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isl_convex_hull.c: add missing assignment
[isl.git] / isl_tab.c
blob6397e2f71910e0ef20b416f8de41cc79ab46b271
1 #include "isl_map_private.h"
2 #include "isl_tab.h"
3
4 /*
5 * The implementation of tableaus in this file was inspired by Section 8
6 * of David Detlefs, Greg Nelson and James B. Saxe, "Simplify: a theorem
7 * prover for program checking".
8 */
9
10 struct isl_tab *isl_tab_alloc(struct isl_ctx *ctx,
11 unsigned n_row, unsigned n_var)
12 {
13 int i;
14 struct isl_tab *tab;
15
16 tab = isl_calloc_type(ctx, struct isl_tab);
17 if (!tab)
18 return NULL;
19 tab->mat = isl_mat_alloc(ctx, n_row, 2 + n_var);
20 if (!tab->mat)
21 goto error;
22 tab->var = isl_alloc_array(ctx, struct isl_tab_var, n_var);
23 if (!tab->var)
24 goto error;
25 tab->con = isl_alloc_array(ctx, struct isl_tab_var, n_row);
26 if (!tab->con)
27 goto error;
28 tab->col_var = isl_alloc_array(ctx, int, n_var);
29 if (!tab->col_var)
30 goto error;
31 tab->row_var = isl_alloc_array(ctx, int, n_row);
32 if (!tab->row_var)
33 goto error;
34 for (i = 0; i < n_var; ++i) {
35 tab->var[i].index = i;
36 tab->var[i].is_row = 0;
37 tab->var[i].is_nonneg = 0;
38 tab->var[i].is_zero = 0;
39 tab->var[i].is_redundant = 0;
40 tab->var[i].frozen = 0;
41 tab->col_var[i] = i;
42 }
43 tab->n_row = 0;
44 tab->n_con = 0;
45 tab->n_eq = 0;
46 tab->max_con = n_row;
47 tab->n_col = n_var;
48 tab->n_var = n_var;
49 tab->n_dead = 0;
50 tab->n_redundant = 0;
51 tab->need_undo = 0;
52 tab->rational = 0;
53 tab->empty = 0;
54 tab->bottom.type = isl_tab_undo_bottom;
55 tab->bottom.next = NULL;
56 tab->top = &tab->bottom;
57 return tab;
58 error:
59 isl_tab_free(ctx, tab);
60 return NULL;
61 }
62
63 static int extend_cons(struct isl_ctx *ctx, struct isl_tab *tab, unsigned n_new)
64 {
65 if (tab->max_con < tab->n_con + n_new) {
66 struct isl_tab_var *con;
67
68 con = isl_realloc_array(ctx, tab->con,
69 struct isl_tab_var, tab->max_con + n_new);
70 if (!con)
71 return -1;
72 tab->con = con;
73 tab->max_con += n_new;
74 }
75 if (tab->mat->n_row < tab->n_row + n_new) {
76 int *row_var;
77
78 tab->mat = isl_mat_extend(ctx, tab->mat,
79 tab->n_row + n_new, tab->n_col);
80 if (!tab->mat)
81 return -1;
82 row_var = isl_realloc_array(ctx, tab->row_var,
83 int, tab->mat->n_row);
84 if (!row_var)
85 return -1;
86 tab->row_var = row_var;
87 }
88 return 0;
89 }
90
91 struct isl_tab *isl_tab_extend(struct isl_ctx *ctx, struct isl_tab *tab,
92 unsigned n_new)
93 {
94 if (extend_cons(ctx, tab, n_new) >= 0)
95 return tab;
96
97 isl_tab_free(ctx, tab);
98 return NULL;
99 }
100
101 static void free_undo(struct isl_ctx *ctx, struct isl_tab *tab)
102 {
103 struct isl_tab_undo *undo, *next;
104
105 for (undo = tab->top; undo && undo != &tab->bottom; undo = next) {
106 next = undo->next;
107 free(undo);
108 }
109 tab->top = undo;
110 }
111
112 void isl_tab_free(struct isl_ctx *ctx, struct isl_tab *tab)
113 {
114 if (!tab)
115 return;
116 free_undo(ctx, tab);
117 isl_mat_free(ctx, tab->mat);
118 free(tab->var);
119 free(tab->con);
120 free(tab->row_var);
121 free(tab->col_var);
122 free(tab);
123 }
124
125 static struct isl_tab_var *var_from_index(struct isl_ctx *ctx,
126 struct isl_tab *tab, int i)
127 {
128 if (i >= 0)
129 return &tab->var[i];
130 else
131 return &tab->con[~i];
132 }
133
134 static struct isl_tab_var *var_from_row(struct isl_ctx *ctx,
135 struct isl_tab *tab, int i)
136 {
137 return var_from_index(ctx, tab, tab->row_var[i]);
138 }
139
140 static struct isl_tab_var *var_from_col(struct isl_ctx *ctx,
141 struct isl_tab *tab, int i)
142 {
143 return var_from_index(ctx, tab, tab->col_var[i]);
144 }
145
146 /* Check if there are any upper bounds on column variable "var",
147 * i.e., non-negative rows where var appears with a negative coefficient.
148 * Return 1 if there are no such bounds.
149 */
150 static int max_is_manifestly_unbounded(struct isl_ctx *ctx,
151 struct isl_tab *tab, struct isl_tab_var *var)
152 {
153 int i;
154
155 if (var->is_row)
156 return 0;
157 for (i = tab->n_redundant; i < tab->n_row; ++i) {
158 if (!isl_int_is_neg(tab->mat->row[i][2 + var->index]))
159 continue;
160 if (var_from_row(ctx, tab, i)->is_nonneg)
161 return 0;
162 }
163 return 1;
164 }
165
166 /* Check if there are any lower bounds on column variable "var",
167 * i.e., non-negative rows where var appears with a positive coefficient.
168 * Return 1 if there are no such bounds.
169 */
170 static int min_is_manifestly_unbounded(struct isl_ctx *ctx,
171 struct isl_tab *tab, struct isl_tab_var *var)
172 {
173 int i;
174
175 if (var->is_row)
176 return 0;
177 for (i = tab->n_redundant; i < tab->n_row; ++i) {
178 if (!isl_int_is_pos(tab->mat->row[i][2 + var->index]))
179 continue;
180 if (var_from_row(ctx, tab, i)->is_nonneg)
181 return 0;
182 }
183 return 1;
184 }
185
186 /* Given the index of a column "c", return the index of a row
187 * that can be used to pivot the column in, with either an increase
188 * (sgn > 0) or a decrease (sgn < 0) of the corresponding variable.
189 * If "var" is not NULL, then the row returned will be different from
190 * the one associated with "var".
191 *
192 * Each row in the tableau is of the form
193 *
194 * x_r = a_r0 + \sum_i a_ri x_i
195 *
196 * Only rows with x_r >= 0 and with the sign of a_ri opposite to "sgn"
197 * impose any limit on the increase or decrease in the value of x_c
198 * and this bound is equal to a_r0 / |a_rc|. We are therefore looking
199 * for the row with the smallest (most stringent) such bound.
200 * Note that the common denominator of each row drops out of the fraction.
201 * To check if row j has a smaller bound than row r, i.e.,
202 * a_j0 / |a_jc| < a_r0 / |a_rc| or a_j0 |a_rc| < a_r0 |a_jc|,
203 * we check if -sign(a_jc) (a_j0 a_rc - a_r0 a_jc) < 0,
204 * where -sign(a_jc) is equal to "sgn".
205 */
206 static int pivot_row(struct isl_ctx *ctx, struct isl_tab *tab,
207 struct isl_tab_var *var, int sgn, int c)
208 {
209 int j, r, tsgn;
210 isl_int t;
211
212 isl_int_init(t);
213 r = -1;
214 for (j = tab->n_redundant; j < tab->n_row; ++j) {
215 if (var && j == var->index)
216 continue;
217 if (!var_from_row(ctx, tab, j)->is_nonneg)
218 continue;
219 if (sgn * isl_int_sgn(tab->mat->row[j][2 + c]) >= 0)
220 continue;
221 if (r < 0) {
222 r = j;
223 continue;
224 }
225 isl_int_mul(t, tab->mat->row[r][1], tab->mat->row[j][2 + c]);
226 isl_int_submul(t, tab->mat->row[j][1], tab->mat->row[r][2 + c]);
227 tsgn = sgn * isl_int_sgn(t);
228 if (tsgn < 0 || (tsgn == 0 &&
229 tab->row_var[j] < tab->row_var[r]))
230 r = j;
231 }
232 isl_int_clear(t);
233 return r;
234 }
235
236 /* Find a pivot (row and col) that will increase (sgn > 0) or decrease
237 * (sgn < 0) the value of row variable var.
