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isl_pw_*_eval: rename "pnt_dim" variable to "pnt_space"
[isl.git] / isl_polynomial.c
blob2c5a5f5fae6210ecd89afa5672cca96223b7bfa6
1 /*
2 * Copyright 2010 INRIA Saclay
3 *
4 * Use of this software is governed by the MIT license
5 *
6 * Written by Sven Verdoolaege, INRIA Saclay - Ile-de-France,
7 * Parc Club Orsay Universite, ZAC des vignes, 4 rue Jacques Monod,
8 * 91893 Orsay, France
9 */
10
11 #include <stdlib.h>
12 #define ISL_DIM_H
13 #include <isl_ctx_private.h>
14 #include <isl_map_private.h>
15 #include <isl_factorization.h>
16 #include <isl_lp_private.h>
17 #include <isl_seq.h>
18 #include <isl_union_map_private.h>
19 #include <isl_constraint_private.h>
20 #include <isl_polynomial_private.h>
21 #include <isl_point_private.h>
22 #include <isl_space_private.h>
23 #include <isl_mat_private.h>
24 #include <isl_vec_private.h>
25 #include <isl_range.h>
26 #include <isl_local.h>
27 #include <isl_local_space_private.h>
28 #include <isl_aff_private.h>
29 #include <isl_val_private.h>
30 #include <isl_config.h>
31
32 static unsigned pos(__isl_keep isl_space *dim, enum isl_dim_type type)
33 {
34 switch (type) {
35 case isl_dim_param: return 0;
36 case isl_dim_in: return dim->nparam;
37 case isl_dim_out: return dim->nparam + dim->n_in;
38 default: return 0;
39 }
40 }
41
42 int isl_upoly_is_cst(__isl_keep struct isl_upoly *up)
43 {
44 if (!up)
45 return -1;
46
47 return up->var < 0;
48 }
49
50 __isl_keep struct isl_upoly_cst *isl_upoly_as_cst(__isl_keep struct isl_upoly *up)
51 {
52 if (!up)
53 return NULL;
54
55 isl_assert(up->ctx, up->var < 0, return NULL);
56
57 return (struct isl_upoly_cst *)up;
58 }
59
60 __isl_keep struct isl_upoly_rec *isl_upoly_as_rec(__isl_keep struct isl_upoly *up)
61 {
62 if (!up)
63 return NULL;
64
65 isl_assert(up->ctx, up->var >= 0, return NULL);
66
67 return (struct isl_upoly_rec *)up;
68 }
69
70 /* Compare two polynomials.
71 *
72 * Return -1 if "up1" is "smaller" than "up2", 1 if "up1" is "greater"
73 * than "up2" and 0 if they are equal.
74 */
75 static int isl_upoly_plain_cmp(__isl_keep struct isl_upoly *up1,
76 __isl_keep struct isl_upoly *up2)
77 {
78 int i;
79 struct isl_upoly_rec *rec1, *rec2;
80
81 if (up1 == up2)
82 return 0;
83 if (!up1)
84 return -1;
85 if (!up2)
86 return 1;
87 if (up1->var != up2->var)
88 return up1->var - up2->var;
89
90 if (isl_upoly_is_cst(up1)) {
91 struct isl_upoly_cst *cst1, *cst2;
92 int cmp;
93
94 cst1 = isl_upoly_as_cst(up1);
95 cst2 = isl_upoly_as_cst(up2);
96 if (!cst1 || !cst2)
97 return 0;
98 cmp = isl_int_cmp(cst1->n, cst2->n);
99 if (cmp != 0)
100 return cmp;
101 return isl_int_cmp(cst1->d, cst2->d);
102 }
103
104 rec1 = isl_upoly_as_rec(up1);
105 rec2 = isl_upoly_as_rec(up2);
106 if (!rec1 || !rec2)
107 return 0;
108
109 if (rec1->n != rec2->n)
110 return rec1->n - rec2->n;
111
112 for (i = 0; i < rec1->n; ++i) {
113 int cmp = isl_upoly_plain_cmp(rec1->p[i], rec2->p[i]);
114 if (cmp != 0)
115 return cmp;
116 }
117
118 return 0;
119 }
120
121 isl_bool isl_upoly_is_equal(__isl_keep struct isl_upoly *up1,
122 __isl_keep struct isl_upoly *up2)
123 {
124 int i;
125 struct isl_upoly_rec *rec1, *rec2;
126
127 if (!up1 || !up2)
128 return isl_bool_error;
129 if (up1 == up2)
130 return isl_bool_true;
131 if (up1->var != up2->var)
132 return isl_bool_false;
133 if (isl_upoly_is_cst(up1)) {
134 struct isl_upoly_cst *cst1, *cst2;
135 cst1 = isl_upoly_as_cst(up1);
