"?
5428 * A satisfied condition is one that is not local.
5429 * If a condition was forced to be local already (i.e., marked as local)
5430 * then there is no need to check if it is in fact local.
5432 * Additionally, mark all adjacent condition edges found as local.
5434 static int has_adjacent_true_conditions(struct isl_sched_graph *graph,
5435 __isl_keep isl_union_set *conditional_source,
5436 __isl_keep isl_union_set *conditional_sink)
5438 int i;
5439 int any = 0;
5441 for (i = 0; i < graph->n_edge; ++i) {
5442 int adjacent, local;
5443 isl_union_map *condition;
5445 if (!is_condition(&graph->edge[i]))
5446 continue;
5447 if (is_local(&graph->edge[i]))
5448 continue;
5450 condition = graph->edge[i].tagged_condition;
5451 adjacent = domain_intersects(condition, conditional_sink);
5452 if (adjacent >= 0 && !adjacent)
5453 adjacent = range_intersects(condition,
5454 conditional_source);
5455 if (adjacent < 0)
5456 return -1;
5457 if (!adjacent)
5458 continue;
5460 set_local(&graph->edge[i]);
5462 local = is_condition_false(&graph->edge[i]);
5463 if (local < 0)
5464 return -1;
5465 if (!local)
5466 any = 1;
5469 return any;
5472 /* Are there any violated conditional validity dependences with
5473 * adjacent condition dependences that are not local with respect
5474 * to the current schedule?
5475 * That is, is the conditional validity constraint violated?
5477 * Additionally, mark all those adjacent condition dependences as local.
5478 * We also mark those adjacent condition dependences that were not marked
5479 * as local before, but just happened to be local already. This ensures
5480 * that they remain local if the schedule is recomputed.
5482 * We first collect domain and range of all violated conditional validity
5483 * dependences and then check if there are any adjacent non-local
5484 * condition dependences.
5486 static int has_violated_conditional_constraint(isl_ctx *ctx,
5487 struct isl_sched_graph *graph)
5489 int i;
5490 int any = 0;
5491 isl_union_set *source, *sink;
5493 source = isl_union_set_empty(isl_space_params_alloc(ctx, 0));
5494 sink = isl_union_set_empty(isl_space_params_alloc(ctx, 0));
5495 for (i = 0; i < graph->n_edge; ++i) {
5496 isl_union_set *uset;
5497 isl_union_map *umap;
5498 int violated;
5500 if (!is_conditional_validity(&graph->edge[i]))
5501 continue;
5503 violated = is_violated(graph, i);
5504 if (violated < 0)
5505 goto error;
5506 if (!violated)
5507 continue;
5509 any = 1;
5511 umap = isl_union_map_copy(graph->edge[i].tagged_validity);
5512 uset = isl_union_map_domain(umap);
5513 source = isl_union_set_union(source, uset);
5514 source = isl_union_set_coalesce(source);
5516 umap = isl_union_map_copy(graph->edge[i].tagged_validity);
5517 uset = isl_union_map_range(umap);
5518 sink = isl_union_set_union(sink, uset);
5519 sink = isl_union_set_coalesce(sink);
5522 if (any)
5523 any = has_adjacent_true_conditions(graph, source, sink);
5525 isl_union_set_free(source);
5526 isl_union_set_free(sink);
5527 return any;
5528 error:
5529 isl_union_set_free(source);
5530 isl_union_set_free(sink);
5531 return -1;
5534 /* Examine the current band (the rows between graph->band_start and
5535 * graph->n_total_row), deciding whether to drop it or add it to "node"
5536 * and then continue with the computation of the next band, if any.
5537 * If "initialized" is set, then it may be assumed that compute_maxvar
5538 * has been called on the current band. Otherwise, call
5539 * compute_maxvar if and before carry_dependences gets called.
5541 * The caller keeps looking for a new row as long as
5542 * graph->n_row < graph->maxvar. If the latest attempt to find
5543 * such a row failed (i.e., we still have graph->n_row < graph->maxvar),
5544 * then we either
5545 * - split between SCCs and start over (assuming we found an interesting
5546 * pair of SCCs between which to split)
5547 * - continue with the next band (assuming the current band has at least
5548 * one row)
5549 * - if there is more than one SCC left, then split along all SCCs
5550 * - if outer coincidence needs to be enforced, then try to carry as many
5551 * validity or coincidence dependences as possible and
5552 * continue with the next band
5553 * - try to carry as many validity dependences as possible and
5554 * continue with the next band
5555 * In each case, we first insert a band node in the schedule tree
5556 * if any rows have been computed.
5558 * If the caller managed to complete the schedule and the current band
5559 * is empty, then finish off by topologically
5560 * sorting the statements based on the remaining dependences.
5561 * If, on the other hand, the current band has at least one row,
5562 * then continue with the next band. Note that this next band
5563 * will necessarily be empty, but the graph may still be split up
5564 * into weakly connected components before arriving back here.
5566 static __isl_give isl_schedule_node *compute_schedule_finish_band(
5567 __isl_take isl_schedule_node *node, struct isl_sched_graph *graph,
5568 int initialized)
5570 int empty;
5572 if (!node)
5573 return NULL;
5575 empty = graph->n_total_row == graph->band_start;
5576 if (graph->n_row < graph->maxvar) {
5577 isl_ctx *ctx;
5579 ctx = isl_schedule_node_get_ctx(node);
5580 if (!ctx->opt->schedule_maximize_band_depth && !empty)
5581 return compute_next_band(node, graph, 1);
5582 if (graph->src_scc >= 0)
5583 return compute_split_schedule(node, graph);
5584 if (!empty)
5585 return compute_next_band(node, graph, 1);
5586 if (graph->scc > 1)
5587 return compute_component_schedule(node, graph, 1);
5588 if (!initialized && compute_maxvar(graph) < 0)
5589 return isl_schedule_node_free(node);
5590 if (isl_options_get_schedule_outer_coincidence(ctx))
5591 return carry_coincidence(node, graph);
5592 return carry_dependences(node, graph);
5595 if (!empty)
5596 return compute_next_band(node, graph, 1);
5597 return sort_statements(node, graph, initialized);
5600 /* Construct a band of schedule rows for a connected dependence graph.
5601 * The caller is responsible for determining the strongly connected
5602 * components and calling compute_maxvar first.
5604 * We try to find a sequence of as many schedule rows as possible that result
5605 * in non-negative dependence distances (independent of the previous rows
5606 * in the sequence, i.e., such that the sequence is tilable), with as
5607 * many of the initial rows as possible satisfying the coincidence constraints.
5608 * The computation stops if we can't find any more rows or if we have found
5609 * all the rows we wanted to find.
5611 * If ctx->opt->schedule_outer_coincidence is set, then we force the
5612 * outermost dimension to satisfy the coincidence constraints. If this
5613 * turns out to be impossible, we fall back on the general scheme above
5614 * and try to carry as many dependences as possible.
5616 * If "graph" contains both condition and conditional validity dependences,
5617 * then we need to check that that the conditional schedule constraint
5618 * is satisfied, i.e., there are no violated conditional validity dependences
5619 * that are adjacent to any non-local condition dependences.
5620 * If there are, then we mark all those adjacent condition dependences
5621 * as local and recompute the current band. Those dependences that
5622 * are marked local will then be forced to be local.
5623 * The initial computation is performed with no dependences marked as local.
5624 * If we are lucky, then there will be no violated conditional validity
5625 * dependences adjacent to any non-local condition dependences.
5626 * Otherwise, we mark some additional condition dependences as local and
5627 * recompute. We continue this process until there are no violations left or
5628 * until we are no longer able to compute a schedule.
5629 * Since there are only a finite number of dependences,
5630 * there will only be a finite number of iterations.
5632 static isl_stat compute_schedule_wcc_band(isl_ctx *ctx,
5633 struct isl_sched_graph *graph)
5635 int has_coincidence;
5636 int use_coincidence;
5637 int force_coincidence = 0;
5638 int check_conditional;
5640 if (sort_sccs(graph) < 0)
5641 return isl_stat_error;
5643 clear_local_edges(graph);
5644 check_conditional = need_condition_check(graph);
5645 has_coincidence = has_any_coincidence(graph);
5647 if (ctx->opt->schedule_outer_coincidence)
5648 force_coincidence = 1;
5650 use_coincidence = has_coincidence;
5651 while (graph->n_row < graph->maxvar) {
5652 isl_vec *sol;
5653 int violated;
5654 int coincident;
5656 graph->src_scc = -1;
5657 graph->dst_scc = -1;
5659 if (setup_lp(ctx, graph, use_coincidence) < 0)
5660 return isl_stat_error;
5661 sol = solve_lp(ctx, graph);
5662 if (!sol)
5663 return isl_stat_error;
5664 if (sol->size == 0) {
5665 int empty = graph->n_total_row == graph->band_start;
5667 isl_vec_free(sol);
5668 if (use_coincidence && (!force_coincidence || !empty)) {
5669 use_coincidence = 0;
5670 continue;
5672 return isl_stat_ok;
5674 coincident = !has_coincidence || use_coincidence;
5675 if (update_schedule(graph, sol, coincident) < 0)
5676 return isl_stat_error;
5678 if (!check_conditional)
5679 continue;
5680 violated = has_violated_conditional_constraint(ctx, graph);
5681 if (violated < 0)
5682 return isl_stat_error;
5683 if (!violated)
5684 continue;
5685 if (reset_band(graph) < 0)
5686 return isl_stat_error;
5687 use_coincidence = has_coincidence;
5690 return isl_stat_ok;
5693 /* Compute a schedule for a connected dependence graph by considering
5694 * the graph as a whole and return the updated schedule node.
