| blob | 1f96b7b4f296096acf57c628f3376e56bbd44b64 |
1 /*
2 * Copyright 2008-2009 Katholieke Universiteit Leuven
3 * Copyright 2010 INRIA Saclay
4 * Copyright 2012-2013 Ecole Normale Superieure
5 * Copyright 2014 INRIA Rocquencourt
6 * Copyright 2016 INRIA Paris
7 *
8 * Use of this software is governed by the MIT license
9 *
10 * Written by Sven Verdoolaege, K.U.Leuven, Departement
11 * Computerwetenschappen, Celestijnenlaan 200A, B-3001 Leuven, Belgium
12 * and INRIA Saclay - Ile-de-France, Parc Club Orsay Universite,
13 * ZAC des vignes, 4 rue Jacques Monod, 91893 Orsay, France
14 * and Ecole Normale Superieure, 45 rue d’Ulm, 75230 Paris, France
15 * and Inria Paris - Rocquencourt, Domaine de Voluceau - Rocquencourt,
16 * B.P. 105 - 78153 Le Chesnay, France
17 * and Centre de Recherche Inria de Paris, 2 rue Simone Iff - Voie DQ12,
18 * CS 42112, 75589 Paris Cedex 12, France
19 */
21 #include <isl_ctx_private.h>
23 #include <isl_seq.h>
24 #include <isl/options.h>
26 #include <isl_mat_private.h>
27 #include <isl_local_space_private.h>
28 #include <isl_val_private.h>
29 #include <isl_vec_private.h>
30 #include <isl_aff_private.h>
31 #include <isl_equalities.h>
32 #include <isl_constraint_private.h>
34 #include <set_to_map.c>
35 #include <set_from_map.c>
37 #define STATUS_ERROR -1
38 #define STATUS_REDUNDANT 1
39 #define STATUS_VALID 2
40 #define STATUS_SEPARATE 3
41 #define STATUS_CUT 4
42 #define STATUS_ADJ_EQ 5
43 #define STATUS_ADJ_INEQ 6
46 {
56 }
57 }
59 /* Compute the position of the equalities of basic map "bmap_i"
60 * with respect to the basic map represented by "tab_j".
61 * The resulting array has twice as many entries as the number
62 * of equalities corresponding to the two inequalities to which
63 * each equality corresponds.
64 */
67 {
82 }
83 }
86 error:
89 }
91 /* Compute the position of the inequalities of basic map "bmap_i"
92 * (also represented by "tab_i", if not NULL) with respect to the basic map
93 * represented by "tab_j".
94 */
97 {
109 }
115 }
118 error:
121 }
124 {
131 }
133 /* Return the first position of "status" in the list "con" of length "len".
134 * Return -1 if there is no such entry.
135 */
137 {
144 }
147 {
153 c++;
155 }
158 {
166 }
168 }
170 /* Internal information associated to a basic map in a map
171 * that is to be coalesced by isl_map_coalesce.
172 *
173 * "bmap" is the basic map itself (or NULL if "removed" is set)
174 * "tab" is the corresponding tableau (or NULL if "removed" is set)
175 * "hull_hash" identifies the affine space in which "bmap" lives.
176 * "removed" is set if this basic map has been removed from the map
177 * "simplify" is set if this basic map may have some unknown integer
178 * divisions that were not present in the input basic maps. The basic
179 * map should then be simplified such that we may be able to find
180 * a definition among the constraints.
181 *
182 * "eq" and "ineq" are only set if we are currently trying to coalesce
183 * this basic map with another basic map, in which case they represent
184 * the position of the inequalities of this basic map with respect to
185 * the other basic map. The number of elements in the "eq" array
186 * is twice the number of equalities in the "bmap", corresponding
187 * to the two inequalities that make up each equality.
188 */
197 };
199 /* Is there any (half of an) equality constraint in the description
200 * of the basic map represented by "info" that
201 * has position "status" with respect to the other basic map?
202 */
204 {
209 }
211 /* Is there any inequality constraint in the description
212 * of the basic map represented by "info" that
213 * has position "status" with respect to the other basic map?
214 */
216 {
221 }
223 /* Return the position of the first half on an equality constraint
224 * in the description of the basic map represented by "info" that
225 * has position "status" with respect to the other basic map.
226 * The returned value is twice the position of the equality constraint
227 * plus zero for the negative half and plus one for the positive half.
228 * Return -1 if there is no such entry.
229 */
231 {
236 }
238 /* Return the position of the first inequality constraint in the description
239 * of the basic map represented by "info" that
240 * has position "status" with respect to the other basic map.
241 * Return -1 if there is no such entry.
242 */
244 {
249 }
251 /* Return the number of (halves of) equality constraints in the description
252 * of the basic map represented by "info" that
253 * have position "status" with respect to the other basic map.
254 */
256 {
261 }
263 /* Return the number of inequality constraints in the description
264 * of the basic map represented by "info" that
265 * have position "status" with respect to the other basic map.
266 */
268 {
273 }
275 /* Are all non-redundant constraints of the basic map represented by "info"
276 * either valid or cut constraints with respect to the other basic map?
277 */
279 {
290 }
300 }
303 }
305 /* Compute the hash of the (apparent) affine hull of info->bmap (with
306 * the existentially quantified variables removed) and store it
307 * in info->hash.
308 */
310 {
323 }
325 /* Free all the allocated memory in an array
326 * of "n" isl_coalesce_info elements.
327 */
329 {
338 }
341 }
343 /* Drop the basic map represented by "info".
344 * That is, clear the memory associated to the entry and
345 * mark it as having been removed.
346 */
348 {
353 }
355 /* Exchange the information in "info1" with that in "info2".
356 */
359 {
365 }
367 /* This type represents the kind of change that has been performed
368 * while trying to coalesce two basic maps.
369 *
370 * isl_change_none: nothing was changed
371 * isl_change_drop_first: the first basic map was removed
372 * isl_change_drop_second: the second basic map was removed
373 * isl_change_fuse: the two basic maps were replaced by a new basic map.
374 */
378 isl_change_drop_first,
379 isl_change_drop_second,
380 isl_change_fuse,
381 };
383 /* Update "change" based on an interchange of the first and the second
384 * basic map. That is, interchange isl_change_drop_first and
385 * isl_change_drop_second.
386 */
388 {
400 }
403 }
405 /* Add the valid constraints of the basic map represented by "info"
406 * to "bmap". "len" is the size of the constraints.
407 * If only one of the pair of inequalities that make up an equality
408 * is valid, then add that inequality.
409 */
413 {
436 }
437 }
446 }
449 }
451 /* Is "bmap" defined by a number of (non-redundant) constraints that
452 * is greater than the number of constraints of basic maps i and j combined?
453 * Equalities are counted as two inequalities.
454 */
458 {
470 }
472 /* Replace the pair of basic maps i and j by the basic map bounded
473 * by the valid constraints in both basic maps and the constraints
474 * in extra (if not NULL).
475 * Place the fused basic map in the position that is the smallest of i and j.
476 *
477 * If "detect_equalities" is set, then look for equalities encoded
478 * as pairs of inequalities.
479 * If "check_number" is set, then the original basic maps are only
480 * replaced if the total number of constraints does not increase.
481 * While the number of integer divisions in the two basic maps
482 * is assumed to be the same, the actual definitions may be different.
483 * We only copy the definition from one of the basic map if it is
484 * the same as that of the other basic map. Otherwise, we mark
485 * the integer division as unknown and simplify the basic map
486 * in an attempt to recover the integer division definition.