238 * As the given row in the tableau is of the form
239 *
240 * x_r = a_r0 + \sum_i a_ri x_i
241 *
242 * we need to find a column such that the sign of a_ri is equal to "sgn"
243 * (such that an increase in x_i will have the desired effect) or a
244 * column with a variable that may attain negative values.
245 * If a_ri is positive, then we need to move x_i in the same direction
246 * to obtain the desired effect. Otherwise, x_i has to move in the
247 * opposite direction.
248 */
249 static void find_pivot(struct isl_ctx *ctx, struct isl_tab *tab,
250 struct isl_tab_var *var, int sgn, int *row, int *col)
251 {
252 int j, r, c;
253 isl_int *tr;
254
255 *row = *col = -1;
256
257 isl_assert(ctx, var->is_row, return);
258 tr = tab->mat->row[var->index];
259
260 c = -1;
261 for (j = tab->n_dead; j < tab->n_col; ++j) {
262 if (isl_int_is_zero(tr[2 + j]))
263 continue;
264 if (isl_int_sgn(tr[2 + j]) != sgn &&
265 var_from_col(ctx, tab, j)->is_nonneg)
266 continue;
267 if (c < 0 || tab->col_var[j] < tab->col_var[c])
268 c = j;
269 }
270 if (c < 0)
271 return;
272
273 sgn *= isl_int_sgn(tr[2 + c]);
274 r = pivot_row(ctx, tab, var, sgn, c);
275 *row = r < 0 ? var->index : r;
276 *col = c;
277 }
278
279 /* Return 1 if row "row" represents an obviously redundant inequality.
280 * This means
281 * - it represents an inequality or a variable
282 * - that is the sum of a non-negative sample value and a positive
283 * combination of zero or more non-negative variables.
284 */
285 static int is_redundant(struct isl_ctx *ctx, struct isl_tab *tab, int row)
286 {
287 int i;
288
289 if (tab->row_var[row] < 0 && !var_from_row(ctx, tab, row)->is_nonneg)
290 return 0;
291
292 if (isl_int_is_neg(tab->mat->row[row][1]))
293 return 0;
294
295 for (i = tab->n_dead; i < tab->n_col; ++i) {
296 if (isl_int_is_zero(tab->mat->row[row][2 + i]))
297 continue;
298 if (isl_int_is_neg(tab->mat->row[row][2 + i]))
299 return 0;
300 if (!var_from_col(ctx, tab, i)->is_nonneg)
301 return 0;
302 }
303 return 1;
304 }
305
306 static void swap_rows(struct isl_ctx *ctx,
307 struct isl_tab *tab, int row1, int row2)
308 {
309 int t;
310 t = tab->row_var[row1];
311 tab->row_var[row1] = tab->row_var[row2];
312 tab->row_var[row2] = t;
313 var_from_row(ctx, tab, row1)->index = row1;
314 var_from_row(ctx, tab, row2)->index = row2;
315 tab->mat = isl_mat_swap_rows(ctx, tab->mat, row1, row2);
316 }
317
318 static void push(struct isl_ctx *ctx, struct isl_tab *tab,
319 enum isl_tab_undo_type type, struct isl_tab_var *var)
320 {
321 struct isl_tab_undo *undo;
322
323 if (!tab->need_undo)
324 return;
325
326 undo = isl_alloc_type(ctx, struct isl_tab_undo);
327 if (!undo) {
328 free_undo(ctx, tab);
329 tab->top = NULL;
330 return;
331 }
332 undo->type = type;
333 undo->var = var;
334 undo->next = tab->top;
335 tab->top = undo;
336 }
337
338 /* Mark row with index "row" as being redundant.
339 * If we may need to undo the operation or if the row represents
340 * a variable of the original problem, the row is kept,
341 * but no longer considered when looking for a pivot row.
342 * Otherwise, the row is simply removed.
343 *
344 * The row may be interchanged with some other row. If it
345 * is interchanged with a later row, return 1. Otherwise return 0.
346 * If the rows are checked in order in the calling function,
347 * then a return value of 1 means that the row with the given
348 * row number may now contain a different row that hasn't been checked yet.
349 */
350 static int mark_redundant(struct isl_ctx *ctx,
351 struct isl_tab *tab, int row)
352 {
353 struct isl_tab_var *var = var_from_row(ctx, tab, row);
354 var->is_redundant = 1;
355 isl_assert(ctx, row >= tab->n_redundant, return);
356 if (tab->need_undo || tab->row_var[row] >= 0) {
357 if (tab->row_var[row] >= 0) {
358 var->is_nonneg = 1;
359 push(ctx, tab, isl_tab_undo_nonneg, var);
360 }
361 if (row != tab->n_redundant)
362 swap_rows(ctx, tab, row, tab->n_redundant);
363 push(ctx, tab, isl_tab_undo_redundant, var);
364 tab->n_redundant++;
365 return 0;
366 } else {
367 if (row != tab->n_row - 1)
368 swap_rows(ctx, tab, row, tab->n_row - 1);
369 var_from_row(ctx, tab, tab->n_row - 1)->index = -1;
370 tab->n_row--;
371 return 1;
372 }
373 }
374
375 static void mark_empty(struct isl_ctx *ctx, struct isl_tab *tab)
376 {
377 if (!tab->empty && tab->need_undo)
378 push(ctx, tab, isl_tab_undo_empty, NULL);
379 tab->empty = 1;
380 }
381
382 /* Given a row number "row" and a column number "col", pivot the tableau
383 * such that the associated variable are interchanged.
384 * The given row in the tableau expresses
385 *
386 * x_r = a_r0 + \sum_i a_ri x_i
387 *
388 * or
389 *
390 * x_c = 1/a_rc x_r - a_r0/a_rc + sum_{i \ne r} -a_ri/a_rc
391 *
392 * Substituting this equality into the other rows
393 *
394 * x_j = a_j0 + \sum_i a_ji x_i
395 *
396 * with a_jc \ne 0, we obtain
397 *
398 * x_j = a_jc/a_rc x_r + a_j0 - a_jc a_r0/a_rc + sum a_ji - a_jc a_ri/a_rc
399 *
400 * The tableau
401 *
402 * n_rc/d_r n_ri/d_r
403 * n_jc/d_j n_ji/d_j
404 *
405 * where i is any other column and j is any other row,
406 * is therefore transformed into
407 *
408 * s(n_rc)d_r/|n_rc| -s(n_rc)n_ri/|n_rc|
409 * s(n_rc)d_r n_jc/(|n_rc| d_j) (n_ji |n_rc| - s(n_rc)n_jc n_ri)/(|n_rc| d_j)
410 *
411 * The transformation is performed along the following steps
412 *
413 * d_r/n_rc n_ri/n_rc
414 * n_jc/d_j n_ji/d_j
415 *
416 * s(n_rc)d_r/|n_rc| -s(n_rc)n_ri/|n_rc|
417 * n_jc/d_j n_ji/d_j
418 *
419 * s(n_rc)d_r/|n_rc| -s(n_rc)n_ri/|n_rc|
420 * n_jc/(|n_rc| d_j) n_ji/(|n_rc| d_j)
421 *
422 * s(n_rc)d_r/|n_rc| -s(n_rc)n_ri/|n_rc|
423 * n_jc/(|n_rc| d_j) (n_ji |n_rc|)/(|n_rc| d_j)
424 *
425 * s(n_rc)d_r/|n_rc| -s(n_rc)n_ri/|n_rc|
426 * n_jc/(|n_rc| d_j) (n_ji |n_rc| - s(n_rc)n_jc n_ri)/(|n_rc| d_j)
427 *
428 * s(n_rc)d_r/|n_rc| -s(n_rc)n_ri/|n_rc|
429 * s(n_rc)d_r n_jc/(|n_rc| d_j) (n_ji |n_rc| - s(n_rc)n_jc n_ri)/(|n_rc| d_j)
430 *
431 */
432 static void pivot(struct isl_ctx *ctx,
433 struct isl_tab *tab, int row, int col)
434 {
435 int i, j;
436 int sgn;
437 int t;
438 struct isl_mat *mat = tab->mat;
439 struct isl_tab_var *var;
440
441 isl_int_swap(mat->row[row][0], mat->row[row][2 + col]);
442 sgn = isl_int_sgn(mat->row[row][0]);
443 if (sgn < 0) {
444 isl_int_neg(mat->row[row][0], mat->row[row][0]);
445 isl_int_neg(mat->row[row][2 + col], mat->row[row][2 + col]);
446 } else
447 for (j = 0; j < 1 + tab->n_col; ++j) {
448 if (j == 1 + col)
449 continue;
450 isl_int_neg(mat->row[row][1 + j], mat->row[row][1 + j]);
451 }
452 if (!isl_int_is_one(mat->row[row][0]))
453 isl_seq_normalize(mat->row[row], 2 + tab->n_col);
454 for (i = 0; i < tab->n_row; ++i) {
455 if (i == row)
456 continue;
457 if (isl_int_is_zero(mat->row[i][2 + col]))
458 continue;
459 isl_int_mul(mat->row[i][0], mat->row[i][0], mat->row[row][0]);
460 for (j = 0; j < 1 + tab->n_col; ++j) {
461 if (j == 1 + col)
462 continue;
463 isl_int_mul(mat->row[i][1 + j],
464 mat->row[i][1 + j], mat->row[row][0]);
465 isl_int_addmul(mat->row[i][1 + j],
466 mat->row[i][2 + col], mat->row[row][1 + j]);
467 }
468 isl_int_mul(mat->row[i][2 + col],
469 mat->row[i][2 + col], mat->row[row][2 + col]);
470 if (!isl_int_is_one(mat->row[row][0]))
471 isl_seq_normalize(mat->row[i], 2 + tab->n_col);
472 }
473 t = tab->row_var[row];
474 tab->row_var[row] = tab->col_var[col];
475 tab->col_var[col] = t;
476 var = var_from_row(ctx, tab, row);
477 var->is_row = 1;
478 var->index = row;
479 var = var_from_col(ctx, tab, col);
480 var->is_row = 0;
481 var->index = col;
482 for (i = tab->n_redundant; i < tab->n_row; ++i) {
483 if (isl_int_is_zero(mat->row[i][2 + col]))
484 continue;
485 if (!var_from_row(ctx, tab, i)->frozen &&
486 is_redundant(ctx, tab, i))
487 if (mark_redundant(ctx, tab, i))
488 --i;
489 }
490 }
491
492 /* If "var" represents a column variable, then pivot is up (sgn > 0)
493 * or down (sgn < 0) to a row. The variable is assumed not to be
494 * unbounded in the specified direction.