5696 * The actual schedule rows of the current band are computed by
5697 * compute_schedule_wcc_band. compute_schedule_finish_band takes
5698 * care of integrating the band into "node" and continuing
5699 * the computation.
5701 static __isl_give isl_schedule_node *compute_schedule_wcc_whole(
5702 __isl_take isl_schedule_node *node, struct isl_sched_graph *graph)
5704 isl_ctx *ctx;
5706 if (!node)
5707 return NULL;
5709 ctx = isl_schedule_node_get_ctx(node);
5710 if (compute_schedule_wcc_band(ctx, graph) < 0)
5711 return isl_schedule_node_free(node);
5713 return compute_schedule_finish_band(node, graph, 1);
5716 /* Clustering information used by compute_schedule_wcc_clustering.
5718 * "n" is the number of SCCs in the original dependence graph
5719 * "scc" is an array of "n" elements, each representing an SCC
5720 * of the original dependence graph. All entries in the same cluster
5721 * have the same number of schedule rows.
5722 * "scc_cluster" maps each SCC index to the cluster to which it belongs,
5723 * where each cluster is represented by the index of the first SCC
5724 * in the cluster. Initially, each SCC belongs to a cluster containing
5725 * only that SCC.
5727 * "scc_in_merge" is used by merge_clusters_along_edge to keep
5728 * track of which SCCs need to be merged.
5730 * "cluster" contains the merged clusters of SCCs after the clustering
5731 * has completed.
5733 * "scc_node" is a temporary data structure used inside copy_partial.
5734 * For each SCC, it keeps track of the number of nodes in the SCC
5735 * that have already been copied.
5737 struct isl_clustering {
5738 int n;
5739 struct isl_sched_graph *scc;
5740 struct isl_sched_graph *cluster;
5741 int *scc_cluster;
5742 int *scc_node;
5743 int *scc_in_merge;
5746 /* Initialize the clustering data structure "c" from "graph".
5748 * In particular, allocate memory, extract the SCCs from "graph"
5749 * into c->scc, initialize scc_cluster and construct
5750 * a band of schedule rows for each SCC.
5751 * Within each SCC, there is only one SCC by definition.
5752 * Each SCC initially belongs to a cluster containing only that SCC.
5754 static isl_stat clustering_init(isl_ctx *ctx, struct isl_clustering *c,
5755 struct isl_sched_graph *graph)
5757 int i;
5759 c->n = graph->scc;
5760 c->scc = isl_calloc_array(ctx, struct isl_sched_graph, c->n);
5761 c->cluster = isl_calloc_array(ctx, struct isl_sched_graph, c->n);
5762 c->scc_cluster = isl_calloc_array(ctx, int, c->n);
5763 c->scc_node = isl_calloc_array(ctx, int, c->n);
5764 c->scc_in_merge = isl_calloc_array(ctx, int, c->n);
5765 if (!c->scc || !c->cluster ||
5766 !c->scc_cluster || !c->scc_node || !c->scc_in_merge)
5767 return isl_stat_error;
5769 for (i = 0; i < c->n; ++i) {
5770 if (extract_sub_graph(ctx, graph, &node_scc_exactly,
5771 &edge_scc_exactly, i, &c->scc[i]) < 0)
5772 return isl_stat_error;
5773 c->scc[i].scc = 1;
5774 if (compute_maxvar(&c->scc[i]) < 0)
5775 return isl_stat_error;
5776 if (compute_schedule_wcc_band(ctx, &c->scc[i]) < 0)
5777 return isl_stat_error;
5778 c->scc_cluster[i] = i;
5781 return isl_stat_ok;
5784 /* Free all memory allocated for "c".
5786 static void clustering_free(isl_ctx *ctx, struct isl_clustering *c)
5788 int i;
5790 if (c->scc)
5791 for (i = 0; i < c->n; ++i)
5792 graph_free(ctx, &c->scc[i]);
5793 free(c->scc);
5794 if (c->cluster)
5795 for (i = 0; i < c->n; ++i)
5796 graph_free(ctx, &c->cluster[i]);
5797 free(c->cluster);
5798 free(c->scc_cluster);
5799 free(c->scc_node);
5800 free(c->scc_in_merge);
5803 /* Should we refrain from merging the cluster in "graph" with
5804 * any other cluster?
5805 * In particular, is its current schedule band empty and incomplete.
5807 static int bad_cluster(struct isl_sched_graph *graph)
5809 return graph->n_row < graph->maxvar &&
5810 graph->n_total_row == graph->band_start;
5813 /* Is "edge" a proximity edge with a non-empty dependence relation?
5815 static isl_bool is_non_empty_proximity(struct isl_sched_edge *edge)
5817 if (!is_proximity(edge))
5818 return isl_bool_false;
5819 return isl_bool_not(isl_map_plain_is_empty(edge->map));
5822 /* Return the index of an edge in "graph" that can be used to merge
5823 * two clusters in "c".
5824 * Return graph->n_edge if no such edge can be found.
5825 * Return -1 on error.
5827 * In particular, return a proximity edge between two clusters
5828 * that is not marked "no_merge" and such that neither of the
5829 * two clusters has an incomplete, empty band.
5831 * If there are multiple such edges, then try and find the most
5832 * appropriate edge to use for merging. In particular, pick the edge
5833 * with the greatest weight. If there are multiple of those,
5834 * then pick one with the shortest distance between
5835 * the two cluster representatives.
5837 static int find_proximity(struct isl_sched_graph *graph,
5838 struct isl_clustering *c)
5840 int i, best = graph->n_edge, best_dist, best_weight;
5842 for (i = 0; i < graph->n_edge; ++i) {
5843 struct isl_sched_edge *edge = &graph->edge[i];
5844 int dist, weight;
5845 isl_bool prox;
5847 prox = is_non_empty_proximity(edge);
5848 if (prox < 0)
5849 return -1;
5850 if (!prox)
5851 continue;
5852 if (edge->no_merge)
5853 continue;
5854 if (bad_cluster(&c->scc[edge->src->scc]) ||
5855 bad_cluster(&c->scc[edge->dst->scc]))
5856 continue;
5857 dist = c->scc_cluster[edge->dst->scc] -
5858 c->scc_cluster[edge->src->scc];
5859 if (dist == 0)
5860 continue;
5861 weight = edge->weight;
5862 if (best < graph->n_edge) {
5863 if (best_weight > weight)
5864 continue;
5865 if (best_weight == weight && best_dist <= dist)
5866 continue;
5868 best = i;
5869 best_dist = dist;
5870 best_weight = weight;
5873 return best;
5876 /* Internal data structure used in mark_merge_sccs.
5878 * "graph" is the dependence graph in which a strongly connected
5879 * component is constructed.
5880 * "scc_cluster" maps each SCC index to the cluster to which it belongs.
5881 * "src" and "dst" are the indices of the nodes that are being merged.
5883 struct isl_mark_merge_sccs_data {
5884 struct isl_sched_graph *graph;
5885 int *scc_cluster;
5886 int src;
5887 int dst;
5890 /* Check whether the cluster containing node "i" depends on the cluster
5891 * containing node "j". If "i" and "j" belong to the same cluster,
5892 * then they are taken to depend on each other to ensure that
5893 * the resulting strongly connected component consists of complete
5894 * clusters. Furthermore, if "i" and "j" are the two nodes that
5895 * are being merged, then they are taken to depend on each other as well.
5896 * Otherwise, check if there is a (conditional) validity dependence
5897 * from node[j] to node[i], forcing node[i] to follow node[j].
5899 static isl_bool cluster_follows(int i, int j, void *user)
5901 struct isl_mark_merge_sccs_data *data = user;
5902 struct isl_sched_graph *graph = data->graph;
5903 int *scc_cluster = data->scc_cluster;
5905 if (data->src == i && data->dst == j)
5906 return isl_bool_true;
5907 if (data->src == j && data->dst == i)
5908 return isl_bool_true;
5909 if (scc_cluster[graph->node[i].scc] == scc_cluster[graph->node[j].scc])
5910 return isl_bool_true;
5912 return graph_has_validity_edge(graph, &graph->node[j], &graph->node[i]);
5915 /* Mark all SCCs that belong to either of the two clusters in "c"
5916 * connected by the edge in "graph" with index "edge", or to any
5917 * of the intermediate clusters.
5918 * The marking is recorded in c->scc_in_merge.
5920 * The given edge has been selected for merging two clusters,
5921 * meaning that there is at least a proximity edge between the two nodes.
5922 * However, there may also be (indirect) validity dependences
5923 * between the two nodes. When merging the two clusters, all clusters
5924 * containing one or more of the intermediate nodes along the
5925 * indirect validity dependences need to be merged in as well.
5927 * First collect all such nodes by computing the strongly connected
5928 * component (SCC) containing the two nodes connected by the edge, where
5929 * the two nodes are considered to depend on each other to make
5930 * sure they end up in the same SCC. Similarly, each node is considered
5931 * to depend on every other node in the same cluster to ensure
5932 * that the SCC consists of complete clusters.