487 */
490 {
525 }
526 }
533 }
541 }
553 }
562 error:
566 }
568 /* Given a pair of basic maps i and j such that all constraints are either
569 * "valid" or "cut", check if the facets corresponding to the "cut"
570 * constraints of i lie entirely within basic map j.
571 * If so, replace the pair by the basic map consisting of the valid
572 * constraints in both basic maps.
573 * Checking whether the facet lies entirely within basic map j
574 * is performed by checking whether the constraints of basic map j
575 * are valid for the facet. These tests are performed on a rational
576 * tableau to avoid the theoretical possibility that a constraint
577 * that was considered to be a cut constraint for the entire basic map i
578 * happens to be considered to be a valid constraint for the facet,
579 * even though it cuts off the same rational points.
580 *
581 * To see that we are not introducing any extra points, call the
582 * two basic maps A and B and the resulting map U and let x
583 * be an element of U \setminus ( A \cup B ).
584 * A line connecting x with an element of A \cup B meets a facet F
585 * of either A or B. Assume it is a facet of B and let c_1 be
586 * the corresponding facet constraint. We have c_1(x) < 0 and
587 * so c_1 is a cut constraint. This implies that there is some
588 * (possibly rational) point x' satisfying the constraints of A
589 * and the opposite of c_1 as otherwise c_1 would have been marked
590 * valid for A. The line connecting x and x' meets a facet of A
591 * in a (possibly rational) point that also violates c_1, but this
592 * is impossible since all cut constraints of B are valid for all
593 * cut facets of A.
594 * In case F is a facet of A rather than B, then we can apply the
595 * above reasoning to find a facet of B separating x from A \cup B first.
596 */
599 {
623 }
628 }
634 }
636 }
638 /* Check if info->bmap contains the basic map represented
639 * by the tableau "tab".
640 * For each equality, we check both the constraint itself
641 * (as an inequality) and its negation. Make sure the
642 * equality is returned to its original state before returning.
643 */
645 {
665 }
676 }
678 }
680 /* Basic map "i" has an inequality (say "k") that is adjacent
681 * to some inequality of basic map "j". All the other inequalities
682 * are valid for "j".
683 * Check if basic map "j" forms an extension of basic map "i".
684 *
685 * Note that this function is only called if some of the equalities or
686 * inequalities of basic map "j" do cut basic map "i". The function is
687 * correct even if there are no such cut constraints, but in that case
688 * the additional checks performed by this function are overkill.
689 *
690 * In particular, we replace constraint k, say f >= 0, by constraint
691 * f <= -1, add the inequalities of "j" that are valid for "i"
692 * and check if the result is a subset of basic map "j".
693 * To improve the chances of the subset relation being detected,
694 * any variable that only attains a single integer value
695 * in the tableau of "i" is first fixed to that value.
696 * If the result is a subset, then we know that this result is exactly equal
697 * to basic map "j" since all its constraints are valid for basic map "j".
698 * By combining the valid constraints of "i" (all equalities and all
699 * inequalities except "k") and the valid constraints of "j" we therefore
700 * obtain a basic map that is equal to their union.
701 * In this case, there is no need to perform a rollback of the tableau
702 * since it is going to be destroyed in fuse().
703 *
704 *
705 * |\__ |\__
706 * | \__ | \__
707 * | \_ => | \__
708 * |_______| _ |_________\
709 *
710 *
711 * |\ |\
712 * | \ | \
713 * | \ | \
714 * | | | \
715 * | ||\ => | \
716 * | || \ | \
717 * | || | | |
718 * |__||_/ |_____/
719 */
722 {
727 isl_stat r;
728 isl_bool super;
757 }
771 }
774 /* Both basic maps have at least one inequality with and adjacent
775 * (but opposite) inequality in the other basic map.
776 * Check that there are no cut constraints and that there is only
777 * a single pair of adjacent inequalities.
778 * If so, we can replace the pair by a single basic map described
779 * by all but the pair of adjacent inequalities.
780 * Any additional points introduced lie strictly between the two
781 * adjacent hyperplanes and can therefore be integral.
782 *
783 * ____ _____
784 * / ||\ / \
785 * / || \ / \
786 * \ || \ => \ \
787 * \ || / \ /
788 * \___||_/ \_____/
789 *
790 * The test for a single pair of adjancent inequalities is important
791 * for avoiding the combination of two basic maps like the following
792 *
793 * /|
794 * / |
795 * /__|
796 * _____
797 * | |
798 * | |
799 * |___|
800 *
801 * If there are some cut constraints on one side, then we may
802 * still be able to fuse the two basic maps, but we need to perform
803 * some additional checks in is_adj_ineq_extension.
804 */
807 {
830 }
832 /* Given an affine transformation matrix "T", does row "row" represent
833 * anything other than a unit vector (possibly shifted by a constant)
834 * that is not involved in any of the other rows?
835 *
836 * That is, if a constraint involves the variable corresponding to
837 * the row, then could its preimage by "T" have any coefficients
838 * that are different from those in the original constraint?
839 */
841 {
861 }
864 }
866 /* Does inequality constraint "ineq" of "bmap" involve any of
867 * the variables marked in "affected"?
868 * "total" is the total number of variables, i.e., the number
869 * of entries in "affected".
870 */
873 {
881 }
884 }
886 /* Given the compressed version of inequality constraint "ineq"
887 * of info->bmap in "v", check if the constraint can be tightened,
888 * where the compression is based on an equality constraint valid
889 * for info->tab.
890 * If so, add the tightened version of the inequality constraint
891 * to info->tab. "v" may be modified by this function.
892 *
893 * That is, if the compressed constraint is of the form
894 *
895 * m f() + c >= 0
896 *
897 * with 0 < c < m, then it is equivalent to
898 *
899 * f() >= 0
900 *
901 * This means that c can also be subtracted from the original,
902 * uncompressed constraint without affecting the integer points
903 * in info->tab. Add this tightened constraint as an extra row
904 * to info->tab to make this information explicitly available.
905 */
908 {
910 isl_stat r;
920 }
943 }
945 /* Tighten the (non-redundant) constraints on the facet represented
946 * by info->tab.
947 * In particular, on input, info->tab represents the result
948 * of relaxing the "n" inequality constraints of info->bmap in "relaxed"
949 * by one, i.e., replacing f_i >= 0 by f_i + 1 >= 0, and then
950 * replacing the one at index "l" by the corresponding equality,
951 * i.e., f_k + 1 = 0, with k = relaxed[l].
952 *
953 * Compute a variable compression from the equality constraint f_k + 1 = 0
954 * and use it to tighten the other constraints of info->bmap
955 * (that is, all constraints that have not been relaxed),
956 * updating info->tab (and leaving info->bmap untouched).
957 * The compression handles essentially two cases, one where a variable
958 * is assigned a fixed value and can therefore be eliminated, and one
959 * where one variable is a shifted multiple of some other variable and
960 * can therefore be replaced by that multiple.
961 * Gaussian elimination would also work for the first case, but for
962 * the second case, the effectiveness would depend on the order
963 * of the variables.
964 * After compression, some of the constraints may have coefficients
965 * with a common divisor. If this divisor does not divide the constant
966 * term, then the constraint can be tightened.
967 * The tightening is performed on the tableau info->tab by introducing
968 * extra (temporary) constraints.
969 *
970 * Only constraints that are possibly affected by the compression are
971 * considered. In particular, if the constraint only involves variables
972 * that are directly mapped to a distinct set of other variables, then
973 * no common divisor can be introduced and no tightening can occur.
974 *
975 * It is important to only consider the non-redundant constraints
976 * since the facet constraint has been relaxed prior to the call
977 * to this function, meaning that the constraints that were redundant
978 * prior to the relaxation may no longer be redundant.