495 */
496 static void to_row(struct isl_ctx *ctx,
497 struct isl_tab *tab, struct isl_tab_var *var, int sign)
498 {
499 int r;
500
501 if (var->is_row)
502 return;
503
504 r = pivot_row(ctx, tab, NULL, sign, var->index);
505 isl_assert(ctx, r >= 0, return);
506 pivot(ctx, tab, r, var->index);
507 }
508
509 static void check_table(struct isl_ctx *ctx, struct isl_tab *tab)
510 {
511 int i;
512
513 if (tab->empty)
514 return;
515 for (i = 0; i < tab->n_row; ++i) {
516 if (!var_from_row(ctx, tab, i)->is_nonneg)
517 continue;
518 assert(!isl_int_is_neg(tab->mat->row[i][1]));
519 }
520 }
521
522 /* Return the sign of the maximal value of "var".
523 * If the sign is not negative, then on return from this function,
524 * the sample value will also be non-negative.
525 *
526 * If "var" is manifestly unbounded wrt positive values, we are done.
527 * Otherwise, we pivot the variable up to a row if needed
528 * Then we continue pivoting down until either
529 * - no more down pivots can be performed
530 * - the sample value is positive
531 * - the variable is pivoted into a manifestly unbounded column
532 */
533 static int sign_of_max(struct isl_ctx *ctx,
534 struct isl_tab *tab, struct isl_tab_var *var)
535 {
536 int row, col;
537
538 if (max_is_manifestly_unbounded(ctx, tab, var))
539 return 1;
540 to_row(ctx, tab, var, 1);
541 while (!isl_int_is_pos(tab->mat->row[var->index][1])) {
542 find_pivot(ctx, tab, var, 1, &row, &col);
543 if (row == -1)
544 return isl_int_sgn(tab->mat->row[var->index][1]);
545 pivot(ctx, tab, row, col);
546 if (!var->is_row) /* manifestly unbounded */
547 return 1;
548 }
549 return 1;
550 }
551
552 /* Perform pivots until the row variable "var" has a non-negative
553 * sample value or until no more upward pivots can be performed.
554 * Return the sign of the sample value after the pivots have been
555 * performed.
556 */
557 static int restore_row(struct isl_ctx *ctx,
558 struct isl_tab *tab, struct isl_tab_var *var)
559 {
560 int row, col;
561
562 while (isl_int_is_neg(tab->mat->row[var->index][1])) {
563 find_pivot(ctx, tab, var, 1, &row, &col);
564 if (row == -1)
565 break;
566 pivot(ctx, tab, row, col);
567 if (!var->is_row) /* manifestly unbounded */
568 return 1;
569 }
570 return isl_int_sgn(tab->mat->row[var->index][1]);
571 }
572
573 /* Perform pivots until we are sure that the row variable "var"
574 * can attain non-negative values. After return from this
575 * function, "var" is still a row variable, but its sample
576 * value may not be non-negative, even if the function returns 1.
577 */
578 static int at_least_zero(struct isl_ctx *ctx,
579 struct isl_tab *tab, struct isl_tab_var *var)
580 {
581 int row, col;
582
583 while (isl_int_is_neg(tab->mat->row[var->index][1])) {
584 find_pivot(ctx, tab, var, 1, &row, &col);
585 if (row == -1)
586 break;
587 if (row == var->index) /* manifestly unbounded */
588 return 1;
589 pivot(ctx, tab, row, col);
590 }
591 return !isl_int_is_neg(tab->mat->row[var->index][1]);
592 }
593
594 /* Return a negative value if "var" can attain negative values.
595 * Return a non-negative value otherwise.
596 *
597 * If "var" is manifestly unbounded wrt negative values, we are done.
598 * Otherwise, if var is in a column, we can pivot it down to a row.
599 * Then we continue pivoting down until either
600 * - the pivot would result in a manifestly unbounded column
601 * => we don't perform the pivot, but simply return -1
602 * - no more down pivots can be performed
603 * - the sample value is negative
604 * If the sample value becomes negative and the variable is supposed
605 * to be nonnegative, then we undo the last pivot.
606 * However, if the last pivot has made the pivoting variable
607 * obviously redundant, then it may have moved to another row.
608 * In that case we look for upward pivots until we reach a non-negative
609 * value again.
610 */
611 static int sign_of_min(struct isl_ctx *ctx,
612 struct isl_tab *tab, struct isl_tab_var *var)
613 {
614 int row, col;
615 struct isl_tab_var *pivot_var;
616
617 if (min_is_manifestly_unbounded(ctx, tab, var))
618 return -1;
619 if (!var->is_row) {
620 col = var->index;
621 row = pivot_row(ctx, tab, NULL, -1, col);
622 pivot_var = var_from_col(ctx, tab, col);
623 pivot(ctx, tab, row, col);
624 if (var->is_redundant)
625 return 0;
626 if (isl_int_is_neg(tab->mat->row[var->index][1])) {
627 if (var->is_nonneg) {
628 if (!pivot_var->is_redundant &&
629 pivot_var->index == row)
630 pivot(ctx, tab, row, col);
631 else
632 restore_row(ctx, tab, var);
633 }
634 return -1;
635 }
636 }
637 if (var->is_redundant)
638 return 0;
639 while (!isl_int_is_neg(tab->mat->row[var->index][1])) {
640 find_pivot(ctx, tab, var, -1, &row, &col);
641 if (row == var->index)
642 return -1;
643 if (row == -1)
644 return isl_int_sgn(tab->mat->row[var->index][1]);
645 pivot_var = var_from_col(ctx, tab, col);
646 pivot(ctx, tab, row, col);
647 if (var->is_redundant)
648 return 0;
649 }
650 if (var->is_nonneg) {
651 /* pivot back to non-negative value */
652 if (!pivot_var->is_redundant && pivot_var->index == row)
653 pivot(ctx, tab, row, col);
654 else
655 restore_row(ctx, tab, var);
656 }
657 return -1;
658 }
659
660 /* Return 1 if "var" can attain values <= -1.
661 * Return 0 otherwise.
662 *
663 * The sample value of "var" is assumed to be non-negative when the
664 * the function is called and will be made non-negative again before
665 * the function returns.