5934 * Then the original SCCs that contain any of these nodes are marked
5935 * in c->scc_in_merge.
5937 static isl_stat mark_merge_sccs(isl_ctx *ctx, struct isl_sched_graph *graph,
5938 int edge, struct isl_clustering *c)
5940 struct isl_mark_merge_sccs_data data;
5941 struct isl_tarjan_graph *g;
5942 int i;
5944 for (i = 0; i < c->n; ++i)
5945 c->scc_in_merge[i] = 0;
5947 data.graph = graph;
5948 data.scc_cluster = c->scc_cluster;
5949 data.src = graph->edge[edge].src - graph->node;
5950 data.dst = graph->edge[edge].dst - graph->node;
5952 g = isl_tarjan_graph_component(ctx, graph->n, data.dst,
5953 &cluster_follows, &data);
5954 if (!g)
5955 goto error;
5957 i = g->op;
5958 if (i < 3)
5959 isl_die(ctx, isl_error_internal,
5960 "expecting at least two nodes in component",
5961 goto error);
5962 if (g->order[--i] != -1)
5963 isl_die(ctx, isl_error_internal,
5964 "expecting end of component marker", goto error);
5966 for (--i; i >= 0 && g->order[i] != -1; --i) {
5967 int scc = graph->node[g->order[i]].scc;
5968 c->scc_in_merge[scc] = 1;
5971 isl_tarjan_graph_free(g);
5972 return isl_stat_ok;
5973 error:
5974 isl_tarjan_graph_free(g);
5975 return isl_stat_error;
5978 /* Construct the identifier "cluster_i".
5980 static __isl_give isl_id *cluster_id(isl_ctx *ctx, int i)
5982 char name[40];
5984 snprintf(name, sizeof(name), "cluster_%d", i);
5985 return isl_id_alloc(ctx, name, NULL);
5988 /* Construct the space of the cluster with index "i" containing
5989 * the strongly connected component "scc".
5991 * In particular, construct a space called cluster_i with dimension equal
5992 * to the number of schedule rows in the current band of "scc".
5994 static __isl_give isl_space *cluster_space(struct isl_sched_graph *scc, int i)
5996 int nvar;
5997 isl_space *space;
5998 isl_id *id;
6000 nvar = scc->n_total_row - scc->band_start;
6001 space = isl_space_copy(scc->node[0].space);
6002 space = isl_space_params(space);
6003 space = isl_space_set_from_params(space);
6004 space = isl_space_add_dims(space, isl_dim_set, nvar);
6005 id = cluster_id(isl_space_get_ctx(space), i);
6006 space = isl_space_set_tuple_id(space, isl_dim_set, id);
6008 return space;
6011 /* Collect the domain of the graph for merging clusters.
6013 * In particular, for each cluster with first SCC "i", construct
6014 * a set in the space called cluster_i with dimension equal
6015 * to the number of schedule rows in the current band of the cluster.
6017 static __isl_give isl_union_set *collect_domain(isl_ctx *ctx,
6018 struct isl_sched_graph *graph, struct isl_clustering *c)
6020 int i;
6021 isl_space *space;
6022 isl_union_set *domain;
6024 space = isl_space_params_alloc(ctx, 0);
6025 domain = isl_union_set_empty(space);
6027 for (i = 0; i < graph->scc; ++i) {
6028 isl_space *space;
6030 if (!c->scc_in_merge[i])
6031 continue;
6032 if (c->scc_cluster[i] != i)
6033 continue;
6034 space = cluster_space(&c->scc[i], i);
6035 domain = isl_union_set_add_set(domain, isl_set_universe(space));
6038 return domain;
6041 /* Construct a map from the original instances to the corresponding
6042 * cluster instance in the current bands of the clusters in "c".
6044 static __isl_give isl_union_map *collect_cluster_map(isl_ctx *ctx,
6045 struct isl_sched_graph *graph, struct isl_clustering *c)
6047 int i, j;
6048 isl_space *space;
6049 isl_union_map *cluster_map;
6051 space = isl_space_params_alloc(ctx, 0);
6052 cluster_map = isl_union_map_empty(space);
6053 for (i = 0; i < graph->scc; ++i) {
6054 int start, n;
6055 isl_id *id;
6057 if (!c->scc_in_merge[i])
6058 continue;
6060 id = cluster_id(ctx, c->scc_cluster[i]);
6061 start = c->scc[i].band_start;
6062 n = c->scc[i].n_total_row - start;
6063 for (j = 0; j < c->scc[i].n; ++j) {
6064 isl_multi_aff *ma;
6065 isl_map *map;
6066 struct isl_sched_node *node = &c->scc[i].node[j];
6068 ma = node_extract_partial_schedule_multi_aff(node,
6069 start, n);
6070 ma = isl_multi_aff_set_tuple_id(ma, isl_dim_out,
6071 isl_id_copy(id));
6072 map = isl_map_from_multi_aff(ma);
6073 cluster_map = isl_union_map_add_map(cluster_map, map);
6075 isl_id_free(id);
6078 return cluster_map;
6081 /* Add "umap" to the schedule constraints "sc" of all types of "edge"
6082 * that are not isl_edge_condition or isl_edge_conditional_validity.
6084 static __isl_give isl_schedule_constraints *add_non_conditional_constraints(
6085 struct isl_sched_edge *edge, __isl_keep isl_union_map *umap,
6086 __isl_take isl_schedule_constraints *sc)
6088 enum isl_edge_type t;
6090 if (!sc)
6091 return NULL;
6093 for (t = isl_edge_first; t <= isl_edge_last; ++t) {
6094 if (t == isl_edge_condition ||
6095 t == isl_edge_conditional_validity)
6096 continue;
6097 if (!is_type(edge, t))
6098 continue;
6099 sc = isl_schedule_constraints_add(sc, t,
6100 isl_union_map_copy(umap));
6103 return sc;
6106 /* Add schedule constraints of types isl_edge_condition and
6107 * isl_edge_conditional_validity to "sc" by applying "umap" to
6108 * the domains of the wrapped relations in domain and range
6109 * of the corresponding tagged constraints of "edge".
6111 static __isl_give isl_schedule_constraints *add_conditional_constraints(
6112 struct isl_sched_edge *edge, __isl_keep isl_union_map *umap,
6113 __isl_take isl_schedule_constraints *sc)
6115 enum isl_edge_type t;
6116 isl_union_map *tagged;
6118 for (t = isl_edge_condition; t <= isl_edge_conditional_validity; ++t) {
6119 if (!is_type(edge, t))
6120 continue;
6121 if (t == isl_edge_condition)
6122 tagged = isl_union_map_copy(edge->tagged_condition);
6123 else
6124 tagged = isl_union_map_copy(edge->tagged_validity);
6125 tagged = isl_union_map_zip(tagged);
6126 tagged = isl_union_map_apply_domain(tagged,
6127 isl_union_map_copy(umap));
6128 tagged = isl_union_map_zip(tagged);
6129 sc = isl_schedule_constraints_add(sc, t, tagged);
6130 if (!sc)
6131 return NULL;
6134 return sc;
6137 /* Given a mapping "cluster_map" from the original instances to
6138 * the cluster instances, add schedule constraints on the clusters
6139 * to "sc" corresponding to the original constraints represented by "edge".
6141 * For non-tagged dependence constraints, the cluster constraints
6142 * are obtained by applying "cluster_map" to the edge->map.
6144 * For tagged dependence constraints, "cluster_map" needs to be applied
6145 * to the domains of the wrapped relations in domain and range
6146 * of the tagged dependence constraints. Pick out the mappings
6147 * from these domains from "cluster_map" and construct their product.
6148 * This mapping can then be applied to the pair of domains.
6150 static __isl_give isl_schedule_constraints *collect_edge_constraints(
6151 struct isl_sched_edge *edge, __isl_keep isl_union_map *cluster_map,
6152 __isl_take isl_schedule_constraints *sc)
6154 isl_union_map *umap;
6155 isl_space *space;
6156 isl_union_set *uset;
6157 isl_union_map *umap1, *umap2;
6159 if (!sc)
6160 return NULL;
6162 umap = isl_union_map_from_map(isl_map_copy(edge->map));
6163 umap = isl_union_map_apply_domain(umap,
6164 isl_union_map_copy(cluster_map));
6165 umap = isl_union_map_apply_range(umap,
6166 isl_union_map_copy(cluster_map));
6167 sc = add_non_conditional_constraints(edge, umap, sc);
6168 isl_union_map_free(umap);
6170 if (!sc || (!is_condition(edge) && !is_conditional_validity(edge)))
6171 return sc;
6173 space = isl_space_domain(isl_map_get_space(edge->map));
6174 uset = isl_union_set_from_set(isl_set_universe(space));
6175 umap1 = isl_union_map_copy(cluster_map);
6176 umap1 = isl_union_map_intersect_domain(umap1, uset);
6177 space = isl_space_range(isl_map_get_space(edge->map));
6178 uset = isl_union_set_from_set(isl_set_universe(space));
6179 umap2 = isl_union_map_copy(cluster_map);
6180 umap2 = isl_union_map_intersect_domain(umap2, uset);
6181 umap = isl_union_map_product(umap1, umap2);
6183 sc = add_conditional_constraints(edge, umap, sc);
6185 isl_union_map_free(umap);
6186 return sc;
6189 /* Given a mapping "cluster_map" from the original instances to
6190 * the cluster instances, add schedule constraints on the clusters
6191 * to "sc" corresponding to all edges in "graph" between nodes that
6192 * belong to SCCs that are marked for merging in "scc_in_merge".