136 cst2 = isl_upoly_as_cst(up2);
137 if (!cst1 || !cst2)
138 return isl_bool_error;
139 return isl_int_eq(cst1->n, cst2->n) &&
140 isl_int_eq(cst1->d, cst2->d);
141 }
142
143 rec1 = isl_upoly_as_rec(up1);
144 rec2 = isl_upoly_as_rec(up2);
145 if (!rec1 || !rec2)
146 return isl_bool_error;
147
148 if (rec1->n != rec2->n)
149 return isl_bool_false;
150
151 for (i = 0; i < rec1->n; ++i) {
152 isl_bool eq = isl_upoly_is_equal(rec1->p[i], rec2->p[i]);
153 if (eq < 0 || !eq)
154 return eq;
155 }
156
157 return isl_bool_true;
158 }
159
160 int isl_upoly_is_zero(__isl_keep struct isl_upoly *up)
161 {
162 struct isl_upoly_cst *cst;
163
164 if (!up)
165 return -1;
166 if (!isl_upoly_is_cst(up))
167 return 0;
168
169 cst = isl_upoly_as_cst(up);
170 if (!cst)
171 return -1;
172
173 return isl_int_is_zero(cst->n) && isl_int_is_pos(cst->d);
174 }
175
176 int isl_upoly_sgn(__isl_keep struct isl_upoly *up)
177 {
178 struct isl_upoly_cst *cst;
179
180 if (!up)
181 return 0;
182 if (!isl_upoly_is_cst(up))
183 return 0;
184
185 cst = isl_upoly_as_cst(up);
186 if (!cst)
187 return 0;
188
189 return isl_int_sgn(cst->n);
190 }
191
192 int isl_upoly_is_nan(__isl_keep struct isl_upoly *up)
193 {
194 struct isl_upoly_cst *cst;
195
196 if (!up)
197 return -1;
198 if (!isl_upoly_is_cst(up))
199 return 0;
200
201 cst = isl_upoly_as_cst(up);
202 if (!cst)
203 return -1;
204
205 return isl_int_is_zero(cst->n) && isl_int_is_zero(cst->d);
206 }
207
208 int isl_upoly_is_infty(__isl_keep struct isl_upoly *up)
209 {
210 struct isl_upoly_cst *cst;
211
212 if (!up)
213 return -1;
214 if (!isl_upoly_is_cst(up))
215 return 0;
216
217 cst = isl_upoly_as_cst(up);
218 if (!cst)
219 return -1;
220
221 return isl_int_is_pos(cst->n) && isl_int_is_zero(cst->d);
222 }
223
224 int isl_upoly_is_neginfty(__isl_keep struct isl_upoly *up)
225 {
226 struct isl_upoly_cst *cst;
227
228 if (!up)
229 return -1;
230 if (!isl_upoly_is_cst(up))
231 return 0;
232
233 cst = isl_upoly_as_cst(up);
234 if (!cst)
235 return -1;
236
237 return isl_int_is_neg(cst->n) && isl_int_is_zero(cst->d);
238 }
239
240 int isl_upoly_is_one(__isl_keep struct isl_upoly *up)
241 {
242 struct isl_upoly_cst *cst;
243
244 if (!up)
245 return -1;
246 if (!isl_upoly_is_cst(up))
247 return 0;
248
249 cst = isl_upoly_as_cst(up);
250 if (!cst)
251 return -1;
252
253 return isl_int_eq(cst->n, cst->d) && isl_int_is_pos(cst->d);
254 }
255
256 int isl_upoly_is_negone(__isl_keep struct isl_upoly *up)
257 {
258 struct isl_upoly_cst *cst;
259
260 if (!up)
261 return -1;
262 if (!isl_upoly_is_cst(up))
263 return 0;
264
265 cst = isl_upoly_as_cst(up);
266 if (!cst)
267 return -1;
268
269 return isl_int_is_negone(cst->n) && isl_int_is_one(cst->d);
270 }
271
272 __isl_give struct isl_upoly_cst *isl_upoly_cst_alloc(struct isl_ctx *ctx)
273 {
274 struct isl_upoly_cst *cst;
275
276 cst = isl_alloc_type(ctx, struct isl_upoly_cst);
277 if (!cst)
278 return NULL;
279
280 cst->up.ref = 1;
281 cst->up.ctx = ctx;
282 isl_ctx_ref(ctx);
283 cst->up.var = -1;
284
285 isl_int_init(cst->n);
286 isl_int_init(cst->d);
287
288 return cst;
289 }
290
291 __isl_give struct isl_upoly *isl_upoly_zero(struct isl_ctx *ctx)
292 {
293 struct isl_upoly_cst *cst;
294
295 cst = isl_upoly_cst_alloc(ctx);
296 if (!cst)
297 return NULL;
298
299 isl_int_set_si(cst->n, 0);
300 isl_int_set_si(cst->d, 1);
301
302 return &cst->up;
303 }
304
305 __isl_give struct isl_upoly *isl_upoly_one(struct isl_ctx *ctx)