979 * These constraints will be ignored in the fused result, so
980 * the fusion detection should not exploit them.
981 */
984 {
1005 }
1015 isl_bool handle;
1034 }
1039 error:
1043 }
1045 /* Replace the basic maps "i" and "j" by an extension of "i"
1046 * along the "n" inequality constraints in "relax" by one.
1047 * The tableau info[i].tab has already been extended.
1048 * Extend info[i].bmap accordingly by relaxing all constraints in "relax"
1049 * by one.
1050 * Each integer division that does not have exactly the same
1051 * definition in "i" and "j" is marked unknown and the basic map
1052 * is scheduled to be simplified in an attempt to recover
1053 * the integer division definition.
1054 * Place the extension in the position that is the smallest of i and j.
1055 */
1058 {
1071 }
1080 }
1082 /* Basic map "i" has "n" inequality constraints (collected in "relax")
1083 * that are such that they include basic map "j" if they are relaxed
1084 * by one. All the other inequalities are valid for "j".
1085 * Check if basic map "j" forms an extension of basic map "i".
1086 *
1087 * In particular, relax the constraints in "relax", compute the corresponding
1088 * facets one by one and check whether each of these is included
1089 * in the other basic map.
1090 * Before testing for inclusion, the constraints on each facet
1091 * are tightened to increase the chance of an inclusion being detected.
1092 * (Adding the valid constraints of "j" to the tableau of "i", as is done
1093 * in is_adj_ineq_extension, may further increase those chances, but this
1094 * is not currently done.)
1095 * If each facet is included, we know that relaxing the constraints extends
1096 * the basic map with exactly the other basic map (we already know that this
1097 * other basic map is included in the extension, because all other
1098 * inequality constraints are valid of "j") and we can replace the
1099 * two basic maps by this extension.
1100 *
1101 * If any of the relaxed constraints turn out to be redundant, then bail out.
1102 * isl_tab_select_facet refuses to handle such constraints. It may be
1103 * possible to handle them anyway by making a distinction between
1104 * redundant constraints with a corresponding facet that still intersects
1105 * the set (allowing isl_tab_select_facet to handle them) and
1106 * those where the facet does not intersect the set (which can be ignored
1107 * because the empty facet is trivially included in the other disjunct).
1108 * However, relaxed constraints that turn out to be redundant should
1109 * be fairly rare and no such instance has been reported where
1110 * coalescing would be successful.
1111 * ____ _____
1112 * / || / |
1113 * / || / |
1114 * \ || => \ |
1115 * \ || \ |
1116 * \___|| \____|
1117 *
1118 *
1119 * \ |\
1120 * |\\ | \
1121 * | \\ | \
1122 * | | => | /
1123 * | / | /
1124 * |/ |/
1125 */
1128 {
1130 isl_bool super;
1148 }
1165 }
1170 }
1172 /* Data structure that keeps track of the wrapping constraints
1173 * and of information to bound the coefficients of those constraints.
1174 *
1175 * bound is set if we want to apply a bound on the coefficients
1176 * mat contains the wrapping constraints
1177 * max is the bound on the coefficients (if bound is set)
1178 */
1182 isl_int max;
1183 };
1185 /* Update wraps->max to be greater than or equal to the coefficients
1186 * in the equalities and inequalities of info->bmap that can be removed
1187 * if we end up applying wrapping.
1188 */
1191 {
1193 isl_int max_k;
1205 }
1214 }
1219 }
1221 /* Initialize the isl_wraps data structure.
1222 * If we want to bound the coefficients of the wrapping constraints,
1223 * we set wraps->max to the largest coefficient
1224 * in the equalities and inequalities that can be removed if we end up
1225 * applying wrapping.
1226 */
1229 {
1248 }
1250 /* Free the contents of the isl_wraps data structure.
1251 */
1253 {
1257 }
1259 /* Is the wrapping constraint in row "row" allowed?
1260 *
1261 * If wraps->bound is set, we check that none of the coefficients
1262 * is greater than wraps->max.
1263 */
1265 {
1276 }
1278 /* Wrap "ineq" (or its opposite if "negate" is set) around "bound"
1279 * to include "set" and add the result in position "w" of "wraps".
1280 * "len" is the total number of coefficients in "bound" and "ineq".
1281 * Return 1 on success, 0 on failure and -1 on error.
1282 * Wrapping can fail if the result of wrapping is equal to "bound"
1283 * or if we want to bound the sizes of the coefficients and
1284 * the wrapped constraint does not satisfy this bound.
1285 */
1288 {
1293 }
1301 }
1303 /* For each constraint in info->bmap that is not redundant (as determined
1304 * by info->tab) and that is not a valid constraint for the other basic map,
1305 * wrap the constraint around "bound" such that it includes the whole
1306 * set "set" and append the resulting constraint to "wraps".
1307 * Note that the constraints that are valid for the other basic map
1308 * will be added to the combined basic map by default, so there is
1309 * no need to wrap them.
1310 * The caller wrap_in_facets even relies on this function not wrapping
1311 * any constraints that are already valid.
1312 * "wraps" is assumed to have been pre-allocated to the appropriate size.
1313 * wraps->n_row is the number of actual wrapped constraints that have
1314 * been added.
1315 * If any of the wrapping problems results in a constraint that is
1316 * identical to "bound", then this means that "set" is unbounded in such
1317 * way that no wrapping is possible. If this happens then wraps->n_row
1318 * is reset to zero.
1319 * Similarly, if we want to bound the coefficients of the wrapping
1320 * constraints and a newly added wrapping constraint does not
1321 * satisfy the bound, then wraps->n_row is also reset to zero.
1322 */
1325 {
1351 }
1368 }
1369 }
1373 unbounded:
1376 }
1378 /* Check if the constraints in "wraps" from "first" until the last
1379 * are all valid for the basic set represented by "tab".
1380 * If not, wraps->n_row is set to zero.
1381 */
1384 {
1396 }
1399 }
1401 /* Return a set that corresponds to the non-redundant constraints
1402 * (as recorded in tab) of bmap.
1403 *
1404 * It's important to remove the redundant constraints as some
1405 * of the other constraints may have been modified after the
1406 * constraints were marked redundant.
1407 * In particular, a constraint may have been relaxed.
1408 * Redundant constraints are ignored when a constraint is relaxed
1409 * and should therefore continue to be ignored ever after.
1410 * Otherwise, the relaxation might be thwarted by some of
1411 * these constraints.
1412 *
1413 * Update the underlying set to ensure that the dimension doesn't change.
1414 * Otherwise the integer divisions could get dropped if the tab
1415 * turns out to be empty.
1416 */
1419 {
1427 }
1429 /* Wrap the constraints of info->bmap that bound the facet defined
1430 * by inequality "k" around (the opposite of) this inequality to
1431 * include "set". "bound" may be used to store the negated inequality.
1432 * Since the wrapped constraints are not guaranteed to contain the whole
1433 * of info->bmap, we check them in check_wraps.
1434 * If any of the wrapped constraints turn out to be invalid, then
1435 * check_wraps will reset wrap->n_row to zero.
1436 */
1440 {
1464 }
1466 /* Given a basic set i with a constraint k that is adjacent to
1467 * basic set j, check if we can wrap
1468 * both the facet corresponding to k (if "wrap_facet" is set) and basic map j
1469 * (always) around their ridges to include the other set.
1470 * If so, replace the pair of basic sets by their union.
1471 *
1472 * All constraints of i (except k) are assumed to be valid or
1473 * cut constraints for j.
1474 * Wrapping the cut constraints to include basic map j may result
1475 * in constraints that are no longer valid of basic map i
1476 * we have to check that the resulting wrapping constraints are valid for i.