6194 static __isl_give isl_schedule_constraints *collect_constraints(
6195 struct isl_sched_graph *graph, int *scc_in_merge,
6196 __isl_keep isl_union_map *cluster_map,
6197 __isl_take isl_schedule_constraints *sc)
6199 int i;
6201 for (i = 0; i < graph->n_edge; ++i) {
6202 struct isl_sched_edge *edge = &graph->edge[i];
6204 if (!scc_in_merge[edge->src->scc])
6205 continue;
6206 if (!scc_in_merge[edge->dst->scc])
6207 continue;
6208 sc = collect_edge_constraints(edge, cluster_map, sc);
6211 return sc;
6214 /* Construct a dependence graph for scheduling clusters with respect
6215 * to each other and store the result in "merge_graph".
6216 * In particular, the nodes of the graph correspond to the schedule
6217 * dimensions of the current bands of those clusters that have been
6218 * marked for merging in "c".
6220 * First construct an isl_schedule_constraints object for this domain
6221 * by transforming the edges in "graph" to the domain.
6222 * Then initialize a dependence graph for scheduling from these
6223 * constraints.
6225 static isl_stat init_merge_graph(isl_ctx *ctx, struct isl_sched_graph *graph,
6226 struct isl_clustering *c, struct isl_sched_graph *merge_graph)
6228 isl_union_set *domain;
6229 isl_union_map *cluster_map;
6230 isl_schedule_constraints *sc;
6231 isl_stat r;
6233 domain = collect_domain(ctx, graph, c);
6234 sc = isl_schedule_constraints_on_domain(domain);
6235 if (!sc)
6236 return isl_stat_error;
6237 cluster_map = collect_cluster_map(ctx, graph, c);
6238 sc = collect_constraints(graph, c->scc_in_merge, cluster_map, sc);
6239 isl_union_map_free(cluster_map);
6241 r = graph_init(merge_graph, sc);
6243 isl_schedule_constraints_free(sc);
6245 return r;
6248 /* Compute the maximal number of remaining schedule rows that still need
6249 * to be computed for the nodes that belong to clusters with the maximal
6250 * dimension for the current band (i.e., the band that is to be merged).
6251 * Only clusters that are about to be merged are considered.
6252 * "maxvar" is the maximal dimension for the current band.
6253 * "c" contains information about the clusters.
6255 * Return the maximal number of remaining schedule rows or -1 on error.
6257 static int compute_maxvar_max_slack(int maxvar, struct isl_clustering *c)
6259 int i, j;
6260 int max_slack;
6262 max_slack = 0;
6263 for (i = 0; i < c->n; ++i) {
6264 int nvar;
6265 struct isl_sched_graph *scc;
6267 if (!c->scc_in_merge[i])
6268 continue;
6269 scc = &c->scc[i];
6270 nvar = scc->n_total_row - scc->band_start;
6271 if (nvar != maxvar)
6272 continue;
6273 for (j = 0; j < scc->n; ++j) {
6274 struct isl_sched_node *node = &scc->node[j];
6275 int slack;
6277 if (node_update_vmap(node) < 0)
6278 return -1;
6279 slack = node->nvar - node->rank;
6280 if (slack > max_slack)
6281 max_slack = slack;
6285 return max_slack;
6288 /* If there are any clusters where the dimension of the current band
6289 * (i.e., the band that is to be merged) is smaller than "maxvar" and
6290 * if there are any nodes in such a cluster where the number
6291 * of remaining schedule rows that still need to be computed
6292 * is greater than "max_slack", then return the smallest current band
6293 * dimension of all these clusters. Otherwise return the original value
6294 * of "maxvar". Return -1 in case of any error.
6295 * Only clusters that are about to be merged are considered.
6296 * "c" contains information about the clusters.
6298 static int limit_maxvar_to_slack(int maxvar, int max_slack,
6299 struct isl_clustering *c)
6301 int i, j;
6303 for (i = 0; i < c->n; ++i) {
6304 int nvar;
6305 struct isl_sched_graph *scc;
6307 if (!c->scc_in_merge[i])
6308 continue;
6309 scc = &c->scc[i];
6310 nvar = scc->n_total_row - scc->band_start;
6311 if (nvar >= maxvar)
6312 continue;
6313 for (j = 0; j < scc->n; ++j) {
6314 struct isl_sched_node *node = &scc->node[j];
6315 int slack;
6317 if (node_update_vmap(node) < 0)
6318 return -1;
6319 slack = node->nvar - node->rank;
6320 if (slack > max_slack) {
6321 maxvar = nvar;
6322 break;
6327 return maxvar;
6330 /* Adjust merge_graph->maxvar based on the number of remaining schedule rows
6331 * that still need to be computed. In particular, if there is a node
6332 * in a cluster where the dimension of the current band is smaller
6333 * than merge_graph->maxvar, but the number of remaining schedule rows
6334 * is greater than that of any node in a cluster with the maximal
6335 * dimension for the current band (i.e., merge_graph->maxvar),
6336 * then adjust merge_graph->maxvar to the (smallest) current band dimension
6337 * of those clusters. Without this adjustment, the total number of
6338 * schedule dimensions would be increased, resulting in a skewed view
6339 * of the number of coincident dimensions.
6340 * "c" contains information about the clusters.
6342 * If the maximize_band_depth option is set and merge_graph->maxvar is reduced,
6343 * then there is no point in attempting any merge since it will be rejected
6344 * anyway. Set merge_graph->maxvar to zero in such cases.
6346 static isl_stat adjust_maxvar_to_slack(isl_ctx *ctx,
6347 struct isl_sched_graph *merge_graph, struct isl_clustering *c)
6349 int max_slack, maxvar;
6351 max_slack = compute_maxvar_max_slack(merge_graph->maxvar, c);
6352 if (max_slack < 0)
6353 return isl_stat_error;
6354 maxvar = limit_maxvar_to_slack(merge_graph->maxvar, max_slack, c);
6355 if (maxvar < 0)
6356 return isl_stat_error;
6358 if (maxvar < merge_graph->maxvar) {
6359 if (isl_options_get_schedule_maximize_band_depth(ctx))
6360 merge_graph->maxvar = 0;
6361 else
6362 merge_graph->maxvar = maxvar;
6365 return isl_stat_ok;
6368 /* Return the number of coincident dimensions in the current band of "graph",
6369 * where the nodes of "graph" are assumed to be scheduled by a single band.
6371 static int get_n_coincident(struct isl_sched_graph *graph)
6373 int i;
6375 for (i = graph->band_start; i < graph->n_total_row; ++i)
6376 if (!graph->node[0].coincident[i])
6377 break;
6379 return i - graph->band_start;
6382 /* Should the clusters be merged based on the cluster schedule
6383 * in the current (and only) band of "merge_graph", given that
6384 * coincidence should be maximized?
6386 * If the number of coincident schedule dimensions in the merged band
6387 * would be less than the maximal number of coincident schedule dimensions
6388 * in any of the merged clusters, then the clusters should not be merged.
6390 static isl_bool ok_to_merge_coincident(struct isl_clustering *c,
6391 struct isl_sched_graph *merge_graph)
6393 int i;
6394 int n_coincident;
6395 int max_coincident;
6397 max_coincident = 0;
6398 for (i = 0; i < c->n; ++i) {
6399 if (!c->scc_in_merge[i])
6400 continue;
6401 n_coincident = get_n_coincident(&c->scc[i]);
6402 if (n_coincident > max_coincident)
6403 max_coincident = n_coincident;
6406 n_coincident = get_n_coincident(merge_graph);
6408 return n_coincident >= max_coincident;
6411 /* Return the transformation on "node" expressed by the current (and only)
6412 * band of "merge_graph" applied to the clusters in "c".
6414 * First find the representation of "node" in its SCC in "c" and
6415 * extract the transformation expressed by the current band.
6416 * Then extract the transformation applied by "merge_graph"
6417 * to the cluster to which this SCC belongs.
6418 * Combine the two to obtain the complete transformation on the node.
6420 * Note that the range of the first transformation is an anonymous space,
6421 * while the domain of the second is named "cluster_X". The range
6422 * of the former therefore needs to be adjusted before the two
6423 * can be combined.