666 */
667 static int min_at_most_neg_one(struct isl_ctx *ctx,
668 struct isl_tab *tab, struct isl_tab_var *var)
669 {
670 int row, col;
671 struct isl_tab_var *pivot_var;
672
673 if (min_is_manifestly_unbounded(ctx, tab, var))
674 return 1;
675 if (!var->is_row) {
676 col = var->index;
677 row = pivot_row(ctx, tab, NULL, -1, col);
678 pivot_var = var_from_col(ctx, tab, col);
679 pivot(ctx, tab, row, col);
680 if (var->is_redundant)
681 return 0;
682 if (isl_int_is_neg(tab->mat->row[var->index][1]) &&
683 isl_int_abs_ge(tab->mat->row[var->index][1],
684 tab->mat->row[var->index][0])) {
685 if (var->is_nonneg) {
686 if (!pivot_var->is_redundant &&
687 pivot_var->index == row)
688 pivot(ctx, tab, row, col);
689 else
690 restore_row(ctx, tab, var);
691 }
692 return 1;
693 }
694 }
695 if (var->is_redundant)
696 return 0;
697 do {
698 find_pivot(ctx, tab, var, -1, &row, &col);
699 if (row == var->index)
700 return 1;
701 if (row == -1)
702 return 0;
703 pivot_var = var_from_col(ctx, tab, col);
704 pivot(ctx, tab, row, col);
705 if (var->is_redundant)
706 return 0;
707 } while (!isl_int_is_neg(tab->mat->row[var->index][1]) ||
708 isl_int_abs_lt(tab->mat->row[var->index][1],
709 tab->mat->row[var->index][0]));
710 if (var->is_nonneg) {
711 /* pivot back to non-negative value */
712 if (!pivot_var->is_redundant && pivot_var->index == row)
713 pivot(ctx, tab, row, col);
714 restore_row(ctx, tab, var);
715 }
716 return 1;
717 }
718
719 /* Return 1 if "var" can attain values >= 1.
720 * Return 0 otherwise.
721 */
722 static int at_least_one(struct isl_ctx *ctx,
723 struct isl_tab *tab, struct isl_tab_var *var)
724 {
725 int row, col;
726 isl_int *r;
727
728 if (max_is_manifestly_unbounded(ctx, tab, var))
729 return 1;
730 to_row(ctx, tab, var, 1);
731 r = tab->mat->row[var->index];
732 while (isl_int_lt(r[1], r[0])) {
733 find_pivot(ctx, tab, var, 1, &row, &col);
734 if (row == -1)
735 return isl_int_ge(r[1], r[0]);
736 if (row == var->index) /* manifestly unbounded */
737 return 1;
738 pivot(ctx, tab, row, col);
739 }
740 return 1;
741 }
742
743 static void swap_cols(struct isl_ctx *ctx,
744 struct isl_tab *tab, int col1, int col2)
745 {
746 int t;
747 t = tab->col_var[col1];
748 tab->col_var[col1] = tab->col_var[col2];
749 tab->col_var[col2] = t;
750 var_from_col(ctx, tab, col1)->index = col1;
751 var_from_col(ctx, tab, col2)->index = col2;
752 tab->mat = isl_mat_swap_cols(ctx, tab->mat, 2 + col1, 2 + col2);
753 }
754
755 /* Mark column with index "col" as representing a zero variable.
756 * If we may need to undo the operation the column is kept,
757 * but no longer considered.
758 * Otherwise, the column is simply removed.
759 *
760 * The column may be interchanged with some other column. If it
761 * is interchanged with a later column, return 1. Otherwise return 0.
762 * If the columns are checked in order in the calling function,
763 * then a return value of 1 means that the column with the given
764 * column number may now contain a different column that
765 * hasn't been checked yet.
766 */
767 static int kill_col(struct isl_ctx *ctx,
768 struct isl_tab *tab, int col)
769 {
770 var_from_col(ctx, tab, col)->is_zero = 1;
771 if (tab->need_undo) {
772 push(ctx, tab, isl_tab_undo_zero, var_from_col(ctx, tab, col));
773 if (col != tab->n_dead)
774 swap_cols(ctx, tab, col, tab->n_dead);
775 tab->n_dead++;
776 return 0;
777 } else {
778 if (col != tab->n_col - 1)
779 swap_cols(ctx, tab, col, tab->n_col - 1);
780 var_from_col(ctx, tab, tab->n_col - 1)->index = -1;
781 tab->n_col--;
782 return 1;
783 }
784 }
785
786 /* Row variable "var" is non-negative and cannot attain any values
787 * larger than zero. This means that the coefficients of the unrestricted
788 * column variables are zero and that the coefficients of the non-negative
789 * column variables are zero or negative.
790 * Each of the non-negative variables with a negative coefficient can
791 * then also be written as the negative sum of non-negative variables
792 * and must therefore also be zero.
793 */
794 static void close_row(struct isl_ctx *ctx,
795 struct isl_tab *tab, struct isl_tab_var *var)
796 {
797 int j;
798 struct isl_mat *mat = tab->mat;
799
800 isl_assert(ctx, var->is_nonneg, return);
801 var->is_zero = 1;
802 for (j = tab->n_dead; j < tab->n_col; ++j) {
803 if (isl_int_is_zero(mat->row[var->index][2 + j]))
804 continue;
805 isl_assert(ctx, isl_int_is_neg(mat->row[var->index][2 + j]),
806 return);
807 if (kill_col(ctx, tab, j))
808 --j;
809 }
810 mark_redundant(ctx, tab, var->index);
811 }
812
813 /* Add a row to the tableau. The row is given as an affine combination
814 * of the original variables and needs to be expressed in terms of the
815 * column variables.
816 *
817 * We add each term in turn.
818 * If r = n/d_r is the current sum and we need to add k x, then
819 * if x is a column variable, we increase the numerator of
820 * this column by k d_r
821 * if x = f/d_x is a row variable, then the new representation of r is
822 *
823 * n k f d_x/g n + d_r/g k f m/d_r n + m/d_g k f
824 * --- + --- = ------------------- = -------------------
825 * d_r d_r d_r d_x/g m
826 *
827 * with g the gcd of d_r and d_x and m the lcm of d_r and d_x.
828 */
829 static int add_row(struct isl_ctx *ctx, struct isl_tab *tab, isl_int *line)
830 {
831 int i;
832 unsigned r;
833 isl_int *row;
834 isl_int a, b;
835
836 isl_assert(ctx, tab->n_row < tab->mat->n_row, return -1);
837
838 isl_int_init(a);
839 isl_int_init(b);
840 r = tab->n_con;
841 tab->con[r].index = tab->n_row;
842 tab->con[r].is_row = 1;
843 tab->con[r].is_nonneg = 0;
844 tab->con[r].is_zero = 0;
845 tab->con[r].is_redundant = 0;
846 tab->con[r].frozen = 0;
847 tab->row_var[tab->n_row] = ~r;
848 row = tab->mat->row[tab->n_row];
849 isl_int_set_si(row[0], 1);
850 isl_int_set(row[1], line[0]);
851 isl_seq_clr(row + 2, tab->n_col);
852 for (i = 0; i < tab->n_var; ++i) {
853 if (tab->var[i].is_zero)
854 continue;
855 if (tab->var[i].is_row) {
856 isl_int_lcm(a,
857 row[0], tab->mat->row[tab->var[i].index][0]);
858 isl_int_swap(a, row[0]);
859 isl_int_divexact(a, row[0], a);
860 isl_int_divexact(b,
861 row[0], tab->mat->row[tab->var[i].index][0]);
862 isl_int_mul(b, b, line[1 + i]);
863 isl_seq_combine(row + 1, a, row + 1,
864 b, tab->mat->row[tab->var[i].index] + 1,
865 1 + tab->n_col);
866 } else
867 isl_int_addmul(row[2 + tab->var[i].index],
868 line[1 + i], row[0]);
869 }
870 isl_seq_normalize(row, 2 + tab->n_col);
871 tab->n_row++;
872 tab->n_con++;
873 push(ctx, tab, isl_tab_undo_allocate, &tab->con[r]);
874 isl_int_clear(a);
875 isl_int_clear(b);
876
877 return r;
878 }
879
880 static int drop_row(struct isl_ctx *ctx, struct isl_tab *tab, int row)
881 {
882 isl_assert(ctx, ~tab->row_var[row] == tab->n_con - 1, return -1);
883 if (row != tab->n_row - 1)
884 swap_rows(ctx, tab, row, tab->n_row - 1);
885 tab->n_row--;
886 tab->n_con--;
887 return 0;
888 }
889
890 /* Add inequality "ineq" and check if it conflicts with the
891 * previously added constraints or if it is obviously redundant.