306 {
307 struct isl_upoly_cst *cst;
308
309 cst = isl_upoly_cst_alloc(ctx);
310 if (!cst)
311 return NULL;
312
313 isl_int_set_si(cst->n, 1);
314 isl_int_set_si(cst->d, 1);
315
316 return &cst->up;
317 }
318
319 __isl_give struct isl_upoly *isl_upoly_infty(struct isl_ctx *ctx)
320 {
321 struct isl_upoly_cst *cst;
322
323 cst = isl_upoly_cst_alloc(ctx);
324 if (!cst)
325 return NULL;
326
327 isl_int_set_si(cst->n, 1);
328 isl_int_set_si(cst->d, 0);
329
330 return &cst->up;
331 }
332
333 __isl_give struct isl_upoly *isl_upoly_neginfty(struct isl_ctx *ctx)
334 {
335 struct isl_upoly_cst *cst;
336
337 cst = isl_upoly_cst_alloc(ctx);
338 if (!cst)
339 return NULL;
340
341 isl_int_set_si(cst->n, -1);
342 isl_int_set_si(cst->d, 0);
343
344 return &cst->up;
345 }
346
347 __isl_give struct isl_upoly *isl_upoly_nan(struct isl_ctx *ctx)
348 {
349 struct isl_upoly_cst *cst;
350
351 cst = isl_upoly_cst_alloc(ctx);
352 if (!cst)
353 return NULL;
354
355 isl_int_set_si(cst->n, 0);
356 isl_int_set_si(cst->d, 0);
357
358 return &cst->up;
359 }
360
361 __isl_give struct isl_upoly *isl_upoly_rat_cst(struct isl_ctx *ctx,
362 isl_int n, isl_int d)
363 {
364 struct isl_upoly_cst *cst;
365
366 cst = isl_upoly_cst_alloc(ctx);
367 if (!cst)
368 return NULL;
369
370 isl_int_set(cst->n, n);
371 isl_int_set(cst->d, d);
372
373 return &cst->up;
374 }
375
376 __isl_give struct isl_upoly_rec *isl_upoly_alloc_rec(struct isl_ctx *ctx,
377 int var, int size)
378 {
379 struct isl_upoly_rec *rec;
380
381 isl_assert(ctx, var >= 0, return NULL);
382 isl_assert(ctx, size >= 0, return NULL);
383 rec = isl_calloc(ctx, struct isl_upoly_rec,
384 sizeof(struct isl_upoly_rec) +
385 size * sizeof(struct isl_upoly *));
386 if (!rec)
387 return NULL;
388
389 rec->up.ref = 1;
390 rec->up.ctx = ctx;
391 isl_ctx_ref(ctx);
392 rec->up.var = var;
393
394 rec->n = 0;
395 rec->size = size;
396
397 return rec;
398 }
399
400 __isl_give isl_qpolynomial *isl_qpolynomial_reset_domain_space(
401 __isl_take isl_qpolynomial *qp, __isl_take isl_space *dim)
402 {
403 qp = isl_qpolynomial_cow(qp);
404 if (!qp || !dim)
405 goto error;
406
407 isl_space_free(qp->dim);
408 qp->dim = dim;
409
410 return qp;
411 error:
412 isl_qpolynomial_free(qp);
413 isl_space_free(dim);
414 return NULL;
415 }
416
417 /* Reset the space of "qp". This function is called from isl_pw_templ.c
418 * and doesn't know if the space of an element object is represented
419 * directly or through its domain. It therefore passes along both.
420 */
421 __isl_give isl_qpolynomial *isl_qpolynomial_reset_space_and_domain(
422 __isl_take isl_qpolynomial *qp, __isl_take isl_space *space,
423 __isl_take isl_space *domain)
424 {
425 isl_space_free(space);
426 return isl_qpolynomial_reset_domain_space(qp, domain);
427 }
428
429 isl_ctx *isl_qpolynomial_get_ctx(__isl_keep isl_qpolynomial *qp)
430 {
431 return qp ? qp->dim->ctx : NULL;
432 }
433
434 __isl_give isl_space *isl_qpolynomial_get_domain_space(
435 __isl_keep isl_qpolynomial *qp)
436 {
437 return qp ? isl_space_copy(qp->dim) : NULL;
438 }
439
440 __isl_give isl_space *isl_qpolynomial_get_space(__isl_keep isl_qpolynomial *qp)
441 {
442 isl_space *space;
443 if (!qp)
444 return NULL;
445 space = isl_space_copy(qp->dim);
446 space = isl_space_from_domain(space);
447 space = isl_space_add_dims(space, isl_dim_out, 1);
448 return space;
449 }
450
451 /* Return the number of variables of the given type in the domain of "qp".