6425 static __isl_give isl_map *extract_node_transformation(isl_ctx *ctx,
6426 struct isl_sched_node *node, struct isl_clustering *c,
6427 struct isl_sched_graph *merge_graph)
6429 struct isl_sched_node *scc_node, *cluster_node;
6430 int start, n;
6431 isl_id *id;
6432 isl_space *space;
6433 isl_multi_aff *ma, *ma2;
6435 scc_node = graph_find_node(ctx, &c->scc[node->scc], node->space);
6436 if (scc_node && !is_node(&c->scc[node->scc], scc_node))
6437 isl_die(ctx, isl_error_internal, "unable to find node",
6438 return NULL);
6439 start = c->scc[node->scc].band_start;
6440 n = c->scc[node->scc].n_total_row - start;
6441 ma = node_extract_partial_schedule_multi_aff(scc_node, start, n);
6442 space = cluster_space(&c->scc[node->scc], c->scc_cluster[node->scc]);
6443 cluster_node = graph_find_node(ctx, merge_graph, space);
6444 if (cluster_node && !is_node(merge_graph, cluster_node))
6445 isl_die(ctx, isl_error_internal, "unable to find cluster",
6446 space = isl_space_free(space));
6447 id = isl_space_get_tuple_id(space, isl_dim_set);
6448 ma = isl_multi_aff_set_tuple_id(ma, isl_dim_out, id);
6449 isl_space_free(space);
6450 n = merge_graph->n_total_row;
6451 ma2 = node_extract_partial_schedule_multi_aff(cluster_node, 0, n);
6452 ma = isl_multi_aff_pullback_multi_aff(ma2, ma);
6454 return isl_map_from_multi_aff(ma);
6457 /* Give a set of distances "set", are they bounded by a small constant
6458 * in direction "pos"?
6459 * In practice, check if they are bounded by 2 by checking that there
6460 * are no elements with a value greater than or equal to 3 or
6461 * smaller than or equal to -3.
6463 static isl_bool distance_is_bounded(__isl_keep isl_set *set, int pos)
6465 isl_bool bounded;
6466 isl_set *test;
6468 if (!set)
6469 return isl_bool_error;
6471 test = isl_set_copy(set);
6472 test = isl_set_lower_bound_si(test, isl_dim_set, pos, 3);
6473 bounded = isl_set_is_empty(test);
6474 isl_set_free(test);
6476 if (bounded < 0 || !bounded)
6477 return bounded;
6479 test = isl_set_copy(set);
6480 test = isl_set_upper_bound_si(test, isl_dim_set, pos, -3);
6481 bounded = isl_set_is_empty(test);
6482 isl_set_free(test);
6484 return bounded;
6487 /* Does the set "set" have a fixed (but possible parametric) value
6488 * at dimension "pos"?
6490 static isl_bool has_single_value(__isl_keep isl_set *set, int pos)
6492 int n;
6493 isl_bool single;
6495 if (!set)
6496 return isl_bool_error;
6497 set = isl_set_copy(set);
6498 n = isl_set_dim(set, isl_dim_set);
6499 set = isl_set_project_out(set, isl_dim_set, pos + 1, n - (pos + 1));
6500 set = isl_set_project_out(set, isl_dim_set, 0, pos);
6501 single = isl_set_is_singleton(set);
6502 isl_set_free(set);
6504 return single;
6507 /* Does "map" have a fixed (but possible parametric) value
6508 * at dimension "pos" of either its domain or its range?
6510 static isl_bool has_singular_src_or_dst(__isl_keep isl_map *map, int pos)
6512 isl_set *set;
6513 isl_bool single;
6515 set = isl_map_domain(isl_map_copy(map));
6516 single = has_single_value(set, pos);
6517 isl_set_free(set);
6519 if (single < 0 || single)
6520 return single;
6522 set = isl_map_range(isl_map_copy(map));
6523 single = has_single_value(set, pos);
6524 isl_set_free(set);
6526 return single;
6529 /* Does the edge "edge" from "graph" have bounded dependence distances
6530 * in the merged graph "merge_graph" of a selection of clusters in "c"?
6532 * Extract the complete transformations of the source and destination
6533 * nodes of the edge, apply them to the edge constraints and
6534 * compute the differences. Finally, check if these differences are bounded
6535 * in each direction.
6537 * If the dimension of the band is greater than the number of
6538 * dimensions that can be expected to be optimized by the edge
6539 * (based on its weight), then also allow the differences to be unbounded
6540 * in the remaining dimensions, but only if either the source or
6541 * the destination has a fixed value in that direction.
6542 * This allows a statement that produces values that are used by
6543 * several instances of another statement to be merged with that
6544 * other statement.
6545 * However, merging such clusters will introduce an inherently
6546 * large proximity distance inside the merged cluster, meaning
6547 * that proximity distances will no longer be optimized in
6548 * subsequent merges. These merges are therefore only allowed
6549 * after all other possible merges have been tried.
6550 * The first time such a merge is encountered, the weight of the edge
6551 * is replaced by a negative weight. The second time (i.e., after
6552 * all merges over edges with a non-negative weight have been tried),
6553 * the merge is allowed.
6555 static isl_bool has_bounded_distances(isl_ctx *ctx, struct isl_sched_edge *edge,
6556 struct isl_sched_graph *graph, struct isl_clustering *c,
6557 struct isl_sched_graph *merge_graph)
6559 int i, n, n_slack;
6560 isl_bool bounded;
6561 isl_map *map, *t;
6562 isl_set *dist;
6564 map = isl_map_copy(edge->map);
6565 t = extract_node_transformation(ctx, edge->src, c, merge_graph);
6566 map = isl_map_apply_domain(map, t);
6567 t = extract_node_transformation(ctx, edge->dst, c, merge_graph);
6568 map = isl_map_apply_range(map, t);
6569 dist = isl_map_deltas(isl_map_copy(map));
6571 bounded = isl_bool_true;
6572 n = isl_set_dim(dist, isl_dim_set);
6573 n_slack = n - edge->weight;
6574 if (edge->weight < 0)
6575 n_slack -= graph->max_weight + 1;
6576 for (i = 0; i < n; ++i) {
6577 isl_bool bounded_i, singular_i;
6579 bounded_i = distance_is_bounded(dist, i);
6580 if (bounded_i < 0)
6581 goto error;
6582 if (bounded_i)
6583 continue;
6584 if (edge->weight >= 0)
6585 bounded = isl_bool_false;
6586 n_slack--;
6587 if (n_slack < 0)
6588 break;
6589 singular_i = has_singular_src_or_dst(map, i);
6590 if (singular_i < 0)
6591 goto error;
6592 if (singular_i)
6593 continue;
6594 bounded = isl_bool_false;
6595 break;
6597 if (!bounded && i >= n && edge->weight >= 0)
6598 edge->weight -= graph->max_weight + 1;
6599 isl_map_free(map);
6600 isl_set_free(dist);
6602 return bounded;
6603 error:
6604 isl_map_free(map);
6605 isl_set_free(dist);
6606 return isl_bool_error;
6609 /* Should the clusters be merged based on the cluster schedule
6610 * in the current (and only) band of "merge_graph"?
6611 * "graph" is the original dependence graph, while "c" records
6612 * which SCCs are involved in the latest merge.
6614 * In particular, is there at least one proximity constraint
6615 * that is optimized by the merge?
6617 * A proximity constraint is considered to be optimized
6618 * if the dependence distances are small.
6620 static isl_bool ok_to_merge_proximity(isl_ctx *ctx,
6621 struct isl_sched_graph *graph, struct isl_clustering *c,
6622 struct isl_sched_graph *merge_graph)
6624 int i;
6626 for (i = 0; i < graph->n_edge; ++i) {
6627 struct isl_sched_edge *edge = &graph->edge[i];
6628 isl_bool bounded;
6630 if (!is_proximity(edge))
6631 continue;
6632 if (!c->scc_in_merge[edge->src->scc])
6633 continue;
6634 if (!c->scc_in_merge[edge->dst->scc])
6635 continue;
6636 if (c->scc_cluster[edge->dst->scc] ==
6637 c->scc_cluster[edge->src->scc])
6638 continue;
6639 bounded = has_bounded_distances(ctx, edge, graph, c,
6640 merge_graph);
6641 if (bounded < 0 || bounded)
6642 return bounded;
6645 return isl_bool_false;
6648 /* Should the clusters be merged based on the cluster schedule
6649 * in the current (and only) band of "merge_graph"?
6650 * "graph" is the original dependence graph, while "c" records
6651 * which SCCs are involved in the latest merge.
6653 * If the current band is empty, then the clusters should not be merged.
6655 * If the band depth should be maximized and the merge schedule
6656 * is incomplete (meaning that the dimension of some of the schedule
6657 * bands in the original schedule will be reduced), then the clusters
6658 * should not be merged.
6660 * If the schedule_maximize_coincidence option is set, then check that
6661 * the number of coincident schedule dimensions is not reduced.
6663 * Finally, only allow the merge if at least one proximity
6664 * constraint is optimized.
6666 static isl_bool ok_to_merge(isl_ctx *ctx, struct isl_sched_graph *graph,
6667 struct isl_clustering *c, struct isl_sched_graph *merge_graph)
6669 if (merge_graph->n_total_row == merge_graph->band_start)
6670 return isl_bool_false;
6672 if (isl_options_get_schedule_maximize_band_depth(ctx) &&
6673 merge_graph->n_total_row < merge_graph->maxvar)
6674 return isl_bool_false;
6676 if (isl_options_get_schedule_maximize_coincidence(ctx)) {
6677 isl_bool ok;
6679 ok = ok_to_merge_coincident(c, merge_graph);
6680 if (ok < 0 || !ok)
6681 return ok;
6684 return ok_to_merge_proximity(ctx, graph, c, merge_graph);
6687 /* Apply the schedule in "t_node" to the "n" rows starting at "first"
6688 * of the schedule in "node" and return the result.