892 */
893 struct isl_tab *isl_tab_add_ineq(struct isl_ctx *ctx,
894 struct isl_tab *tab, isl_int *ineq)
895 {
896 int r;
897 int sgn;
898
899 if (!tab)
900 return NULL;
901 r = add_row(ctx, tab, ineq);
902 if (r < 0)
903 goto error;
904 tab->con[r].is_nonneg = 1;
905 push(ctx, tab, isl_tab_undo_nonneg, &tab->con[r]);
906 if (is_redundant(ctx, tab, tab->con[r].index)) {
907 mark_redundant(ctx, tab, tab->con[r].index);
908 return tab;
909 }
910
911 sgn = restore_row(ctx, tab, &tab->con[r]);
912 if (sgn < 0)
913 mark_empty(ctx, tab);
914 else if (tab->con[r].is_row &&
915 is_redundant(ctx, tab, tab->con[r].index))
916 mark_redundant(ctx, tab, tab->con[r].index);
917 return tab;
918 error:
919 isl_tab_free(ctx, tab);
920 return NULL;
921 }
922
923 /* We assume Gaussian elimination has been performed on the equalities.
924 * The equalities can therefore never conflict.
925 * Adding the equalities is currently only really useful for a later call
926 * to isl_tab_ineq_type.
927 */
928 static struct isl_tab *add_eq(struct isl_ctx *ctx,
929 struct isl_tab *tab, isl_int *eq)
930 {
931 int i;
932 int r;
933
934 if (!tab)
935 return NULL;
936 r = add_row(ctx, tab, eq);
937 if (r < 0)
938 goto error;
939
940 r = tab->con[r].index;
941 for (i = tab->n_dead; i < tab->n_col; ++i) {
942 if (isl_int_is_zero(tab->mat->row[r][2 + i]))
943 continue;
944 pivot(ctx, tab, r, i);
945 kill_col(ctx, tab, i);
946 break;
947 }
948 tab->n_eq++;
949
950 return tab;
951 error:
952 isl_tab_free(ctx, tab);
953 return NULL;
954 }
955
956 struct isl_tab *isl_tab_from_basic_map(struct isl_basic_map *bmap)
957 {
958 int i;
959 struct isl_tab *tab;
960
961 if (!bmap)
962 return NULL;
963 tab = isl_tab_alloc(bmap->ctx,
964 isl_basic_map_total_dim(bmap) + bmap->n_ineq + 1,
965 isl_basic_map_total_dim(bmap));
966 if (!tab)
967 return NULL;
968 tab->rational = ISL_F_ISSET(bmap, ISL_BASIC_MAP_RATIONAL);
969 if (ISL_F_ISSET(bmap, ISL_BASIC_MAP_EMPTY)) {
970 mark_empty(bmap->ctx, tab);
971 return tab;
972 }
973 for (i = 0; i < bmap->n_eq; ++i) {
974 tab = add_eq(bmap->ctx, tab, bmap->eq[i]);
975 if (!tab)
976 return tab;
977 }
978 for (i = 0; i < bmap->n_ineq; ++i) {
979 tab = isl_tab_add_ineq(bmap->ctx, tab, bmap->ineq[i]);
980 if (!tab || tab->empty)
981 return tab;
982 }
983 return tab;
984 }
985
986 struct isl_tab *isl_tab_from_basic_set(struct isl_basic_set *bset)
987 {
988 return isl_tab_from_basic_map((struct isl_basic_map *)bset);
989 }
990
991 /* Construct a tableau corresponding to the recession cone of "bmap".
992 */
993 struct isl_tab *isl_tab_from_recession_cone(struct isl_basic_map *bmap)
994 {
995 isl_int cst;
996 int i;
997 struct isl_tab *tab;
998
999 if (!bmap)
1000 return NULL;
1001 tab = isl_tab_alloc(bmap->ctx, bmap->n_eq + bmap->n_ineq,
1002 isl_basic_map_total_dim(bmap));
1003 if (!tab)
1004 return NULL;
1005 tab->rational = ISL_F_ISSET(bmap, ISL_BASIC_MAP_RATIONAL);
1006
1007 isl_int_init(cst);
1008 for (i = 0; i < bmap->n_eq; ++i) {
1009 isl_int_swap(bmap->eq[i][0], cst);
1010 tab = add_eq(bmap->ctx, tab, bmap->eq[i]);
1011 isl_int_swap(bmap->eq[i][0], cst);
1012 if (!tab)
1013 goto done;
1014 }
1015 for (i = 0; i < bmap->n_ineq; ++i) {
1016 int r;
1017 isl_int_swap(bmap->ineq[i][0], cst);
1018 r = add_row(bmap->ctx, tab, bmap->ineq[i]);
1019 isl_int_swap(bmap->ineq[i][0], cst);
1020 if (r < 0)
1021 goto error;
1022 tab->con[r].is_nonneg = 1;
1023 push(bmap->ctx, tab, isl_tab_undo_nonneg, &tab->con[r]);
1024 }
1025 done:
1026 isl_int_clear(cst);
1027 return tab;
1028 error:
1029 isl_int_clear(cst);
1030 isl_tab_free(bmap->ctx, tab);
1031 return NULL;
1032 }
1033
1034 /* Assuming "tab" is the tableau of a cone, check if the cone is
1035 * bounded, i.e., if it is empty or only contains the origin.
1036 */
1037 int isl_tab_cone_is_bounded(struct isl_ctx *ctx, struct isl_tab *tab)
1038 {
1039 int i;
1040
1041 if (!tab)
1042 return -1;
1043 if (tab->empty)
1044 return 1;
1045 if (tab->n_dead == tab->n_col)
1046 return 1;
1047
1048 for (i = tab->n_redundant; i < tab->n_row; ++i) {
1049 struct isl_tab_var *var;
1050 var = var_from_row(ctx, tab, i);
1051 if (!var->is_nonneg)
1052 continue;
1053 if (sign_of_max(ctx, tab, var) == 0)
1054 close_row(ctx, tab, var);
1055 else
1056 return 0;
1057 if (tab->n_dead == tab->n_col)
1058 return 1;
1059 }
1060 return 0;
1061 }
1062
1063 static int sample_is_integer(struct isl_ctx *ctx, struct isl_tab *tab)
1064 {
1065 int i;
1066
1067 for (i = 0; i < tab->n_var; ++i) {
1068 int row;
1069 if (!tab->var[i].is_row)
1070 continue;
1071 row = tab->var[i].index;
1072 if (!isl_int_is_divisible_by(tab->mat->row[row][1],
1073 tab->mat->row[row][0]))
1074 return 0;
1075 }
1076 return 1;
1077 }
1078
1079 static struct isl_vec *extract_integer_sample(struct isl_ctx *ctx,
1080 struct isl_tab *tab)
1081 {
1082 int i;
1083 struct isl_vec *vec;
1084
1085 vec = isl_vec_alloc(ctx, 1 + tab->n_var);
1086 if (!vec)
1087 return NULL;
1088
1089 isl_int_set_si(vec->block.data[0], 1);
1090 for (i = 0; i < tab->n_var; ++i) {
1091 if (!tab->var[i].is_row)
1092 isl_int_set_si(vec->block.data[1 + i], 0);
1093 else {
1094 int row = tab->var[i].index;
1095 isl_int_divexact(vec->block.data[1 + i],
1096 tab->mat->row[row][1], tab->mat->row[row][0]);
1097 }
1098 }
1099
1100 return vec;
1101 }
1102
1103 struct isl_vec *isl_tab_get_sample_value(struct isl_ctx *ctx,
1104 struct isl_tab *tab)
1105 {
1106 int i;
1107 struct isl_vec *vec;
1108 isl_int m;
1109
1110 if (!tab)
1111 return NULL;
1112
1113 vec = isl_vec_alloc(ctx, 1 + tab->n_var);
1114 if (!vec)
1115 return NULL;
1116
1117 isl_int_init(m);
1118
1119 isl_int_set_si(vec->block.data[0], 1);
1120 for (i = 0; i < tab->n_var; ++i) {
1121 int row;
1122 if (!tab->var[i].is_row) {
1123 isl_int_set_si(vec->block.data[1 + i], 0);
1124 continue;
1125 }
1126 row = tab->var[i].index;
1127 isl_int_gcd(m, vec->block.data[0], tab->mat->row[row][0]);
1128 isl_int_divexact(m, tab->mat->row[row][0], m);
1129 isl_seq_scale(vec->block.data, vec->block.data, m, 1 + i);
1130 isl_int_divexact(m, vec->block.data[0], tab->mat->row[row][0]);
1131 isl_int_mul(vec->block.data[1 + i], m, tab->mat->row[row][1]);
1132 }
1133 isl_seq_normalize(vec->block.data, vec->size);
1134
1135 isl_int_clear(m);
1136 return vec;
1137 }
1138
1139 /* Update "bmap" based on the results of the tableau "tab".