1477 * If "wrap_facet" is not set, then all constraints of i (except k)
1478 * are assumed to be valid for j.
1479 * ____ _____
1480 * / | / \
1481 * / || / |
1482 * \ || => \ |
1483 * \ || \ |
1484 * \___|| \____|
1485 *
1486 */
1489 {
1529 }
1533 unbounded:
1542 error:
1548 }
1550 /* Given a cut constraint t(x) >= 0 of basic map i, stored in row "w"
1551 * of wrap.mat, replace it by its relaxed version t(x) + 1 >= 0, and
1552 * add wrapping constraints to wrap.mat for all constraints
1553 * of basic map j that bound the part of basic map j that sticks out
1554 * of the cut constraint.
1555 * "set_i" is the underlying set of basic map i.
1556 * If any wrapping fails, then wraps->mat.n_row is reset to zero.
1557 *
1558 * In particular, we first intersect basic map j with t(x) + 1 = 0.
1559 * If the result is empty, then t(x) >= 0 was actually a valid constraint
1560 * (with respect to the integer points), so we add t(x) >= 0 instead.
1561 * Otherwise, we wrap the constraints of basic map j that are not
1562 * redundant in this intersection and that are not already valid
1563 * for basic map i over basic map i.
1564 * Note that it is sufficient to wrap the constraints to include
1565 * basic map i, because we will only wrap the constraints that do
1566 * not include basic map i already. The wrapped constraint will
1567 * therefore be more relaxed compared to the original constraint.
1568 * Since the original constraint is valid for basic map j, so is
1569 * the wrapped constraint.
1570 */
1574 {
1590 }
1592 /* Given a pair of basic maps i and j such that j sticks out
1593 * of i at n cut constraints, each time by at most one,
1594 * try to compute wrapping constraints and replace the two
1595 * basic maps by a single basic map.
1596 * The other constraints of i are assumed to be valid for j.
1597 * "set_i" is the underlying set of basic map i.
1598 * "wraps" has been initialized to be of the right size.
1599 *
1600 * For each cut constraint t(x) >= 0 of i, we add the relaxed version
1601 * t(x) + 1 >= 0, along with wrapping constraints for all constraints
1602 * of basic map j that bound the part of basic map j that sticks out
1603 * of the cut constraint.
1604 *
1605 * If any wrapping fails, i.e., if we cannot wrap to touch
1606 * the union, then we give up.
1607 * Otherwise, the pair of basic maps is replaced by their union.
1608 */
1612 {
1631 else
1639 }
1640 }
1653 }
1656 }
1658 /* Given a pair of basic maps i and j such that j sticks out
1659 * of i at n cut constraints, each time by at most one,
1660 * try to compute wrapping constraints and replace the two
1661 * basic maps by a single basic map.
1662 * The other constraints of i are assumed to be valid for j.
1663 *
1664 * The core computation is performed by try_wrap_in_facets.
1665 * This function simply extracts an underlying set representation
1666 * of basic map i and initializes the data structure for keeping
1667 * track of wrapping constraints.
1668 */
1671 {
1700 error:
1704 }
1706 /* Return the effect of inequality "ineq" on the tableau "tab",
1707 * after relaxing the constant term of "ineq" by one.
1708 */
1710 {
1718 }
1720 /* Given two basic sets i and j,
1721 * check if relaxing all the cut constraints of i by one turns
1722 * them into valid constraint for j and check if we can wrap in
1723 * the bits that are sticking out.
1724 * If so, replace the pair by their union.
1725 *
1726 * We first check if all relaxed cut inequalities of i are valid for j
1727 * and then try to wrap in the intersections of the relaxed cut inequalities
1728 * with j.
1729 *
1730 * During this wrapping, we consider the points of j that lie at a distance
1731 * of exactly 1 from i. In particular, we ignore the points that lie in
1732 * between this lower-dimensional space and the basic map i.
1733 * We can therefore only apply this to integer maps.
1734 * ____ _____
1735 * / ___|_ / \
1736 * / | | / |
1737 * \ | | => \ |
1738 * \|____| \ |
1739 * \___| \____/
1740 *
1741 * _____ ______
1742 * | ____|_ | \
1743 * | | | | |
1744 * | | | => | |
1745 * |_| | | |
1746 * |_____| \______|
1747 *
1748 * _______
1749 * | |
1750 * | |\ |
1751 * | | \ |
1752 * | | \ |
1753 * | | \|
1754 * | | \
1755 * | |_____\
1756 * | |
1757 * |_______|
1758 *
1759 * Wrapping can fail if the result of wrapping one of the facets
1760 * around its edges does not produce any new facet constraint.
1761 * In particular, this happens when we try to wrap in unbounded sets.
1762 *
1763 * _______________________________________________________________________
1764 * |
1765 * | ___
1766 * | | |
1767 * |_| |_________________________________________________________________
1768 * |___|
1769 *
1770 * The following is not an acceptable result of coalescing the above two
1771 * sets as it includes extra integer points.
1772 * _______________________________________________________________________
1773 * |
1774 * |
1775 * |
1776 * |
1777 * \______________________________________________________________________
1778 */
1781 {
1814 }
1815 }
1828 }
1831 }
1833 /* Check if either i or j has only cut constraints that can
1834 * be used to wrap in (a facet of) the other basic set.
1835 * if so, replace the pair by their union.
1836 */
1838 {
1847 }
1849 /* Check if all inequality constraints of "i" that cut "j" cease
1850 * to be cut constraints if they are relaxed by one.
1851 * If so, collect the cut constraints in "list".
1852 * The caller is responsible for allocating "list".
1853 */
1856 {
1871 }
1874 }
1876 /* Given two basic maps such that "j" has at least one equality constraint
1877 * that is adjacent to an inequality constraint of "i" and such that "i" has
1878 * exactly one inequality constraint that is adjacent to an equality
1879 * constraint of "j", check whether "i" can be extended to include "j" or
1880 * whether "j" can be wrapped into "i".
1881 * All remaining constraints of "i" and "j" are assumed to be valid
1882 * or cut constraints of the other basic map.
1883 * However, none of the equality constraints of "i" are cut constraints.
1884 *
1885 * If "i" has any "cut" inequality constraints, then check if relaxing
1886 * each of them by one is sufficient for them to become valid.
1887 * If so, check if the inequality constraint adjacent to an equality
1888 * constraint of "j" along with all these cut constraints
1889 * can be relaxed by one to contain exactly "j".
1890 * Otherwise, or if this fails, check if "j" can be wrapped into "i".
1891 */
1894 {
1900 isl_bool try_relax;
1918 }
1929 }
1931 /* At least one of the basic maps has an equality that is adjacent
1932 * to an inequality. Make sure that only one of the basic maps has
1933 * such an equality and that the other basic map has exactly one
1934 * inequality adjacent to an equality.
1935 * If the other basic map does not have such an inequality, then
1936 * check if all its constraints are either valid or cut constraints
1937 * and, if so, try wrapping in the first map into the second.
1938 * Otherwise, try to extend one basic map with the other or
1939 * wrap one basic map in the other.
1940 */
1943 {
1946 /* ADJ EQ TOO MANY */
1952 /* j has an equality adjacent to an inequality in i */
1958 }
1964 /* ADJ EQ TOO MANY */
1968 }
1970 /* Disjunct "j" lies on a hyperplane that is adjacent to disjunct "i".
1971 * In particular, disjunct "i" has an inequality constraint that is adjacent
1972 * to a (combination of) equality constraint(s) of disjunct "j",
1973 * but disjunct "j" has no explicit equality constraint adjacent
1974 * to an inequality constraint of disjunct "i".