6690 * That is, essentially compute
6692 * T * N(first:first+n-1)
6694 * taking into account the constant term and the parameter coefficients
6695 * in "t_node".
6697 static __isl_give isl_mat *node_transformation(isl_ctx *ctx,
6698 struct isl_sched_node *t_node, struct isl_sched_node *node,
6699 int first, int n)
6701 int i, j;
6702 isl_mat *t;
6703 int n_row, n_col, n_param, n_var;
6705 n_param = node->nparam;
6706 n_var = node->nvar;
6707 n_row = isl_mat_rows(t_node->sched);
6708 n_col = isl_mat_cols(node->sched);
6709 t = isl_mat_alloc(ctx, n_row, n_col);
6710 if (!t)
6711 return NULL;
6712 for (i = 0; i < n_row; ++i) {
6713 isl_seq_cpy(t->row[i], t_node->sched->row[i], 1 + n_param);
6714 isl_seq_clr(t->row[i] + 1 + n_param, n_var);
6715 for (j = 0; j < n; ++j)
6716 isl_seq_addmul(t->row[i],
6717 t_node->sched->row[i][1 + n_param + j],
6718 node->sched->row[first + j],
6719 1 + n_param + n_var);
6721 return t;
6724 /* Apply the cluster schedule in "t_node" to the current band
6725 * schedule of the nodes in "graph".
6727 * In particular, replace the rows starting at band_start
6728 * by the result of applying the cluster schedule in "t_node"
6729 * to the original rows.
6731 * The coincidence of the schedule is determined by the coincidence
6732 * of the cluster schedule.
6734 static isl_stat transform(isl_ctx *ctx, struct isl_sched_graph *graph,
6735 struct isl_sched_node *t_node)
6737 int i, j;
6738 int n_new;
6739 int start, n;
6741 start = graph->band_start;
6742 n = graph->n_total_row - start;
6744 n_new = isl_mat_rows(t_node->sched);
6745 for (i = 0; i < graph->n; ++i) {
6746 struct isl_sched_node *node = &graph->node[i];
6747 isl_mat *t;
6749 t = node_transformation(ctx, t_node, node, start, n);
6750 node->sched = isl_mat_drop_rows(node->sched, start, n);
6751 node->sched = isl_mat_concat(node->sched, t);
6752 node->sched_map = isl_map_free(node->sched_map);
6753 if (!node->sched)
6754 return isl_stat_error;
6755 for (j = 0; j < n_new; ++j)
6756 node->coincident[start + j] = t_node->coincident[j];
6758 graph->n_total_row -= n;
6759 graph->n_row -= n;
6760 graph->n_total_row += n_new;
6761 graph->n_row += n_new;
6763 return isl_stat_ok;
6766 /* Merge the clusters marked for merging in "c" into a single
6767 * cluster using the cluster schedule in the current band of "merge_graph".
6768 * The representative SCC for the new cluster is the SCC with
6769 * the smallest index.
6771 * The current band schedule of each SCC in the new cluster is obtained
6772 * by applying the schedule of the corresponding original cluster
6773 * to the original band schedule.
6774 * All SCCs in the new cluster have the same number of schedule rows.
6776 static isl_stat merge(isl_ctx *ctx, struct isl_clustering *c,
6777 struct isl_sched_graph *merge_graph)
6779 int i;
6780 int cluster = -1;
6781 isl_space *space;
6783 for (i = 0; i < c->n; ++i) {
6784 struct isl_sched_node *node;
6786 if (!c->scc_in_merge[i])
6787 continue;
6788 if (cluster < 0)
6789 cluster = i;
6790 space = cluster_space(&c->scc[i], c->scc_cluster[i]);
6791 node = graph_find_node(ctx, merge_graph, space);
6792 isl_space_free(space);
6793 if (!node)
6794 return isl_stat_error;
6795 if (!is_node(merge_graph, node))
6796 isl_die(ctx, isl_error_internal,
6797 "unable to find cluster",
6798 return isl_stat_error);
6799 if (transform(ctx, &c->scc[i], node) < 0)
6800 return isl_stat_error;
6801 c->scc_cluster[i] = cluster;
6804 return isl_stat_ok;
6807 /* Try and merge the clusters of SCCs marked in c->scc_in_merge
6808 * by scheduling the current cluster bands with respect to each other.
6810 * Construct a dependence graph with a space for each cluster and
6811 * with the coordinates of each space corresponding to the schedule
6812 * dimensions of the current band of that cluster.
6813 * Construct a cluster schedule in this cluster dependence graph and
6814 * apply it to the current cluster bands if it is applicable
6815 * according to ok_to_merge.
6817 * If the number of remaining schedule dimensions in a cluster
6818 * with a non-maximal current schedule dimension is greater than
6819 * the number of remaining schedule dimensions in clusters
6820 * with a maximal current schedule dimension, then restrict
6821 * the number of rows to be computed in the cluster schedule
6822 * to the minimal such non-maximal current schedule dimension.
6823 * Do this by adjusting merge_graph.maxvar.
6825 * Return isl_bool_true if the clusters have effectively been merged
6826 * into a single cluster.
6828 * Note that since the standard scheduling algorithm minimizes the maximal
6829 * distance over proximity constraints, the proximity constraints between
6830 * the merged clusters may not be optimized any further than what is
6831 * sufficient to bring the distances within the limits of the internal
6832 * proximity constraints inside the individual clusters.
6833 * It may therefore make sense to perform an additional translation step
6834 * to bring the clusters closer to each other, while maintaining
6835 * the linear part of the merging schedule found using the standard
6836 * scheduling algorithm.
6838 static isl_bool try_merge(isl_ctx *ctx, struct isl_sched_graph *graph,
6839 struct isl_clustering *c)
6841 struct isl_sched_graph merge_graph = { 0 };
6842 isl_bool merged;
6844 if (init_merge_graph(ctx, graph, c, &merge_graph) < 0)
6845 goto error;
6847 if (compute_maxvar(&merge_graph) < 0)
6848 goto error;
6849 if (adjust_maxvar_to_slack(ctx, &merge_graph,c) < 0)
6850 goto error;
6851 if (compute_schedule_wcc_band(ctx, &merge_graph) < 0)
6852 goto error;
6853 merged = ok_to_merge(ctx, graph, c, &merge_graph);
6854 if (merged && merge(ctx, c, &merge_graph) < 0)
6855 goto error;
6857 graph_free(ctx, &merge_graph);
6858 return merged;
6859 error:
6860 graph_free(ctx, &merge_graph);
6861 return isl_bool_error;
6864 /* Is there any edge marked "no_merge" between two SCCs that are
6865 * about to be merged (i.e., that are set in "scc_in_merge")?
6866 * "merge_edge" is the proximity edge along which the clusters of SCCs
6867 * are going to be merged.
6869 * If there is any edge between two SCCs with a negative weight,
6870 * while the weight of "merge_edge" is non-negative, then this
6871 * means that the edge was postponed. "merge_edge" should then
6872 * also be postponed since merging along the edge with negative weight should
6873 * be postponed until all edges with non-negative weight have been tried.
6874 * Replace the weight of "merge_edge" by a negative weight as well and
6875 * tell the caller not to attempt a merge.
6877 static int any_no_merge(struct isl_sched_graph *graph, int *scc_in_merge,
6878 struct isl_sched_edge *merge_edge)
6880 int i;
6882 for (i = 0; i < graph->n_edge; ++i) {
6883 struct isl_sched_edge *edge = &graph->edge[i];
6885 if (!scc_in_merge[edge->src->scc])
6886 continue;
6887 if (!scc_in_merge[edge->dst->scc])
6888 continue;
6889 if (edge->no_merge)
6890 return 1;
6891 if (merge_edge->weight >= 0 && edge->weight < 0) {
6892 merge_edge->weight -= graph->max_weight + 1;
6893 return 1;
6897 return 0;
6900 /* Merge the two clusters in "c" connected by the edge in "graph"
6901 * with index "edge" into a single cluster.
6902 * If it turns out to be impossible to merge these two clusters,
6903 * then mark the edge as "no_merge" such that it will not be
6904 * considered again.
6906 * First mark all SCCs that need to be merged. This includes the SCCs
6907 * in the two clusters, but it may also include the SCCs
6908 * of intermediate clusters.
6909 * If there is already a no_merge edge between any pair of such SCCs,
6910 * then simply mark the current edge as no_merge as well.
6911 * Likewise, if any of those edges was postponed by has_bounded_distances,
6912 * then postpone the current edge as well.
6913 * Otherwise, try and merge the clusters and mark "edge" as "no_merge"
6914 * if the clusters did not end up getting merged, unless the non-merge
6915 * is due to the fact that the edge was postponed. This postponement
6916 * can be recognized by a change in weight (from non-negative to negative).
6918 static isl_stat merge_clusters_along_edge(isl_ctx *ctx,
6919 struct isl_sched_graph *graph, int edge, struct isl_clustering *c)
6921 isl_bool merged;
6922 int edge_weight = graph->edge[edge].weight;
6924 if (mark_merge_sccs(ctx, graph, edge, c) < 0)
6925 return isl_stat_error;
6927 if (any_no_merge(graph, c->scc_in_merge, &graph->edge[edge]))
6928 merged = isl_bool_false;
6929 else
6930 merged = try_merge(ctx, graph, c);
6931 if (merged < 0)
6932 return isl_stat_error;
6933 if (!merged && edge_weight == graph->edge[edge].weight)
6934 graph->edge[edge].no_merge = 1;
6936 return isl_stat_ok;
6939 /* Does "node" belong to the cluster identified by "cluster"?