1140 * In particular, implicit equalities are made explicit, redundant constraints
1141 * are removed and if the sample value happens to be integer, it is stored
1142 * in "bmap" (unless "bmap" already had an integer sample).
1143 *
1144 * The tableau is assumed to have been created from "bmap" using
1145 * isl_tab_from_basic_map.
1146 */
1147 struct isl_basic_map *isl_basic_map_update_from_tab(struct isl_basic_map *bmap,
1148 struct isl_tab *tab)
1149 {
1150 int i;
1151 unsigned n_eq;
1152
1153 if (!bmap)
1154 return NULL;
1155 if (!tab)
1156 return bmap;
1157
1158 n_eq = tab->n_eq;
1159 if (tab->empty)
1160 bmap = isl_basic_map_set_to_empty(bmap);
1161 else
1162 for (i = bmap->n_ineq - 1; i >= 0; --i) {
1163 if (isl_tab_is_equality(bmap->ctx, tab, n_eq + i))
1164 isl_basic_map_inequality_to_equality(bmap, i);
1165 else if (isl_tab_is_redundant(bmap->ctx, tab, n_eq + i))
1166 isl_basic_map_drop_inequality(bmap, i);
1167 }
1168 if (!tab->rational &&
1169 !bmap->sample && sample_is_integer(bmap->ctx, tab))
1170 bmap->sample = extract_integer_sample(bmap->ctx, tab);
1171 return bmap;
1172 }
1173
1174 struct isl_basic_set *isl_basic_set_update_from_tab(struct isl_basic_set *bset,
1175 struct isl_tab *tab)
1176 {
1177 return (struct isl_basic_set *)isl_basic_map_update_from_tab(
1178 (struct isl_basic_map *)bset, tab);
1179 }
1180
1181 /* Given a non-negative variable "var", add a new non-negative variable
1182 * that is the opposite of "var", ensuring that var can only attain the
1183 * value zero.
1184 * If var = n/d is a row variable, then the new variable = -n/d.
1185 * If var is a column variables, then the new variable = -var.
1186 * If the new variable cannot attain non-negative values, then
1187 * the resulting tableau is empty.
1188 * Otherwise, we know the value will be zero and we close the row.
1189 */
1190 static struct isl_tab *cut_to_hyperplane(struct isl_ctx *ctx,
1191 struct isl_tab *tab, struct isl_tab_var *var)
1192 {
1193 unsigned r;
1194 isl_int *row;
1195 int sgn;
1196
1197 if (extend_cons(ctx, tab, 1) < 0)
1198 goto error;
1199
1200 r = tab->n_con;
1201 tab->con[r].index = tab->n_row;
1202 tab->con[r].is_row = 1;
1203 tab->con[r].is_nonneg = 0;
1204 tab->con[r].is_zero = 0;
1205 tab->con[r].is_redundant = 0;
1206 tab->con[r].frozen = 0;
1207 tab->row_var[tab->n_row] = ~r;
1208 row = tab->mat->row[tab->n_row];
1209
1210 if (var->is_row) {
1211 isl_int_set(row[0], tab->mat->row[var->index][0]);
1212 isl_seq_neg(row + 1,
1213 tab->mat->row[var->index] + 1, 1 + tab->n_col);
1214 } else {
1215 isl_int_set_si(row[0], 1);
1216 isl_seq_clr(row + 1, 1 + tab->n_col);
1217 isl_int_set_si(row[2 + var->index], -1);
1218 }
1219
1220 tab->n_row++;
1221 tab->n_con++;
1222 push(ctx, tab, isl_tab_undo_allocate, &tab->con[r]);
1223
1224 sgn = sign_of_max(ctx, tab, &tab->con[r]);
1225 if (sgn < 0)
1226 mark_empty(ctx, tab);
1227 else {
1228 tab->con[r].is_nonneg = 1;
1229 push(ctx, tab, isl_tab_undo_nonneg, &tab->con[r]);
1230 /* sgn == 0 */
1231 close_row(ctx, tab, &tab->con[r]);
1232 }
1233
1234 return tab;
1235 error:
1236 isl_tab_free(ctx, tab);
1237 return NULL;
1238 }
1239
1240 /* Given a tableau "tab" and an inequality constraint "con" of the tableau,
1241 * relax the inequality by one. That is, the inequality r >= 0 is replaced
1242 * by r' = r + 1 >= 0.
1243 * If r is a row variable, we simply increase the constant term by one
1244 * (taking into account the denominator).
1245 * If r is a column variable, then we need to modify each row that
1246 * refers to r = r' - 1 by substituting this equality, effectively
1247 * subtracting the coefficient of the column from the constant.
1248 */
1249 struct isl_tab *isl_tab_relax(struct isl_ctx *ctx,
1250 struct isl_tab *tab, int con)
1251 {
1252 struct isl_tab_var *var;
1253 if (!tab)
1254 return NULL;
1255
1256 var = &tab->con[con];
1257
1258 if (!var->is_row && !max_is_manifestly_unbounded(ctx, tab, var))
1259 to_row(ctx, tab, var, 1);
1260
1261 if (var->is_row)
1262 isl_int_add(tab->mat->row[var->index][1],
1263 tab->mat->row[var->index][1], tab->mat->row[var->index][0]);
1264 else {
1265 int i;
1266
1267 for (i = 0; i < tab->n_row; ++i) {
1268 if (isl_int_is_zero(tab->mat->row[i][2 + var->index]))
1269 continue;
1270 isl_int_sub(tab->mat->row[i][1], tab->mat->row[i][1],
1271 tab->mat->row[i][2 + var->index]);
1272 }
1273
1274 }
1275
1276 push(ctx, tab, isl_tab_undo_relax, var);
1277
1278 return tab;
1279 }
1280
1281 struct isl_tab *isl_tab_select_facet(struct isl_ctx *ctx,
1282 struct isl_tab *tab, int con)
1283 {
1284 if (!tab)
1285 return NULL;
1286
1287 return cut_to_hyperplane(ctx, tab, &tab->con[con]);
1288 }
1289
1290 static int may_be_equality(struct isl_tab *tab, int row)
1291 {
1292 return (tab->rational ? isl_int_is_zero(tab->mat->row[row][1])
1293 : isl_int_lt(tab->mat->row[row][1],
1294 tab->mat->row[row][0])) &&
1295 isl_seq_first_non_zero(tab->mat->row[row] + 2 + tab->n_dead,
1296 tab->n_col - tab->n_dead) != -1;
1297 }
1298
1299 /* Check for (near) equalities among the constraints.
1300 * A constraint is an equality if it is non-negative and if
1301 * its maximal value is either
1302 * - zero (in case of rational tableaus), or
1303 * - strictly less than 1 (in case of integer tableaus)
1304 *
1305 * We first mark all non-redundant and non-dead variables that
1306 * are not frozen and not obviously not an equality.
1307 * Then we iterate over all marked variables if they can attain
1308 * any values larger than zero or at least one.
1309 * If the maximal value is zero, we mark any column variables
1310 * that appear in the row as being zero and mark the row as being redundant.
1311 * Otherwise, if the maximal value is strictly less than one (and the
1312 * tableau is integer), then we restrict the value to being zero
1313 * by adding an opposite non-negative variable.