452 */
453 unsigned isl_qpolynomial_domain_dim(__isl_keep isl_qpolynomial *qp,
454 enum isl_dim_type type)
455 {
456 if (!qp)
457 return 0;
458 if (type == isl_dim_div)
459 return qp->div->n_row;
460 if (type == isl_dim_all)
461 return isl_space_dim(qp->dim, isl_dim_all) +
462 isl_qpolynomial_domain_dim(qp, isl_dim_div);
463 return isl_space_dim(qp->dim, type);
464 }
465
466 /* Externally, an isl_qpolynomial has a map space, but internally, the
467 * ls field corresponds to the domain of that space.
468 */
469 unsigned isl_qpolynomial_dim(__isl_keep isl_qpolynomial *qp,
470 enum isl_dim_type type)
471 {
472 if (!qp)
473 return 0;
474 if (type == isl_dim_out)
475 return 1;
476 if (type == isl_dim_in)
477 type = isl_dim_set;
478 return isl_qpolynomial_domain_dim(qp, type);
479 }
480
481 /* Return the offset of the first coefficient of type "type" in
482 * the domain of "qp".
483 */
484 unsigned isl_qpolynomial_domain_offset(__isl_keep isl_qpolynomial *qp,
485 enum isl_dim_type type)
486 {
487 if (!qp)
488 return 0;
489 switch (type) {
490 case isl_dim_cst:
491 return 0;
492 case isl_dim_param:
493 case isl_dim_set:
494 return 1 + isl_space_offset(qp->dim, type);
495 case isl_dim_div:
496 return 1 + isl_space_dim(qp->dim, isl_dim_all);
497 default:
498 return 0;
499 }
500 }
501
502 isl_bool isl_qpolynomial_is_zero(__isl_keep isl_qpolynomial *qp)
503 {
504 return qp ? isl_upoly_is_zero(qp->upoly) : isl_bool_error;
505 }
506
507 isl_bool isl_qpolynomial_is_one(__isl_keep isl_qpolynomial *qp)
508 {
509 return qp ? isl_upoly_is_one(qp->upoly) : isl_bool_error;
510 }
511
512 isl_bool isl_qpolynomial_is_nan(__isl_keep isl_qpolynomial *qp)
513 {
514 return qp ? isl_upoly_is_nan(qp->upoly) : isl_bool_error;
515 }
516
517 isl_bool isl_qpolynomial_is_infty(__isl_keep isl_qpolynomial *qp)
518 {
519 return qp ? isl_upoly_is_infty(qp->upoly) : isl_bool_error;
520 }
521
522 isl_bool isl_qpolynomial_is_neginfty(__isl_keep isl_qpolynomial *qp)
523 {
524 return qp ? isl_upoly_is_neginfty(qp->upoly) : isl_bool_error;
525 }
526
527 int isl_qpolynomial_sgn(__isl_keep isl_qpolynomial *qp)
528 {
529 return qp ? isl_upoly_sgn(qp->upoly) : 0;
530 }
531
532 static void upoly_free_cst(__isl_take struct isl_upoly_cst *cst)
533 {
534 isl_int_clear(cst->n);
535 isl_int_clear(cst->d);
536 }
537
538 static void upoly_free_rec(__isl_take struct isl_upoly_rec *rec)
539 {
540 int i;
541
542 for (i = 0; i < rec->n; ++i)
543 isl_upoly_free(rec->p[i]);
544 }
545
546 __isl_give struct isl_upoly *isl_upoly_copy(__isl_keep struct isl_upoly *up)
547 {
548 if (!up)
549 return NULL;
550
551 up->ref++;
552 return up;
553 }
554
555 __isl_give struct isl_upoly *isl_upoly_dup_cst(__isl_keep struct isl_upoly *up)
556 {
557 struct isl_upoly_cst *cst;
558 struct isl_upoly_cst *dup;
559
560 cst = isl_upoly_as_cst(up);
561 if (!cst)
562 return NULL;
563
564 dup = isl_upoly_as_cst(isl_upoly_zero(up->ctx));
565 if (!dup)
566 return NULL;
567 isl_int_set(dup->n, cst->n);
568 isl_int_set(dup->d, cst->d);
569
570 return &dup->up;
571 }
572
573 __isl_give struct isl_upoly *isl_upoly_dup_rec(__isl_keep struct isl_upoly *up)
574 {
575 int i;
576 struct isl_upoly_rec *rec;
577 struct isl_upoly_rec *dup;
578
579 rec = isl_upoly_as_rec(up);
580 if (!rec)
581 return NULL;
582