6941 static int node_cluster_exactly(struct isl_sched_node *node, int cluster)
6943 return node->cluster == cluster;
6946 /* Does "edge" connect two nodes belonging to the cluster
6947 * identified by "cluster"?
6949 static int edge_cluster_exactly(struct isl_sched_edge *edge, int cluster)
6951 return edge->src->cluster == cluster && edge->dst->cluster == cluster;
6954 /* Swap the schedule of "node1" and "node2".
6955 * Both nodes have been derived from the same node in a common parent graph.
6956 * Since the "coincident" field is shared with that node
6957 * in the parent graph, there is no need to also swap this field.
6959 static void swap_sched(struct isl_sched_node *node1,
6960 struct isl_sched_node *node2)
6962 isl_mat *sched;
6963 isl_map *sched_map;
6965 sched = node1->sched;
6966 node1->sched = node2->sched;
6967 node2->sched = sched;
6969 sched_map = node1->sched_map;
6970 node1->sched_map = node2->sched_map;
6971 node2->sched_map = sched_map;
6974 /* Copy the current band schedule from the SCCs that form the cluster
6975 * with index "pos" to the actual cluster at position "pos".
6976 * By construction, the index of the first SCC that belongs to the cluster
6977 * is also "pos".
6979 * The order of the nodes inside both the SCCs and the cluster
6980 * is assumed to be same as the order in the original "graph".
6982 * Since the SCC graphs will no longer be used after this function,
6983 * the schedules are actually swapped rather than copied.
6985 static isl_stat copy_partial(struct isl_sched_graph *graph,
6986 struct isl_clustering *c, int pos)
6988 int i, j;
6990 c->cluster[pos].n_total_row = c->scc[pos].n_total_row;
6991 c->cluster[pos].n_row = c->scc[pos].n_row;
6992 c->cluster[pos].maxvar = c->scc[pos].maxvar;
6993 j = 0;
6994 for (i = 0; i < graph->n; ++i) {
6995 int k;
6996 int s;
6998 if (graph->node[i].cluster != pos)
6999 continue;
7000 s = graph->node[i].scc;
7001 k = c->scc_node[s]++;
7002 swap_sched(&c->cluster[pos].node[j], &c->scc[s].node[k]);
7003 if (c->scc[s].maxvar > c->cluster[pos].maxvar)
7004 c->cluster[pos].maxvar = c->scc[s].maxvar;
7005 ++j;
7008 return isl_stat_ok;
7011 /* Is there a (conditional) validity dependence from node[j] to node[i],
7012 * forcing node[i] to follow node[j] or do the nodes belong to the same
7013 * cluster?
7015 static isl_bool node_follows_strong_or_same_cluster(int i, int j, void *user)
7017 struct isl_sched_graph *graph = user;
7019 if (graph->node[i].cluster == graph->node[j].cluster)
7020 return isl_bool_true;
7021 return graph_has_validity_edge(graph, &graph->node[j], &graph->node[i]);
7024 /* Extract the merged clusters of SCCs in "graph", sort them, and
7025 * store them in c->clusters. Update c->scc_cluster accordingly.
7027 * First keep track of the cluster containing the SCC to which a node
7028 * belongs in the node itself.
7029 * Then extract the clusters into c->clusters, copying the current
7030 * band schedule from the SCCs that belong to the cluster.
7031 * Do this only once per cluster.
7033 * Finally, topologically sort the clusters and update c->scc_cluster
7034 * to match the new scc numbering. While the SCCs were originally
7035 * sorted already, some SCCs that depend on some other SCCs may
7036 * have been merged with SCCs that appear before these other SCCs.
7037 * A reordering may therefore be required.
7039 static isl_stat extract_clusters(isl_ctx *ctx, struct isl_sched_graph *graph,
7040 struct isl_clustering *c)
7042 int i;
7044 for (i = 0; i < graph->n; ++i)
7045 graph->node[i].cluster = c->scc_cluster[graph->node[i].scc];
7047 for (i = 0; i < graph->scc; ++i) {
7048 if (c->scc_cluster[i] != i)
7049 continue;
7050 if (extract_sub_graph(ctx, graph, &node_cluster_exactly,
7051 &edge_cluster_exactly, i, &c->cluster[i]) < 0)
7052 return isl_stat_error;
7053 c->cluster[i].src_scc = -1;
7054 c->cluster[i].dst_scc = -1;
7055 if (copy_partial(graph, c, i) < 0)
7056 return isl_stat_error;
7059 if (detect_ccs(ctx, graph, &node_follows_strong_or_same_cluster) < 0)
7060 return isl_stat_error;
7061 for (i = 0; i < graph->n; ++i)
7062 c->scc_cluster[graph->node[i].scc] = graph->node[i].cluster;
7064 return isl_stat_ok;
7067 /* Compute weights on the proximity edges of "graph" that can
7068 * be used by find_proximity to find the most appropriate
7069 * proximity edge to use to merge two clusters in "c".
7070 * The weights are also used by has_bounded_distances to determine
7071 * whether the merge should be allowed.
7072 * Store the maximum of the computed weights in graph->max_weight.
7074 * The computed weight is a measure for the number of remaining schedule
7075 * dimensions that can still be completely aligned.
7076 * In particular, compute the number of equalities between
7077 * input dimensions and output dimensions in the proximity constraints.
7078 * The directions that are already handled by outer schedule bands
7079 * are projected out prior to determining this number.
7081 * Edges that will never be considered by find_proximity are ignored.
7083 static isl_stat compute_weights(struct isl_sched_graph *graph,
7084 struct isl_clustering *c)
7086 int i;
7088 graph->max_weight = 0;
7090 for (i = 0; i < graph->n_edge; ++i) {
7091 struct isl_sched_edge *edge = &graph->edge[i];
7092 struct isl_sched_node *src = edge->src;
7093 struct isl_sched_node *dst = edge->dst;
7094 isl_basic_map *hull;
7095 isl_bool prox;
7096 int n_in, n_out;
7098 prox = is_non_empty_proximity(edge);
7099 if (prox < 0)
7100 return isl_stat_error;
7101 if (!prox)
7102 continue;
7103 if (bad_cluster(&c->scc[edge->src->scc]) ||
7104 bad_cluster(&c->scc[edge->dst->scc]))
7105 continue;
7106 if (c->scc_cluster[edge->dst->scc] ==
7107 c->scc_cluster[edge->src->scc])
7108 continue;
7110 hull = isl_map_affine_hull(isl_map_copy(edge->map));
7111 hull = isl_basic_map_transform_dims(hull, isl_dim_in, 0,
7112 isl_mat_copy(src->vmap));
7113 hull = isl_basic_map_transform_dims(hull, isl_dim_out, 0,
7114 isl_mat_copy(dst->vmap));
7115 hull = isl_basic_map_project_out(hull,
7116 isl_dim_in, 0, src->rank);
7117 hull = isl_basic_map_project_out(hull,
7118 isl_dim_out, 0, dst->rank);
7119 hull = isl_basic_map_remove_divs(hull);
7120 n_in = isl_basic_map_dim(hull, isl_dim_in);
7121 n_out = isl_basic_map_dim(hull, isl_dim_out);
7122 hull = isl_basic_map_drop_constraints_not_involving_dims(hull,
7123 isl_dim_in, 0, n_in);
7124 hull = isl_basic_map_drop_constraints_not_involving_dims(hull,
7125 isl_dim_out, 0, n_out);
7126 if (!hull)
7127 return isl_stat_error;
7128 edge->weight = isl_basic_map_n_equality(hull);
7129 isl_basic_map_free(hull);
7131 if (edge->weight > graph->max_weight)
7132 graph->max_weight = edge->weight;
7135 return isl_stat_ok;
7138 /* Call compute_schedule_finish_band on each of the clusters in "c"
7139 * in their topological order. This order is determined by the scc
7140 * fields of the nodes in "graph".
7141 * Combine the results in a sequence expressing the topological order.
7143 * If there is only one cluster left, then there is no need to introduce
7144 * a sequence node. Also, in this case, the cluster necessarily contains
7145 * the SCC at position 0 in the original graph and is therefore also
7146 * stored in the first cluster of "c".
7148 static __isl_give isl_schedule_node *finish_bands_clustering(
7149 __isl_take isl_schedule_node *node, struct isl_sched_graph *graph,
7150 struct isl_clustering *c)
7152 int i;
7153 isl_ctx *ctx;
7154 isl_union_set_list *filters;
7156 if (graph->scc == 1)
7157 return compute_schedule_finish_band(node, &c->cluster[0], 0);
7159 ctx = isl_schedule_node_get_ctx(node);
7161 filters = extract_sccs(ctx, graph);
7162 node = isl_schedule_node_insert_sequence(node, filters);
7164 for (i = 0; i < graph->scc; ++i) {
7165 int j = c->scc_cluster[i];
7166 node = isl_schedule_node_child(node, i);
7167 node = isl_schedule_node_child(node, 0);
7168 node = compute_schedule_finish_band(node, &c->cluster[j], 0);
7169 node = isl_schedule_node_parent(node);
7170 node = isl_schedule_node_parent(node);
7173 return node;
7176 /* Compute a schedule for a connected dependence graph by first considering
7177 * each strongly connected component (SCC) in the graph separately and then
7178 * incrementally combining them into clusters.