1975 *
1976 * Disjunct "i" is already known not to have any equality constraints
1977 * that are adjacent to an equality or inequality constraint.
1978 * Check that, other than the inequality constraint mentioned above,
1979 * all other constraints of disjunct "i" are valid for disjunct "j".
1980 * If so, try and wrap in disjunct "j".
1981 */
1984 {
1999 }
2001 /* The two basic maps lie on adjacent hyperplanes. In particular,
2002 * basic map "i" has an equality that lies parallel to basic map "j".
2003 * Check if we can wrap the facets around the parallel hyperplanes
2004 * to include the other set.
2005 *
2006 * We perform basically the same operations as can_wrap_in_facet,
2007 * except that we don't need to select a facet of one of the sets.
2008 * _
2009 * \\ \\
2010 * \\ => \\
2011 * \ \|
2012 *
2013 * If there is more than one equality of "i" adjacent to an equality of "j",
2014 * then the result will satisfy one or more equalities that are a linear
2015 * combination of these equalities. These will be encoded as pairs
2016 * of inequalities in the wrapping constraints and need to be made
2017 * explicit.
2018 */
2021 {
2052 else
2079 }
2080 unbounded:
2088 }
2090 /* Initialize the "eq" and "ineq" fields of "info".
2091 */
2093 {
2095 }
2097 /* Set info->eq to the positions of the equalities of info->bmap
2098 * with respect to the basic map represented by "tab".
2099 * If info->eq has already been computed, then do not compute it again.
2100 */
2103 {
2107 }
2109 /* Set info->ineq to the positions of the inequalities of info->bmap
2110 * with respect to the basic map represented by "tab".
2111 * If info->ineq has already been computed, then do not compute it again.
2112 */
2115 {
2119 }
2121 /* Free the memory allocated by the "eq" and "ineq" fields of "info".
2122 * This function assumes that init_status has been called on "info" first,
2123 * after which the "eq" and "ineq" fields may or may not have been
2124 * assigned a newly allocated array.
2125 */
2127 {
2130 }
2132 /* Are all inequality constraints of the basic map represented by "info"
2133 * valid for the other basic map, except for a single constraint
2134 * that is adjacent to an inequality constraint of the other basic map?
2135 */
2137 {
2151 }
2154 }
2156 /* Basic map "i" has one or more equality constraints that separate it
2157 * from basic map "j". Check if it happens to be an extension
2158 * of basic map "j".
2159 * In particular, check that all constraints of "j" are valid for "i",
2160 * except for one inequality constraint that is adjacent
2161 * to an inequality constraints of "i".
2162 * If so, check for "i" being an extension of "j" by calling
2163 * is_adj_ineq_extension.
2164 *
2165 * Clean up the memory allocated for keeping track of the status
2166 * of the constraints before returning.
2167 */
2170 {
2180 }
2182 /* Check if the union of the given pair of basic maps
2183 * can be represented by a single basic map.
2184 * If so, replace the pair by the single basic map and return
2185 * isl_change_drop_first, isl_change_drop_second or isl_change_fuse.
2186 * Otherwise, return isl_change_none.
2187 * The two basic maps are assumed to live in the same local space.
2188 * The "eq" and "ineq" fields of info[i] and info[j] are assumed
2189 * to have been initialized by the caller, either to NULL or
2190 * to valid information.
2191 *
2192 * We first check the effect of each constraint of one basic map
2193 * on the other basic map.
2194 * The constraint may be
2195 * redundant the constraint is redundant in its own
2196 * basic map and should be ignore and removed
2197 * in the end
2198 * valid all (integer) points of the other basic map
2199 * satisfy the constraint
2200 * separate no (integer) point of the other basic map
2201 * satisfies the constraint
2202 * cut some but not all points of the other basic map
2203 * satisfy the constraint
2204 * adj_eq the given constraint is adjacent (on the outside)
2205 * to an equality of the other basic map
2206 * adj_ineq the given constraint is adjacent (on the outside)
2207 * to an inequality of the other basic map
2208 *
2209 * We consider seven cases in which we can replace the pair by a single
2210 * basic map. We ignore all "redundant" constraints.
2211 *
2212 * 1. all constraints of one basic map are valid
2213 * => the other basic map is a subset and can be removed
2214 *
2215 * 2. all constraints of both basic maps are either "valid" or "cut"
2216 * and the facets corresponding to the "cut" constraints
2217 * of one of the basic maps lies entirely inside the other basic map
2218 * => the pair can be replaced by a basic map consisting
2219 * of the valid constraints in both basic maps
2220 *
2221 * 3. there is a single pair of adjacent inequalities
2222 * (all other constraints are "valid")
2223 * => the pair can be replaced by a basic map consisting
2224 * of the valid constraints in both basic maps
2225 *
2226 * 4. one basic map has a single adjacent inequality, while the other
2227 * constraints are "valid". The other basic map has some
2228 * "cut" constraints, but replacing the adjacent inequality by
2229 * its opposite and adding the valid constraints of the other
2230 * basic map results in a subset of the other basic map
2231 * => the pair can be replaced by a basic map consisting
2232 * of the valid constraints in both basic maps
2233 *
2234 * 5. there is a single adjacent pair of an inequality and an equality,
2235 * the other constraints of the basic map containing the inequality are
2236 * "valid". Moreover, if the inequality the basic map is relaxed
2237 * and then turned into an equality, then resulting facet lies
2238 * entirely inside the other basic map
2239 * => the pair can be replaced by the basic map containing
2240 * the inequality, with the inequality relaxed.
2241 *
2242 * 6. there is a single inequality adjacent to an equality,
2243 * the other constraints of the basic map containing the inequality are
2244 * "valid". Moreover, the facets corresponding to both
2245 * the inequality and the equality can be wrapped around their
2246 * ridges to include the other basic map
2247 * => the pair can be replaced by a basic map consisting
2248 * of the valid constraints in both basic maps together
2249 * with all wrapping constraints
2250 *
2251 * 7. one of the basic maps extends beyond the other by at most one.
2252 * Moreover, the facets corresponding to the cut constraints and
2253 * the pieces of the other basic map at offset one from these cut
2254 * constraints can be wrapped around their ridges to include
2255 * the union of the two basic maps
2256 * => the pair can be replaced by a basic map consisting
2257 * of the valid constraints in both basic maps together
2258 * with all wrapping constraints
2259 *
2260 * 8. the two basic maps live in adjacent hyperplanes. In principle
2261 * such sets can always be combined through wrapping, but we impose
2262 * that there is only one such pair, to avoid overeager coalescing.
2263 *
2264 * Throughout the computation, we maintain a collection of tableaus
2265 * corresponding to the basic maps. When the basic maps are dropped
2266 * or combined, the tableaus are modified accordingly.
2267 */
2270 {
2334 }
2336 done:
2340 error:
2344 }
2346 /* Check if the union of the given pair of basic maps
2347 * can be represented by a single basic map.
2348 * If so, replace the pair by the single basic map and return
2349 * isl_change_drop_first, isl_change_drop_second or isl_change_fuse.
2350 * Otherwise, return isl_change_none.
2351 * The two basic maps are assumed to live in the same local space.
2352 */
2355 {
2359 }
2361 /* Shift the integer division at position "div" of the basic map
2362 * represented by "info" by "shift".
2363 *
2364 * That is, if the integer division has the form
2365 *
2366 * floor(f(x)/d)
2367 *
2368 * then replace it by
2369 *
2370 * floor((f(x) + shift * d)/d) - shift
2371 */
2373 isl_int shift)
2374 {
2387 }
2389 /* If the integer division at position "div" is defined by an equality,
2390 * i.e., a stride constraint, then change the integer division expression
2391 * to have a constant term equal to zero.