1314 */
1315 struct isl_tab *isl_tab_detect_equalities(struct isl_ctx *ctx,
1316 struct isl_tab *tab)
1317 {
1318 int i;
1319 unsigned n_marked;
1320
1321 if (!tab)
1322 return NULL;
1323 if (tab->empty)
1324 return tab;
1325 if (tab->n_dead == tab->n_col)
1326 return tab;
1327
1328 n_marked = 0;
1329 for (i = tab->n_redundant; i < tab->n_row; ++i) {
1330 struct isl_tab_var *var = var_from_row(ctx, tab, i);
1331 var->marked = !var->frozen && var->is_nonneg &&
1332 may_be_equality(tab, i);
1333 if (var->marked)
1334 n_marked++;
1335 }
1336 for (i = tab->n_dead; i < tab->n_col; ++i) {
1337 struct isl_tab_var *var = var_from_col(ctx, tab, i);
1338 var->marked = !var->frozen && var->is_nonneg;
1339 if (var->marked)
1340 n_marked++;
1341 }
1342 while (n_marked) {
1343 struct isl_tab_var *var;
1344 for (i = tab->n_redundant; i < tab->n_row; ++i) {
1345 var = var_from_row(ctx, tab, i);
1346 if (var->marked)
1347 break;
1348 }
1349 if (i == tab->n_row) {
1350 for (i = tab->n_dead; i < tab->n_col; ++i) {
1351 var = var_from_col(ctx, tab, i);
1352 if (var->marked)
1353 break;
1354 }
1355 if (i == tab->n_col)
1356 break;
1357 }
1358 var->marked = 0;
1359 n_marked--;
1360 if (sign_of_max(ctx, tab, var) == 0)
1361 close_row(ctx, tab, var);
1362 else if (!tab->rational && !at_least_one(ctx, tab, var)) {
1363 tab = cut_to_hyperplane(ctx, tab, var);
1364 return isl_tab_detect_equalities(ctx, tab);
1365 }
1366 for (i = tab->n_redundant; i < tab->n_row; ++i) {
1367 var = var_from_row(ctx, tab, i);
1368 if (!var->marked)
1369 continue;
1370 if (may_be_equality(tab, i))
1371 continue;
1372 var->marked = 0;
1373 n_marked--;
1374 }
1375 }
1376
1377 return tab;
1378 }
1379
1380 /* Check for (near) redundant constraints.
1381 * A constraint is redundant if it is non-negative and if
1382 * its minimal value (temporarily ignoring the non-negativity) is either
1383 * - zero (in case of rational tableaus), or
1384 * - strictly larger than -1 (in case of integer tableaus)
1385 *
1386 * We first mark all non-redundant and non-dead variables that
1387 * are not frozen and not obviously negatively unbounded.
1388 * Then we iterate over all marked variables if they can attain
1389 * any values smaller than zero or at most negative one.
1390 * If not, we mark the row as being redundant (assuming it hasn't
1391 * been detected as being obviously redundant in the mean time).
1392 */
1393 struct isl_tab *isl_tab_detect_redundant(struct isl_ctx *ctx,
1394 struct isl_tab *tab)
1395 {
1396 int i;
1397 unsigned n_marked;
1398
1399 if (!tab)
1400 return NULL;
1401 if (tab->empty)
1402 return tab;
1403 if (tab->n_redundant == tab->n_row)
1404 return tab;
1405
1406 n_marked = 0;
1407 for (i = tab->n_redundant; i < tab->n_row; ++i) {
1408 struct isl_tab_var *var = var_from_row(ctx, tab, i);
1409 var->marked = !var->frozen && var->is_nonneg;
1410 if (var->marked)
1411 n_marked++;
1412 }
1413 for (i = tab->n_dead; i < tab->n_col; ++i) {
1414 struct isl_tab_var *var = var_from_col(ctx, tab, i);
1415 var->marked = !var->frozen && var->is_nonneg &&
1416 !min_is_manifestly_unbounded(ctx, tab, var);
1417 if (var->marked)
1418 n_marked++;
1419 }
1420 while (n_marked) {
1421 struct isl_tab_var *var;
1422 for (i = tab->n_redundant; i < tab->n_row; ++i) {
1423 var = var_from_row(ctx, tab, i);
1424 if (var->marked)
1425 break;
1426 }
1427 if (i == tab->n_row) {
1428 for (i = tab->n_dead; i < tab->n_col; ++i) {
1429 var = var_from_col(ctx, tab, i);
1430 if (var->marked)
1431 break;
1432 }
1433 if (i == tab->n_col)
1434 break;
1435 }
1436 var->marked = 0;
1437 n_marked--;
1438 if ((tab->rational ? (sign_of_min(ctx, tab, var) >= 0)
1439 : !min_at_most_neg_one(ctx, tab, var)) &&
1440 !var->is_redundant)
1441 mark_redundant(ctx, tab, var->index);
1442 for (i = tab->n_dead; i < tab->n_col; ++i) {
1443 var = var_from_col(ctx, tab, i);
1444 if (!var->marked)
1445 continue;
1446 if (!min_is_manifestly_unbounded(ctx, tab, var))
1447 continue;
1448 var->marked = 0;
1449 n_marked--;
1450 }
1451 }
1452
1453 return tab;
1454 }
1455
1456 int isl_tab_is_equality(struct isl_ctx *ctx, struct isl_tab *tab, int con)
1457 {
1458 int row;
1459
1460 if (!tab)
1461 return -1;
1462 if (tab->con[con].is_zero)
1463 return 1;
1464 if (tab->con[con].is_redundant)
1465 return 0;
1466 if (!tab->con[con].is_row)
1467 return tab->con[con].index < tab->n_dead;
1468
1469 row = tab->con[con].index;
1470
1471 return isl_int_is_zero(tab->mat->row[row][1]) &&
1472 isl_seq_first_non_zero(tab->mat->row[row] + 2 + tab->n_dead,
1473 tab->n_col - tab->n_dead) == -1;
1474 }
1475
1476 /* Return the minimial value of the affine expression "f" with denominator
1477 * "denom" in *opt, *opt_denom, assuming the tableau is not empty and
1478 * the expression cannot attain arbitrarily small values.
1479 * If opt_denom is NULL, then *opt is rounded up to the nearest integer.
1480 * The return value reflects the nature of the result (empty, unbounded,
1481 * minmimal value returned in *opt).
1482 */
1483 enum isl_lp_result isl_tab_min(struct isl_ctx *ctx, struct isl_tab *tab,
1484 isl_int *f, isl_int denom, isl_int *opt, isl_int *opt_denom)
1485 {
1486 int r;
1487 enum isl_lp_result res = isl_lp_ok;
1488 struct isl_tab_var *var;
1489
1490 if (tab->empty)
1491 return isl_lp_empty;
1492
1493 r = add_row(ctx, tab, f);
1494 if (r < 0)
1495 return isl_lp_error;
1496 var = &tab->con[r];
1497 isl_int_mul(tab->mat->row[var->index][0],
1498 tab->mat->row[var->index][0], denom);
1499 for (;;) {
1500 int row, col;
1501 find_pivot(ctx, tab, var, -1, &row, &col);
1502 if (row == var->index) {
1503 res = isl_lp_unbounded;
1504 break;
1505 }
1506 if (row == -1)
1507 break;
1508 pivot(ctx, tab, row, col);
1509 }
1510 if (drop_row(ctx, tab, var->index) < 0)
1511 return isl_lp_error;
1512 if (res == isl_lp_ok) {
1513 if (opt_denom) {
1514 isl_int_set(*opt, tab->mat->row[var->index][1]);
1515 isl_int_set(*opt_denom, tab->mat->row[var->index][0]);
1516 } else
1517 isl_int_cdiv_q(*opt, tab->mat->row[var->index][1],
1518 tab->mat->row[var->index][0]);
1519 }
1520 return res;
1521 }
1522
1523 int isl_tab_is_redundant(struct isl_ctx *ctx, struct isl_tab *tab, int con)
1524 {
1525 int row;
1526 unsigned n_col;
1527
1528 if (!tab)
1529 return -1;
1530 if (tab->con[con].is_zero)
1531 return 0;
1532 if (tab->con[con].is_redundant)
1533 return 1;
1534 return tab->con[con].is_row && tab->con[con].index < tab->n_redundant;
1535 }
1536
1537 /* Take a snapshot of the tableau that can be restored by s call to
1538 * isl_tab_rollback.
1539 */
1540 struct isl_tab_undo *isl_tab_snap(struct isl_ctx *ctx, struct isl_tab *tab)
1541 {
1542 if (!tab)
1543 return NULL;
1544 tab->need_undo = 1;
1545 return tab->top;
1546 }
1547
1548 /* Undo the operation performed by isl_tab_relax.