583 dup = isl_upoly_alloc_rec(up->ctx, up->var, rec->n);
584 if (!dup)
585 return NULL;
586
587 for (i = 0; i < rec->n; ++i) {
588 dup->p[i] = isl_upoly_copy(rec->p[i]);
589 if (!dup->p[i])
590 goto error;
591 dup->n++;
592 }
593
594 return &dup->up;
595 error:
596 isl_upoly_free(&dup->up);
597 return NULL;
598 }
599
600 __isl_give struct isl_upoly *isl_upoly_dup(__isl_keep struct isl_upoly *up)
601 {
602 if (!up)
603 return NULL;
604
605 if (isl_upoly_is_cst(up))
606 return isl_upoly_dup_cst(up);
607 else
608 return isl_upoly_dup_rec(up);
609 }
610
611 __isl_give struct isl_upoly *isl_upoly_cow(__isl_take struct isl_upoly *up)
612 {
613 if (!up)
614 return NULL;
615
616 if (up->ref == 1)
617 return up;
618 up->ref--;
619 return isl_upoly_dup(up);
620 }
621
622 __isl_null struct isl_upoly *isl_upoly_free(__isl_take struct isl_upoly *up)
623 {
624 if (!up)
625 return NULL;
626
627 if (--up->ref > 0)
628 return NULL;
629
630 if (up->var < 0)
631 upoly_free_cst((struct isl_upoly_cst *)up);
632 else
633 upoly_free_rec((struct isl_upoly_rec *)up);
634
635 isl_ctx_deref(up->ctx);
636 free(up);
637 return NULL;
638 }
639
640 static void isl_upoly_cst_reduce(__isl_keep struct isl_upoly_cst *cst)
641 {
642 isl_int gcd;
643
644 isl_int_init(gcd);
645 isl_int_gcd(gcd, cst->n, cst->d);
646 if (!isl_int_is_zero(gcd) && !isl_int_is_one(gcd)) {
647 isl_int_divexact(cst->n, cst->n, gcd);
648 isl_int_divexact(cst->d, cst->d, gcd);
649 }
650 isl_int_clear(gcd);
651 }
652
653 __isl_give struct isl_upoly *isl_upoly_sum_cst(__isl_take struct isl_upoly *up1,
654 __isl_take struct isl_upoly *up2)
655 {
656 struct isl_upoly_cst *cst1;
657 struct isl_upoly_cst *cst2;
658
659 up1 = isl_upoly_cow(up1);
660 if (!up1 || !up2)
661 goto error;
662
663 cst1 = isl_upoly_as_cst(up1);
664 cst2 = isl_upoly_as_cst(up2);
665
666 if (isl_int_eq(cst1->d, cst2->d))
667 isl_int_add(cst1->n, cst1->n, cst2->n);
668 else {
669 isl_int_mul(cst1->n, cst1->n, cst2->d);
670 isl_int_addmul(cst1->n, cst2->n, cst1->d);
671 isl_int_mul(cst1->d, cst1->d, cst2->d);
672 }
673
674 isl_upoly_cst_reduce(cst1);
675
676 isl_upoly_free(up2);
677 return up1;
678 error:
679 isl_upoly_free(up1);
680 isl_upoly_free(up2);
681 return NULL;
682 }
683
684 static __isl_give struct isl_upoly *replace_by_zero(
685 __isl_take struct isl_upoly *up)
686 {
687 struct isl_ctx *ctx;
688
689 if (!up)
690 return NULL;
691 ctx = up->ctx;
692 isl_upoly_free(up);
693 return isl_upoly_zero(ctx);
694 }
695
696 static __isl_give struct isl_upoly *replace_by_constant_term(
697 __isl_take struct isl_upoly *up)
698 {
699 struct isl_upoly_rec *rec;
700 struct isl_upoly *cst;
701
702 if (!up)
703 return NULL;
704
705 rec = isl_upoly_as_rec(up);
706 if (!rec)
707 goto error;
708 cst = isl_upoly_copy(rec->p[0]);
709 isl_upoly_free(up);
710 return cst;
711 error:
712 isl_upoly_free(up);
713 return NULL;
714 }
715
716 __isl_give struct isl_upoly *isl_upoly_sum(__isl_take struct isl_upoly *up1,
717 __isl_take struct isl_upoly *up2)
718 {
719 int i;
720 struct isl_upoly_rec *rec1, *rec2;
721
722 if (!up1 || !up2)
723 goto error;
724
725 if (isl_upoly_is_nan(up1)) {
726 isl_upoly_free(up2);
727 return up1;
728 }
729
730 if (isl_upoly_is_nan(up2)) {
731 isl_upoly_free(up1);
732 return up2;
733 }
734
735 if (isl_upoly_is_zero(up1)) {
736 isl_upoly_free(up1);