2392 *
2393 * Let the equality constraint be
2394 *
2395 * c + f + m a = 0
2396 *
2397 * The integer division expression is then typically of the form
2398 *
2399 * a = floor((-f - c')/m)
2400 *
2401 * The integer division is first shifted by t = floor(c/m),
2402 * turning the equality constraint into
2403 *
2404 * c - m floor(c/m) + f + m a' = 0
2405 *
2406 * i.e.,
2407 *
2408 * (c mod m) + f + m a' = 0
2409 *
2410 * That is,
2411 *
2412 * a' = (-f - (c mod m))/m = floor((-f)/m)
2413 *
2414 * because a' is an integer and 0 <= (c mod m) < m.
2415 * The constant term of a' can therefore be zeroed out,
2416 * but only if the integer division expression is of the expected form.
2417 */
2419 {
2421 isl_stat r;
2452 }
2454 /* The basic maps represented by "info1" and "info2" are known
2455 * to have the same number of integer divisions.
2456 * Check if pairs of integer divisions are equal to each other
2457 * despite the fact that they differ by a rational constant.
2458 *
2459 * In particular, look for any pair of integer divisions that
2460 * only differ in their constant terms.
2461 * If either of these integer divisions is defined
2462 * by stride constraints, then modify it to have a zero constant term.
2463 * If both are defined by stride constraints then in the end they will have
2464 * the same (zero) constant term.
2465 */
2468 {
2492 }
2495 }
2497 /* If "shift" is an integer constant, then shift the integer division
2498 * at position "div" of the basic map represented by "info" by "shift".
2499 * If "shift" is not an integer constant, then do nothing.
2500 * If "shift" is equal to zero, then no shift needs to be performed either.
2501 *
2502 * That is, if the integer division has the form
2503 *
2504 * floor(f(x)/d)
2505 *
2506 * then replace it by
2507 *
2508 * floor((f(x) + shift * d)/d) - shift
2509 */
2512 {
2513 isl_bool cst;
2514 isl_stat r;
2515 isl_int d;
2529 }
2540 }
2542 /* Check if some of the divs in the basic map represented by "info1"
2543 * are shifts of the corresponding divs in the basic map represented
2544 * by "info2", taking into account the equality constraints "eq1" of "info1"
2545 * and "eq2" of "info2". If so, align them with those of "info2".
2546 * "info1" and "info2" are assumed to have the same number
2547 * of integer divisions.
2548 *
2549 * An integer division is considered to be a shift of another integer
2550 * division if, after simplification with respect to the equality
2551 * constraints of the other basic map, one is equal to the other
2552 * plus a constant.
2553 *
2554 * In particular, for each pair of integer divisions, if both are known,
2555 * have the same denominator and are not already equal to each other,
2556 * simplify each with respect to the equality constraints
2557 * of the other basic map. If the difference is an integer constant,
2558 * then move this difference outside.
2559 * That is, if, after simplification, one integer division is of the form
2560 *
2561 * floor((f(x) + c_1)/d)
2562 *
2563 * while the other is of the form
2564 *
2565 * floor((f(x) + c_2)/d)
2566 *
2567 * and n = (c_2 - c_1)/d is an integer, then replace the first
2568 * integer division by
2569 *
2570 * floor((f_1(x) + c_1 + n * d)/d) - n,
2571 *
2572 * where floor((f_1(x) + c_1 + n * d)/d) = floor((f2(x) + c_2)/d)
2573 * after simplification with respect to the equality constraints.
2574 */
2578 {
2587 isl_stat r;
2609 }
2616 }
2618 /* Check if some of the divs in the basic map represented by "info1"
2619 * are shifts of the corresponding divs in the basic map represented
2620 * by "info2". If so, align them with those of "info2".
2621 * Only do this if "info1" and "info2" have the same number
2622 * of integer divisions.
2623 *
2624 * An integer division is considered to be a shift of another integer
2625 * division if, after simplification with respect to the equality
2626 * constraints of the other basic map, one is equal to the other
2627 * plus a constant.
2628 *
2629 * First check if pairs of integer divisions are equal to each other
2630 * despite the fact that they differ by a rational constant.
2631 * If so, try and arrange for them to have the same constant term.
2632 *
2633 * Then, extract the equality constraints and continue with
2634 * harmonize_divs_with_hulls.
2635 *
2636 * If the equality constraints of both basic maps are the same,
2637 * then there is no need to perform any shifting since
2638 * the coefficients of the integer divisions should have been
2639 * reduced in the same way.
2640 */
2643 {
2644 isl_bool equal;
2647 isl_stat r;
2669 else
2675 }
2677 /* Do the two basic maps live in the same local space, i.e.,
2678 * do they have the same (known) divs?
2679 * If either basic map has any unknown divs, then we can only assume
2680 * that they do not live in the same local space.
2681 */
2684 {
2686 isl_bool known;
2710 }
2712 /* Assuming that "tab" contains the equality constraints and
2713 * the initial inequality constraints of "bmap", copy the remaining
2714 * inequality constraints of "bmap" to "Tab".
2715 */
2717 {
2729 }
2731 /* Description of an integer division that is added
2732 * during an expansion.
2733 * "pos" is the position of the corresponding variable.
2734 * "cst" indicates whether this integer division has a fixed value.
2735 * "val" contains the fixed value, if the value is fixed.
2736 */
2739 isl_bool cst;
2740 isl_int val;
2741 };
2743 /* For each of the "n" integer division variables "expanded",
2744 * if the variable has a fixed value, then add two inequality
2745 * constraints expressing the fixed value.
2746 * Otherwise, add the corresponding div constraints.
2747 * The caller is responsible for removing the div constraints
2748 * that it added for all these "n" integer divisions.
2749 *
2750 * The div constraints and the pair of inequality constraints
2751 * forcing the fixed value cannot both be added for a given variable
2752 * as the combination may render some of the original constraints redundant.
2753 * These would then be ignored during the coalescing detection,
2754 * while they could remain in the fused result.
2755 *
2756 * The two added inequality constraints are
2757 *
2758 * -a + v >= 0
2759 * a - v >= 0
2760 *
2761 * with "a" the variable and "v" its fixed value.
2762 * The facet corresponding to one of these two constraints is selected
2763 * in the tableau to ensure that the pair of inequality constraints
2764 * is treated as an equality constraint.
2765 *
2766 * The information in info->ineq is thrown away because it was
2767 * computed in terms of div constraints, while some of those
2768 * have now been replaced by these pairs of inequality constraints.
2769 */
2772 {
2800 }
2806 }
2814 }
2816 /* Insert the "n" integer division variables "expanded"
2817 * into info->tab and info->bmap and
2818 * update info->ineq with respect to the redundant constraints
2819 * in the resulting tableau.
2820 * "bmap" contains the result of this insertion in info->bmap,
2821 * while info->bmap is the original version
2822 * of "bmap", i.e., the one that corresponds to the current
2823 * state of info->tab. The number of constraints in info->bmap
2824 * is assumed to be the same as the number of constraints
2825 * in info->tab. This is required to be able to detect
2826 * the extra constraints in "bmap".
2827 *
2828 * In particular, introduce extra variables corresponding
2829 * to the extra integer divisions and add the div constraints
2830 * that were added to "bmap" after info->tab was created
2831 * from info->bmap.
2832 * Furthermore, check if these extra integer divisions happen
2833 * to attain a fixed integer value in info->tab.
2834 * If so, replace the corresponding div constraints by pairs
2835 * of inequality constraints that fix these
2836 * integer divisions to their single integer values.
2837 * Replace info->bmap by "bmap" to match the changes to info->tab.