1549 */
1550 static void unrelax(struct isl_ctx *ctx,
1551 struct isl_tab *tab, struct isl_tab_var *var)
1552 {
1553 if (!var->is_row && !max_is_manifestly_unbounded(ctx, tab, var))
1554 to_row(ctx, tab, var, 1);
1555
1556 if (var->is_row)
1557 isl_int_sub(tab->mat->row[var->index][1],
1558 tab->mat->row[var->index][1], tab->mat->row[var->index][0]);
1559 else {
1560 int i;
1561
1562 for (i = 0; i < tab->n_row; ++i) {
1563 if (isl_int_is_zero(tab->mat->row[i][2 + var->index]))
1564 continue;
1565 isl_int_add(tab->mat->row[i][1], tab->mat->row[i][1],
1566 tab->mat->row[i][2 + var->index]);
1567 }
1568
1569 }
1570 }
1571
1572 static void perform_undo(struct isl_ctx *ctx, struct isl_tab *tab,
1573 struct isl_tab_undo *undo)
1574 {
1575 switch(undo->type) {
1576 case isl_tab_undo_empty:
1577 tab->empty = 0;
1578 break;
1579 case isl_tab_undo_nonneg:
1580 undo->var->is_nonneg = 0;
1581 break;
1582 case isl_tab_undo_redundant:
1583 undo->var->is_redundant = 0;
1584 tab->n_redundant--;
1585 break;
1586 case isl_tab_undo_zero:
1587 undo->var->is_zero = 0;
1588 tab->n_dead--;
1589 break;
1590 case isl_tab_undo_allocate:
1591 if (!undo->var->is_row) {
1592 if (max_is_manifestly_unbounded(ctx, tab, undo->var))
1593 to_row(ctx, tab, undo->var, -1);
1594 else
1595 to_row(ctx, tab, undo->var, 1);
1596 }
1597 drop_row(ctx, tab, undo->var->index);
1598 break;
1599 case isl_tab_undo_relax:
1600 unrelax(ctx, tab, undo->var);
1601 break;
1602 }
1603 }
1604
1605 /* Return the tableau to the state it was in when the snapshot "snap"
1606 * was taken.
1607 */
1608 int isl_tab_rollback(struct isl_ctx *ctx, struct isl_tab *tab,
1609 struct isl_tab_undo *snap)
1610 {
1611 struct isl_tab_undo *undo, *next;
1612
1613 if (!tab)
1614 return -1;
1615
1616 for (undo = tab->top; undo && undo != &tab->bottom; undo = next) {
1617 next = undo->next;
1618 if (undo == snap)
1619 break;
1620 perform_undo(ctx, tab, undo);
1621 free(undo);
1622 }
1623 tab->top = undo;
1624 if (!undo)
1625 return -1;
1626 return 0;
1627 }
1628
1629 /* The given row "row" represents an inequality violated by all
1630 * points in the tableau. Check for some special cases of such
1631 * separating constraints.
1632 * In particular, if the row has been reduced to the constant -1,
1633 * then we know the inequality is adjacent (but opposite) to
1634 * an equality in the tableau.
1635 * If the row has been reduced to r = -1 -r', with r' an inequality
1636 * of the tableau, then the inequality is adjacent (but opposite)
1637 * to the inequality r'.
1638 */
1639 static enum isl_ineq_type separation_type(struct isl_ctx *ctx,
1640 struct isl_tab *tab, unsigned row)
1641 {
1642 int pos;
1643
1644 if (tab->rational)
1645 return isl_ineq_separate;
1646
1647 if (!isl_int_is_one(tab->mat->row[row][0]))
1648 return isl_ineq_separate;
1649 if (!isl_int_is_negone(tab->mat->row[row][1]))
1650 return isl_ineq_separate;
1651
1652 pos = isl_seq_first_non_zero(tab->mat->row[row] + 2 + tab->n_dead,
1653 tab->n_col - tab->n_dead);
1654 if (pos == -1)
1655 return isl_ineq_adj_eq;
1656
1657 if (!isl_int_is_negone(tab->mat->row[row][2 + tab->n_dead + pos]))
1658 return isl_ineq_separate;
1659
1660 pos = isl_seq_first_non_zero(
1661 tab->mat->row[row] + 2 + tab->n_dead + pos + 1,
1662 tab->n_col - tab->n_dead - pos - 1);
1663
1664 return pos == -1 ? isl_ineq_adj_ineq : isl_ineq_separate;
1665 }
1666
1667 /* Check the effect of inequality "ineq" on the tableau "tab".
1668 * The result may be
1669 * isl_ineq_redundant: satisfied by all points in the tableau
1670 * isl_ineq_separate: satisfied by no point in the tableau
1671 * isl_ineq_cut: satisfied by some by not all points
1672 * isl_ineq_adj_eq: adjacent to an equality
1673 * isl_ineq_adj_ineq: adjacent to an inequality.
1674 */
1675 enum isl_ineq_type isl_tab_ineq_type(struct isl_ctx *ctx, struct isl_tab *tab,
1676 isl_int *ineq)
1677 {
1678 enum isl_ineq_type type = isl_ineq_error;
1679 struct isl_tab_undo *snap = NULL;
1680 int con;
1681 int row;
1682
1683 if (!tab)
1684 return isl_ineq_error;
1685
1686 if (extend_cons(ctx, tab, 1) < 0)
1687 return isl_ineq_error;
1688
1689 snap = isl_tab_snap(ctx, tab);
1690
1691 con = add_row(ctx, tab, ineq);
1692 if (con < 0)
1693 goto error;
1694
1695 row = tab->con[con].index;
1696 if (is_redundant(ctx, tab, row))
1697 type = isl_ineq_redundant;
1698 else if (isl_int_is_neg(tab->mat->row[row][1]) &&
1699 (tab->rational ||
1700 isl_int_abs_ge(tab->mat->row[row][1],
1701 tab->mat->row[row][0]))) {
1702 if (at_least_zero(ctx, tab, &tab->con[con]))
1703 type = isl_ineq_cut;
1704 else
1705 type = separation_type(ctx, tab, row);
1706 } else if (tab->rational ? (sign_of_min(ctx, tab, &tab->con[con]) < 0)
1707 : min_at_most_neg_one(ctx, tab, &tab->con[con]))
1708 type = isl_ineq_cut;
1709 else
1710 type = isl_ineq_redundant;
1711
1712 if (isl_tab_rollback(ctx, tab, snap))
1713 return isl_ineq_error;
1714 return type;
1715 error:
1716 isl_tab_rollback(ctx, tab, snap);
1717 return isl_ineq_error;
1718 }
1719
1720 void isl_tab_dump(struct isl_ctx *ctx, struct isl_tab *tab,
1721 FILE *out, int indent)
1722 {
1723 unsigned r, c;
1724 int i;
1725
1726 if (!tab) {
1727 fprintf(out, "%*snull tab\n", indent, "");
1728 return;
1729 }
1730 fprintf(out, "%*sn_redundant: %d, n_dead: %d", indent, "",
1731 tab->n_redundant, tab->n_dead);
1732 if (tab->rational)
1733 fprintf(out, ", rational");
1734 if (tab->empty)
1735 fprintf(out, ", empty");
1736 fprintf(out, "\n");
1737 fprintf(out, "%*s[", indent, "");
1738 for (i = 0; i < tab->n_var; ++i) {
1739 if (i)
1740 fprintf(out, ", ");
1741 fprintf(out, "%c%d%s", tab->var[i].is_row ? 'r' : 'c',
1742 tab->var[i].index,
1743 tab->var[i].is_zero ? " [=0]" :
1744 tab->var[i].is_redundant ? " [R]" : "");
1745 }
1746 fprintf(out, "]\n");
1747 fprintf(out, "%*s[", indent, "");
1748 for (i = 0; i < tab->n_con; ++i) {
1749 if (i)
1750 fprintf(out, ", ");
1751 fprintf(out, "%c%d%s", tab->con[i].is_row ? 'r' : 'c',
1752 tab->con[i].index,
1753 tab->con[i].is_zero ? " [=0]" :
1754 tab->con[i].is_redundant ? " [R]" : "");
1755 }
1756 fprintf(out, "]\n");
1757 fprintf(out, "%*s[", indent, "");
1758 for (i = 0; i < tab->n_row; ++i) {
1759 if (i)
1760 fprintf(out, ", ");
1761 fprintf(out, "r%d: %d%s", i, tab->row_var[i],
1762 var_from_row(ctx, tab, i)->is_nonneg ? " [>=0]" : "");
1763 }
1764 fprintf(out, "]\n");
1765 fprintf(out, "%*s[", indent, "");
1766 for (i = 0; i < tab->n_col; ++i) {
1767 if (i)
1768 fprintf(out, ", ");
1769 fprintf(out, "c%d: %d%s", i, tab->col_var[i],
1770 var_from_col(ctx, tab, i)->is_nonneg ? " [>=0]" : "");
1771 }
1772 fprintf(out, "]\n");
1773 r = tab->mat->n_row;
1774 tab->mat->n_row = tab->n_row;
1775 c = tab->mat->n_col;
1776 tab->mat->n_col = 2 + tab->n_col;
1777 isl_mat_dump(ctx, tab->mat, out, indent);
1778 tab->mat->n_row = r;
1779 tab->mat->n_col = c;
1780 }
Integer set library