737 return up2;
738 }
739
740 if (isl_upoly_is_zero(up2)) {
741 isl_upoly_free(up2);
742 return up1;
743 }
744
745 if (up1->var < up2->var)
746 return isl_upoly_sum(up2, up1);
747
748 if (up2->var < up1->var) {
749 struct isl_upoly_rec *rec;
750 if (isl_upoly_is_infty(up2) || isl_upoly_is_neginfty(up2)) {
751 isl_upoly_free(up1);
752 return up2;
753 }
754 up1 = isl_upoly_cow(up1);
755 rec = isl_upoly_as_rec(up1);
756 if (!rec)
757 goto error;
758 rec->p[0] = isl_upoly_sum(rec->p[0], up2);
759 if (rec->n == 1)
760 up1 = replace_by_constant_term(up1);
761 return up1;
762 }
763
764 if (isl_upoly_is_cst(up1))
765 return isl_upoly_sum_cst(up1, up2);
766
767 rec1 = isl_upoly_as_rec(up1);
768 rec2 = isl_upoly_as_rec(up2);
769 if (!rec1 || !rec2)
770 goto error;
771
772 if (rec1->n < rec2->n)
773 return isl_upoly_sum(up2, up1);
774
775 up1 = isl_upoly_cow(up1);
776 rec1 = isl_upoly_as_rec(up1);
777 if (!rec1)
778 goto error;
779
780 for (i = rec2->n - 1; i >= 0; --i) {
781 rec1->p[i] = isl_upoly_sum(rec1->p[i],
782 isl_upoly_copy(rec2->p[i]));
783 if (!rec1->p[i])
784 goto error;
785 if (i == rec1->n - 1 && isl_upoly_is_zero(rec1->p[i])) {
786 isl_upoly_free(rec1->p[i]);
787 rec1->n--;
788 }
789 }
790
791 if (rec1->n == 0)
792 up1 = replace_by_zero(up1);
793 else if (rec1->n == 1)
794 up1 = replace_by_constant_term(up1);
795
796 isl_upoly_free(up2);
797
798 return up1;
799 error:
800 isl_upoly_free(up1);
801 isl_upoly_free(up2);
802 return NULL;
803 }
804
805 __isl_give struct isl_upoly *isl_upoly_cst_add_isl_int(
806 __isl_take struct isl_upoly *up, isl_int v)
807 {
808 struct isl_upoly_cst *cst;
809
810 up = isl_upoly_cow(up);
811 if (!up)
812 return NULL;
813
814 cst = isl_upoly_as_cst(up);
815
816 isl_int_addmul(cst->n, cst->d, v);
817
818 return up;
819 }
820
821 __isl_give struct isl_upoly *isl_upoly_add_isl_int(
822 __isl_take struct isl_upoly *up, isl_int v)
823 {
824 struct isl_upoly_rec *rec;
825
826 if (!up)
827 return NULL;
828
829 if (isl_upoly_is_cst(up))
830 return isl_upoly_cst_add_isl_int(up, v);
831
832 up = isl_upoly_cow(up);
833 rec = isl_upoly_as_rec(up);
834 if (!rec)
835 goto error;
836
837 rec->p[0] = isl_upoly_add_isl_int(rec->p[0], v);
838 if (!rec->p[0])
839 goto error;
840
841 return up;
842 error:
843 isl_upoly_free(up);
844 return NULL;
845 }
846
847 __isl_give struct isl_upoly *isl_upoly_cst_mul_isl_int(
848 __isl_take struct isl_upoly *up, isl_int v)
849 {
850 struct isl_upoly_cst *cst;
851
852 if (isl_upoly_is_zero(up))
853 return up;
854
855 up = isl_upoly_cow(up);
856 if (!up)
857 return NULL;
858
859 cst = isl_upoly_as_cst(up);
860
861 isl_int_mul(cst->n, cst->n, v);
862
863 return up;
864 }
865
866 __isl_give struct isl_upoly *isl_upoly_mul_isl_int(
867 __isl_take struct isl_upoly *up, isl_int v)
868 {
869 int i;
870 struct isl_upoly_rec *rec;
871
872 if (!up)
873 return NULL;
874
875 if (isl_upoly_is_cst(up))
876 return isl_upoly_cst_mul_isl_int(up, v);
877
878 up = isl_upoly_cow(up);
879 rec = isl_upoly_as_rec(up);
880 if (!rec)
881 goto error;
882
883 for (i = 0; i < rec->n; ++i) {
884 rec->p[i] = isl_upoly_mul_isl_int(rec->p[i], v);
885 if (!rec->p[i])
886 goto error;
887 }
888
889 return up;
890 error:
891 isl_upoly_free(up);
892 return NULL;
893 }
894
895 /* Multiply the constant polynomial "up" by "v".