2838 * info->ineq was computed without a tableau and therefore
2839 * does not take into account the redundant constraints
2840 * in the tableau. Mark them here.
2841 * There is no need to check the newly added div constraints
2842 * since they cannot be redundant.
2843 * The redundancy check is not performed when constants have been discovered
2844 * since info->ineq is completely thrown away in this case.
2845 */
2848 {
2858 "original tableau does not correspond "
2869 }
2888 }
2898 }
2904 }
2907 error:
2910 }
2912 /* Expand info->tab and info->bmap in the same way "bmap" was expanded
2913 * in isl_basic_map_expand_divs using the expansion "exp" and
2914 * update info->ineq with respect to the redundant constraints
2915 * in the resulting tableau. info->bmap is the original version
2916 * of "bmap", i.e., the one that corresponds to the current
2917 * state of info->tab. The number of constraints in info->bmap
2918 * is assumed to be the same as the number of constraints
2919 * in info->tab. This is required to be able to detect
2920 * the extra constraints in "bmap".
2921 *
2922 * Extract the positions where extra local variables are introduced
2923 * from "exp" and call tab_insert_divs.
2924 */
2927 {
2933 isl_stat r;
2952 }
2954 }
2966 error:
2969 }
2971 /* Check if the union of the basic maps represented by info[i] and info[j]
2972 * can be represented by a single basic map,
2973 * after expanding the divs of info[i] to match those of info[j].
2974 * If so, replace the pair by the single basic map and return
2975 * isl_change_drop_first, isl_change_drop_second or isl_change_fuse.
2976 * Otherwise, return isl_change_none.
2977 *
2978 * The caller has already checked for info[j] being a subset of info[i].
2979 * If some of the divs of info[j] are unknown, then the expanded info[i]
2980 * will not have the corresponding div constraints. The other patterns
2981 * therefore cannot apply. Skip the computation in this case.
2982 *
2983 * The expansion is performed using the divs "div" and expansion "exp"
2984 * computed by the caller.
2985 * info[i].bmap has already been expanded and the result is passed in
2986 * as "bmap".
2987 * The "eq" and "ineq" fields of info[i] reflect the status of
2988 * the constraints of the expanded "bmap" with respect to info[j].tab.
2989 * However, inequality constraints that are redundant in info[i].tab
2990 * have not yet been marked as such because no tableau was available.
2991 *
2992 * Replace info[i].bmap by "bmap" and expand info[i].tab as well,
2993 * updating info[i].ineq with respect to the redundant constraints.
2994 * Then try and coalesce the expanded info[i] with info[j],
2995 * reusing the information in info[i].eq and info[i].ineq.
2996 * If this does not result in any coalescing or if it results in info[j]
2997 * getting dropped (which should not happen in practice, since the case
2998 * of info[j] being a subset of info[i] has already been checked by
2999 * the caller), then revert info[i] to its original state.
3000 */
3004 {
3005 isl_bool known;
3015 }
3025 else
3035 }
3038 }
3040 /* Check if the union of "bmap" and the basic map represented by info[j]
3041 * can be represented by a single basic map,
3042 * after expanding the divs of "bmap" to match those of info[j].
3043 * If so, replace the pair by the single basic map and return
3044 * isl_change_drop_first, isl_change_drop_second or isl_change_fuse.
3045 * Otherwise, return isl_change_none.
3046 *
3047 * In particular, check if the expanded "bmap" contains the basic map
3048 * represented by the tableau info[j].tab.
3049 * The expansion is performed using the divs "div" and expansion "exp"
3050 * computed by the caller.
3051 * Then we check if all constraints of the expanded "bmap" are valid for
3052 * info[j].tab.
3053 *
3054 * If "i" is not equal to -1, then "bmap" is equal to info[i].bmap.
3055 * In this case, the positions of the constraints of info[i].bmap
3056 * with respect to the basic map represented by info[j] are stored
3057 * in info[i].
3058 *
3059 * If the expanded "bmap" does not contain the basic map
3060 * represented by the tableau info[j].tab and if "i" is not -1,
3061 * i.e., if the original "bmap" is info[i].bmap, then expand info[i].tab
3062 * as well and check if that results in coalescing.
3063 */
3067 {
3101 }
3106 done:
3110 error:
3114 }
3116 /* Check if the union of "bmap_i" and the basic map represented by info[j]
3117 * can be represented by a single basic map,
3118 * after aligning the divs of "bmap_i" to match those of info[j].
3119 * If so, replace the pair by the single basic map and return
3120 * isl_change_drop_first, isl_change_drop_second or isl_change_fuse.
3121 * Otherwise, return isl_change_none.
3122 *
3123 * In particular, check if "bmap_i" contains the basic map represented by
3124 * info[j] after aligning the divs of "bmap_i" to those of info[j].
3125 * Note that this can only succeed if the number of divs of "bmap_i"
3126 * is smaller than (or equal to) the number of divs of info[j].
3127 *
3128 * We first check if the divs of "bmap_i" are all known and form a subset
3129 * of those of info[j].bmap. If so, we pass control over to
3130 * coalesce_with_expanded_divs.
3131 *
3132 * If "i" is not equal to -1, then "bmap" is equal to info[i].bmap.
3133 */
3137 {
3138 isl_bool known;
3171 else
3183 error:
3189 }
3191 /* Check if basic map "j" is a subset of basic map "i" after
3192 * exploiting the extra equalities of "j" to simplify the divs of "i".
3193 * If so, remove basic map "j" and return isl_change_drop_second.
3194 *
3195 * If "j" does not have any equalities or if they are the same
3196 * as those of "i", then we cannot exploit them to simplify the divs.
3197 * Similarly, if there are no divs in "i", then they cannot be simplified.
3198 * If, on the other hand, the affine hulls of "i" and "j" do not intersect,
3199 * then "j" cannot be a subset of "i".
3200 *
3201 * Otherwise, we intersect "i" with the affine hull of "j" and then
3202 * check if "j" is a subset of the result after aligning the divs.
3203 * If so, then "j" is definitely a subset of "i" and can be removed.
3204 * Note that if after intersection with the affine hull of "j".
3205 * "i" still has more divs than "j", then there is no way we can
3206 * align the divs of "i" to those of "j".
3207 */
3210 {
3235 }
3245 }
3252 }
3254 /* Check if the union of and the basic maps represented by info[i] and info[j]
3255 * can be represented by a single basic map, by aligning or equating
3256 * their integer divisions.
3257 * If so, replace the pair by the single basic map and return
3258 * isl_change_drop_first, isl_change_drop_second or isl_change_fuse.
3259 * Otherwise, return isl_change_none.
3260 *
3261 * Note that we only perform any test if the number of divs is different
3262 * in the two basic maps. In case the number of divs is the same,
3263 * we have already established that the divs are different
3264 * in the two basic maps.
3265 * In particular, if the number of divs of basic map i is smaller than
3266 * the number of divs of basic map j, then we check if j is a subset of i
3267 * and vice versa.
3268 */
3271 {
3293 }
3295 /* Does "bmap" involve any divs that themselves refer to divs?
3296 */
3298 {
3313 }
3315 /* Return a list of affine expressions, one for each integer division
3316 * in "bmap_i". For each integer division that also appears in "bmap_j",
3317 * the affine expression is set to NaN. The number of NaNs in the list
3318 * is equal to the number of integer divisions in "bmap_j".
3319 * For the other integer divisions of "bmap_i", the corresponding
3320 * element in the list is a purely affine expression equal to the integer
3321 * division in "hull".
3322 * If no such list can be constructed, then the number of elements
3323 * in the returned list is smaller than the number of integer divisions
3324 * in "bmap_i".