7179 * Return the updated schedule node.
7181 * Initially, each cluster consists of a single SCC, each with its
7182 * own band schedule. The algorithm then tries to merge pairs
7183 * of clusters along a proximity edge until no more suitable
7184 * proximity edges can be found. During this merging, the schedule
7185 * is maintained in the individual SCCs.
7186 * After the merging is completed, the full resulting clusters
7187 * are extracted and in finish_bands_clustering,
7188 * compute_schedule_finish_band is called on each of them to integrate
7189 * the band into "node" and to continue the computation.
7191 * compute_weights initializes the weights that are used by find_proximity.
7193 static __isl_give isl_schedule_node *compute_schedule_wcc_clustering(
7194 __isl_take isl_schedule_node *node, struct isl_sched_graph *graph)
7196 isl_ctx *ctx;
7197 struct isl_clustering c;
7198 int i;
7200 ctx = isl_schedule_node_get_ctx(node);
7202 if (clustering_init(ctx, &c, graph) < 0)
7203 goto error;
7205 if (compute_weights(graph, &c) < 0)
7206 goto error;
7208 for (;;) {
7209 i = find_proximity(graph, &c);
7210 if (i < 0)
7211 goto error;
7212 if (i >= graph->n_edge)
7213 break;
7214 if (merge_clusters_along_edge(ctx, graph, i, &c) < 0)
7215 goto error;
7218 if (extract_clusters(ctx, graph, &c) < 0)
7219 goto error;
7221 node = finish_bands_clustering(node, graph, &c);
7223 clustering_free(ctx, &c);
7224 return node;
7225 error:
7226 clustering_free(ctx, &c);
7227 return isl_schedule_node_free(node);
7230 /* Compute a schedule for a connected dependence graph and return
7231 * the updated schedule node.
7233 * If Feautrier's algorithm is selected, we first recursively try to satisfy
7234 * as many validity dependences as possible. When all validity dependences
7235 * are satisfied we extend the schedule to a full-dimensional schedule.
7237 * Call compute_schedule_wcc_whole or compute_schedule_wcc_clustering
7238 * depending on whether the user has selected the option to try and
7239 * compute a schedule for the entire (weakly connected) component first.
7240 * If there is only a single strongly connected component (SCC), then
7241 * there is no point in trying to combine SCCs
7242 * in compute_schedule_wcc_clustering, so compute_schedule_wcc_whole
7243 * is called instead.
7245 static __isl_give isl_schedule_node *compute_schedule_wcc(
7246 __isl_take isl_schedule_node *node, struct isl_sched_graph *graph)
7248 isl_ctx *ctx;
7250 if (!node)
7251 return NULL;
7253 ctx = isl_schedule_node_get_ctx(node);
7254 if (detect_sccs(ctx, graph) < 0)
7255 return isl_schedule_node_free(node);
7257 if (compute_maxvar(graph) < 0)
7258 return isl_schedule_node_free(node);
7260 if (need_feautrier_step(ctx, graph))
7261 return compute_schedule_wcc_feautrier(node, graph);
7263 if (graph->scc <= 1 || isl_options_get_schedule_whole_component(ctx))
7264 return compute_schedule_wcc_whole(node, graph);
7265 else
7266 return compute_schedule_wcc_clustering(node, graph);
7269 /* Compute a schedule for each group of nodes identified by node->scc
7270 * separately and then combine them in a sequence node (or as set node
7271 * if graph->weak is set) inserted at position "node" of the schedule tree.
7272 * Return the updated schedule node.
7274 * If "wcc" is set then each of the groups belongs to a single
7275 * weakly connected component in the dependence graph so that
7276 * there is no need for compute_sub_schedule to look for weakly
7277 * connected components.
7279 * If a set node would be introduced and if the number of components
7280 * is equal to the number of nodes, then check if the schedule
7281 * is already complete. If so, a redundant set node would be introduced
7282 * (without any further descendants) stating that the statements
7283 * can be executed in arbitrary order, which is also expressed
7284 * by the absence of any node. Refrain from inserting any nodes
7285 * in this case and simply return.
7287 static __isl_give isl_schedule_node *compute_component_schedule(
7288 __isl_take isl_schedule_node *node, struct isl_sched_graph *graph,
7289 int wcc)
7291 int component;
7292 isl_ctx *ctx;
7293 isl_union_set_list *filters;
7295 if (!node)
7296 return NULL;
7298 if (graph->weak && graph->scc == graph->n) {
7299 if (compute_maxvar(graph) < 0)
7300 return isl_schedule_node_free(node);
7301 if (graph->n_row >= graph->maxvar)
7302 return node;
7305 ctx = isl_schedule_node_get_ctx(node);
7306 filters = extract_sccs(ctx, graph);
7307 if (graph->weak)
7308 node = isl_schedule_node_insert_set(node, filters);
7309 else
7310 node = isl_schedule_node_insert_sequence(node, filters);
7312 for (component = 0; component < graph->scc; ++component) {
7313 node = isl_schedule_node_child(node, component);
7314 node = isl_schedule_node_child(node, 0);
7315 node = compute_sub_schedule(node, ctx, graph,
7316 &node_scc_exactly,
7317 &edge_scc_exactly, component, wcc);
7318 node = isl_schedule_node_parent(node);
7319 node = isl_schedule_node_parent(node);
7322 return node;
7325 /* Compute a schedule for the given dependence graph and insert it at "node".
7326 * Return the updated schedule node.
7328 * We first check if the graph is connected (through validity and conditional
7329 * validity dependences) and, if not, compute a schedule
7330 * for each component separately.
7331 * If the schedule_serialize_sccs option is set, then we check for strongly
7332 * connected components instead and compute a separate schedule for
7333 * each such strongly connected component.
7335 static __isl_give isl_schedule_node *compute_schedule(isl_schedule_node *node,
7336 struct isl_sched_graph *graph)
7338 isl_ctx *ctx;
7340 if (!node)
7341 return NULL;
7343 ctx = isl_schedule_node_get_ctx(node);
7344 if (isl_options_get_schedule_serialize_sccs(ctx)) {
7345 if (detect_sccs(ctx, graph) < 0)
7346 return isl_schedule_node_free(node);
7347 } else {
7348 if (detect_wccs(ctx, graph) < 0)
7349 return isl_schedule_node_free(node);
7352 if (graph->scc > 1)
7353 return compute_component_schedule(node, graph, 1);
7355 return compute_schedule_wcc(node, graph);
7358 /* Compute a schedule on sc->domain that respects the given schedule
7359 * constraints.
7361 * In particular, the schedule respects all the validity dependences.
7362 * If the default isl scheduling algorithm is used, it tries to minimize
7363 * the dependence distances over the proximity dependences.
7364 * If Feautrier's scheduling algorithm is used, the proximity dependence
7365 * distances are only minimized during the extension to a full-dimensional
7366 * schedule.
7368 * If there are any condition and conditional validity dependences,
7369 * then the conditional validity dependences may be violated inside
7370 * a tilable band, provided they have no adjacent non-local
7371 * condition dependences.
7373 __isl_give isl_schedule *isl_schedule_constraints_compute_schedule(
7374 __isl_take isl_schedule_constraints *sc)
7376 isl_ctx *ctx = isl_schedule_constraints_get_ctx(sc);
7377 struct isl_sched_graph graph = { 0 };
7378 isl_schedule *sched;
7379 isl_schedule_node *node;
7380 isl_union_set *domain;
7382 sc = isl_schedule_constraints_align_params(sc);
7384 domain = isl_schedule_constraints_get_domain(sc);
7385 if (isl_union_set_n_set(domain) == 0) {
7386 isl_schedule_constraints_free(sc);
7387 return isl_schedule_from_domain(domain);
7390 if (graph_init(&graph, sc) < 0)
7391 domain = isl_union_set_free(domain);
7393 node = isl_schedule_node_from_domain(domain);
7394 node = isl_schedule_node_child(node, 0);
7395 if (graph.n > 0)
7396 node = compute_schedule(node, &graph);
7397 sched = isl_schedule_node_get_schedule(node);
7398 isl_schedule_node_free(node);
7400 graph_free(ctx, &graph);
7401 isl_schedule_constraints_free(sc);
7403 return sched;
7406 /* Compute a schedule for the given union of domains that respects
7407 * all the validity dependences and minimizes
7408 * the dependence distances over the proximity dependences.
7410 * This function is kept for backward compatibility.
7412 __isl_give isl_schedule *isl_union_set_compute_schedule(
7413 __isl_take isl_union_set *domain,
7414 __isl_take isl_union_map *validity,
7415 __isl_take isl_union_map *proximity)
7417 isl_schedule_constraints *sc;
7419 sc = isl_schedule_constraints_on_domain(domain);
7420 sc = isl_schedule_constraints_set_validity(sc, validity);
7421 sc = isl_schedule_constraints_set_proximity(sc, proximity);
7423 return isl_schedule_constraints_compute_schedule(sc);