896 */
897 static __isl_give struct isl_upoly *isl_upoly_cst_scale_val(
898 __isl_take struct isl_upoly *up, __isl_keep isl_val *v)
899 {
900 struct isl_upoly_cst *cst;
901
902 if (isl_upoly_is_zero(up))
903 return up;
904
905 up = isl_upoly_cow(up);
906 if (!up)
907 return NULL;
908
909 cst = isl_upoly_as_cst(up);
910
911 isl_int_mul(cst->n, cst->n, v->n);
912 isl_int_mul(cst->d, cst->d, v->d);
913 isl_upoly_cst_reduce(cst);
914
915 return up;
916 }
917
918 /* Multiply the polynomial "up" by "v".
919 */
920 static __isl_give struct isl_upoly *isl_upoly_scale_val(
921 __isl_take struct isl_upoly *up, __isl_keep isl_val *v)
922 {
923 int i;
924 struct isl_upoly_rec *rec;
925
926 if (!up)
927 return NULL;
928
929 if (isl_upoly_is_cst(up))
930 return isl_upoly_cst_scale_val(up, v);
931
932 up = isl_upoly_cow(up);
933 rec = isl_upoly_as_rec(up);
934 if (!rec)
935 goto error;
936
937 for (i = 0; i < rec->n; ++i) {
938 rec->p[i] = isl_upoly_scale_val(rec->p[i], v);
939 if (!rec->p[i])
940 goto error;
941 }
942
943 return up;
944 error:
945 isl_upoly_free(up);
946 return NULL;
947 }
948
949 __isl_give struct isl_upoly *isl_upoly_mul_cst(__isl_take struct isl_upoly *up1,
950 __isl_take struct isl_upoly *up2)
951 {
952 struct isl_upoly_cst *cst1;
953 struct isl_upoly_cst *cst2;
954
955 up1 = isl_upoly_cow(up1);
956 if (!up1 || !up2)
957 goto error;
958
959 cst1 = isl_upoly_as_cst(up1);
960 cst2 = isl_upoly_as_cst(up2);
961
962 isl_int_mul(cst1->n, cst1->n, cst2->n);
963 isl_int_mul(cst1->d, cst1->d, cst2->d);
964
965 isl_upoly_cst_reduce(cst1);
966
967 isl_upoly_free(up2);
968 return up1;
969 error:
970 isl_upoly_free(up1);
971 isl_upoly_free(up2);
972 return NULL;
973 }
974
975 __isl_give struct isl_upoly *isl_upoly_mul_rec(__isl_take struct isl_upoly *up1,
976 __isl_take struct isl_upoly *up2)
977 {
978 struct isl_upoly_rec *rec1;
979 struct isl_upoly_rec *rec2;
980 struct isl_upoly_rec *res = NULL;
981 int i, j;
982 int size;
983
984 rec1 = isl_upoly_as_rec(up1);
985 rec2 = isl_upoly_as_rec(up2);
986 if (!rec1 || !rec2)
987 goto error;
988 size = rec1->n + rec2->n - 1;
989 res = isl_upoly_alloc_rec(up1->ctx, up1->var, size);
990 if (!res)
991 goto error;
992
993 for (i = 0; i < rec1->n; ++i) {
994 res->p[i] = isl_upoly_mul(isl_upoly_copy(rec2->p[0]),
995 isl_upoly_copy(rec1->p[i]));
996 if (!res->p[i])
997 goto error;
998 res->n++;
999 }
1000 for (; i < size; ++i) {
1001 res->p[i] = isl_upoly_zero(up1->ctx);
1002 if (!res->p[i])
1003 goto error;
1004 res->n++;
1005 }
1006 for (i = 0; i < rec1->n; ++i) {
1007 for (j = 1; j < rec2->n; ++j) {
1008 struct isl_upoly *up;
1009 up = isl_upoly_mul(isl_upoly_copy(rec2->p[j]),
1010 isl_upoly_copy(rec1->p[i]));
1011 res->p[i + j] = isl_upoly_sum(res->p[i + j], up);
1012 if (!res->p[i + j])
1013 goto error;
1014 }
1015 }
1016
1017 isl_upoly_free(up1);
1018 isl_upoly_free(up2);
1019
1020 return &res->up;
1021 error:
1022 isl_upoly_free(up1);
1023 isl_upoly_free(up2);
1024 isl_upoly_free(&res->up);
1025 return NULL;
1026 }
1027
1028 __isl_give struct isl_upoly *isl_upoly_mul(__isl_take struct isl_upoly *up1,
1029 __isl_take struct isl_upoly *up2)
1030 {
1031 if (!up1 || !up2)
1032 goto error;