3325 */
3329 {
3364 }
3377 }
3380 }
3387 error:
3393 }
3395 /* Add variables to info->bmap and info->tab corresponding to the elements
3396 * in "list" that are not set to NaN.
3397 * "extra_var" is the number of these elements.
3398 * "dim" is the offset in the variables of "tab" where we should
3399 * start considering the elements in "list".
3400 * When this function returns, the total number of variables in "tab"
3401 * is equal to "dim" plus the number of elements in "list".
3402 *
3403 * The newly added existentially quantified variables are not given
3404 * an explicit representation because the corresponding div constraints
3405 * do not appear in info->bmap. These constraints are not added
3406 * to info->bmap because for internal consistency, they would need to
3407 * be added to info->tab as well, where they could combine with the equality
3408 * that is added later to result in constraints that do not hold
3409 * in the original input.
3410 */
3413 {
3446 }
3449 }
3451 /* For each element in "list" that is not set to NaN, fix the corresponding
3452 * variable in "tab" to the purely affine expression defined by the element.
3453 * "dim" is the offset in the variables of "tab" where we should
3454 * start considering the elements in "list".
3455 *
3456 * This function assumes that a sufficient number of rows and
3457 * elements in the constraint array are available in the tableau.
3458 */
3461 {
3482 }
3489 }
3493 error:
3497 }
3499 /* Add variables to info->tab and info->bmap corresponding to the elements
3500 * in "list" that are not set to NaN. The value of the added variable
3501 * in info->tab is fixed to the purely affine expression defined by the element.
3502 * "dim" is the offset in the variables of info->tab where we should
3503 * start considering the elements in "list".
3504 * When this function returns, the total number of variables in info->tab
3505 * is equal to "dim" plus the number of elements in "list".
3506 */
3509 {
3527 }
3529 /* Coalesce basic map "j" into basic map "i" after adding the extra integer
3530 * divisions in "i" but not in "j" to basic map "j", with values
3531 * specified by "list". The total number of elements in "list"
3532 * is equal to the number of integer divisions in "i", while the number
3533 * of NaN elements in the list is equal to the number of integer divisions
3534 * in "j".
3535 *
3536 * If no coalescing can be performed, then we need to revert basic map "j"
3537 * to its original state. We do the same if basic map "i" gets dropped
3538 * during the coalescing, even though this should not happen in practice
3539 * since we have already checked for "j" being a subset of "i"
3540 * before we reach this stage.
3541 */
3544 {
3567 }
3570 error:
3573 }
3575 /* Check if we can coalesce basic map "j" into basic map "i" after copying
3576 * those extra integer divisions in "i" that can be simplified away
3577 * using the extra equalities in "j".
3578 * All divs are assumed to be known and not contain any nested divs.
3579 *
3580 * We first check if there are any extra equalities in "j" that we
3581 * can exploit. Then we check if every integer division in "i"
3582 * either already appears in "j" or can be simplified using the
3583 * extra equalities to a purely affine expression.
3584 * If these tests succeed, then we try to coalesce the two basic maps
3585 * by introducing extra dimensions in "j" corresponding to
3586 * the extra integer divsisions "i" fixed to the corresponding
3587 * purely affine expression.
3588 */
3591 {
3620 }
3627 else
3633 error:
3636 }
3638 /* Check if we can coalesce basic maps "i" and "j" after copying
3639 * those extra integer divisions in one of the basic maps that can
3640 * be simplified away using the extra equalities in the other basic map.
3641 * We require all divs to be known in both basic maps.
3642 * Furthermore, to simplify the comparison of div expressions,
3643 * we do not allow any nested integer divisions.
3644 */
3647 {
3672 }
3674 /* Check if the union of the given pair of basic maps
3675 * can be represented by a single basic map.
3676 * If so, replace the pair by the single basic map and return
3677 * isl_change_drop_first, isl_change_drop_second or isl_change_fuse.
3678 * Otherwise, return isl_change_none.
3679 *
3680 * We first check if the two basic maps live in the same local space,
3681 * after aligning the divs that differ by only an integer constant.
3682 * If so, we do the complete check. Otherwise, we check if they have
3683 * the same number of integer divisions and can be coalesced, if one is
3684 * an obvious subset of the other or if the extra integer divisions
3685 * of one basic map can be simplified away using the extra equalities
3686 * of the other basic map.
3687 *
3688 * Note that trying to coalesce pairs of disjuncts with the same
3689 * number, but different local variables may drop the explicit
3690 * representation of some of these local variables.
3691 * This operation is therefore not performed when
3692 * the "coalesce_preserve_locals" option is set.
3693 */
3696 {
3698 isl_bool same;
3716 }
3723 }
3725 /* Return the maximum of "a" and "b".
3726 */
3728 {
3730 }
3732 /* Pairwise coalesce the basic maps in the range [start1, end1[ of "info"
3733 * with those in the range [start2, end2[, skipping basic maps
3734 * that have been removed (either before or within this function).
3735 *
3736 * For each basic map i in the first range, we check if it can be coalesced
3737 * with respect to any previously considered basic map j in the second range.
3738 * If i gets dropped (because it was a subset of some j), then
3739 * we can move on to the next basic map.
3740 * If j gets dropped, we need to continue checking against the other
3741 * previously considered basic maps.
3742 * If the two basic maps got fused, then we recheck the fused basic map
3743 * against the previously considered basic maps, starting at i + 1
3744 * (even if start2 is greater than i + 1).
3745 */
3748 {
3776 }
3777 }
3778 }
3781 }
3783 /* Pairwise coalesce the basic maps described by the "n" elements of "info".
3784 *
3785 * We consider groups of basic maps that live in the same apparent
3786 * affine hull and we first coalesce within such a group before we
3787 * coalesce the elements in the group with elements of previously
3788 * considered groups. If a fuse happens during the second phase,
3789 * then we also reconsider the elements within the group.
3790 */
3792 {
3799 start--;
3804 }
3807 }
3809 /* Update the basic maps in "map" based on the information in "info".
3810 * In particular, remove the basic maps that have been marked removed and
3811 * update the others based on the information in the corresponding tableau.
3812 * Since we detected implicit equalities without calling
3813 * isl_basic_map_gauss, we need to do it now.
3814 * Also call isl_basic_map_simplify if we may have lost the definition
3815 * of one or more integer divisions.
3816 */
3819 {
3832 }
3847 }
3850 }
3852 /* For each pair of basic maps in the map, check if the union of the two
3853 * can be represented by a single basic map.
3854 * If so, replace the pair by the single basic map and start over.
3855 *
3856 * We factor out any (hidden) common factor from the constraint
3857 * coefficients to improve the detection of adjacent constraints.
3858 *
3859 * Since we are constructing the tableaus of the basic maps anyway,
3860 * we exploit them to detect implicit equalities and redundant constraints.
3861 * This also helps the coalescing as it can ignore the redundant constraints.
3862 * In order to avoid confusion, we make all implicit equalities explicit
3863 * in the basic maps. We don't call isl_basic_map_gauss, though,
3864 * as that may affect the number of constraints.
3865 * This means that we have to call isl_basic_map_gauss at the end
3866 * of the computation (in update_basic_maps) to ensure that
3867 * the basic maps are not left in an unexpected state.
3868 * For each basic map, we also compute the hash of the apparent affine hull
3869 * for use in coalesce.
3870 */
3872 {
3918 }
3931 error:
3935 }
3937 /* For each pair of basic sets in the set, check if the union of the two
3938 * can be represented by a single basic set.
3939 * If so, replace the pair by the single basic set and start over.
3940 */
3942 {
3944 }