1033
1034 if (isl_upoly_is_nan(up1)) {
1035 isl_upoly_free(up2);
1036 return up1;
1037 }
1038
1039 if (isl_upoly_is_nan(up2)) {
1040 isl_upoly_free(up1);
1041 return up2;
1042 }
1043
1044 if (isl_upoly_is_zero(up1)) {
1045 isl_upoly_free(up2);
1046 return up1;
1047 }
1048
1049 if (isl_upoly_is_zero(up2)) {
1050 isl_upoly_free(up1);
1051 return up2;
1052 }
1053
1054 if (isl_upoly_is_one(up1)) {
1055 isl_upoly_free(up1);
1056 return up2;
1057 }
1058
1059 if (isl_upoly_is_one(up2)) {
1060 isl_upoly_free(up2);
1061 return up1;
1062 }
1063
1064 if (up1->var < up2->var)
1065 return isl_upoly_mul(up2, up1);
1066
1067 if (up2->var < up1->var) {
1068 int i;
1069 struct isl_upoly_rec *rec;
1070 if (isl_upoly_is_infty(up2) || isl_upoly_is_neginfty(up2)) {
1071 isl_ctx *ctx = up1->ctx;
1072 isl_upoly_free(up1);
1073 isl_upoly_free(up2);
1074 return isl_upoly_nan(ctx);
1075 }
1076 up1 = isl_upoly_cow(up1);
1077 rec = isl_upoly_as_rec(up1);
1078 if (!rec)
1079 goto error;
1080
1081 for (i = 0; i < rec->n; ++i) {
1082 rec->p[i] = isl_upoly_mul(rec->p[i],
1083 isl_upoly_copy(up2));
1084 if (!rec->p[i])
1085 goto error;
1086 }
1087 isl_upoly_free(up2);
1088 return up1;
1089 }
1090
1091 if (isl_upoly_is_cst(up1))
1092 return isl_upoly_mul_cst(up1, up2);
1093
1094 return isl_upoly_mul_rec(up1, up2);
1095 error:
1096 isl_upoly_free(up1);
1097 isl_upoly_free(up2);
1098 return NULL;
1099 }
1100
1101 __isl_give struct isl_upoly *isl_upoly_pow(__isl_take struct isl_upoly *up,
1102 unsigned power)
1103 {
1104 struct isl_upoly *res;
1105
1106 if (!up)
1107 return NULL;
1108 if (power == 1)
1109 return up;
1110
1111 if (power % 2)
1112 res = isl_upoly_copy(up);
1113 else
1114 res = isl_upoly_one(up->ctx);
1115
1116 while (power >>= 1) {
1117 up = isl_upoly_mul(up, isl_upoly_copy(up));
1118 if (power % 2)
1119 res = isl_upoly_mul(res, isl_upoly_copy(up));
1120 }
1121
1122 isl_upoly_free(up);
1123 return res;
1124 }
1125
1126 __isl_give isl_qpolynomial *isl_qpolynomial_alloc(__isl_take isl_space *dim,
1127 unsigned n_div, __isl_take struct isl_upoly *up)
1128 {
1129 struct isl_qpolynomial *qp = NULL;
1130 unsigned total;
1131
1132 if (!dim || !up)
1133 goto error;
1134
1135 if (!isl_space_is_set(dim))
1136 isl_die(isl_space_get_ctx(dim), isl_error_invalid,
1137 "domain of polynomial should be a set", goto error);
1138
1139 total = isl_space_dim(dim, isl_dim_all);
1140
1141 qp = isl_calloc_type(dim->ctx, struct isl_qpolynomial);
1142 if (!qp)
1143 goto error;
1144
1145 qp->ref = 1;
1146 qp->div = isl_mat_alloc(dim->ctx, n_div, 1 + 1 + total + n_div);
1147 if (!qp->div)
1148 goto error;
1149
1150 qp->dim = dim;
1151 qp->upoly = up;
1152
1153 return qp;
1154 error:
1155 isl_space_free(dim);
1156 isl_upoly_free(up);
1157 isl_qpolynomial_free(qp);
1158 return NULL;
1159 }
1160
1161 __isl_give isl_qpolynomial *isl_qpolynomial_copy(__isl_keep isl_qpolynomial *qp)
1162 {
1163 if (!qp)
1164 return NULL;
1165
1166 qp->ref++;
1167 return qp;
1168 }
1169
1170 __isl_give isl_qpolynomial *isl_qpolynomial_dup(__isl_keep isl_qpolynomial *qp)
1171 {
1172 struct isl_qpolynomial *dup;
1173
1174 if (!qp)
1175 return NULL;
1176
1177 dup = isl_qpolynomial_alloc(isl_space_copy(qp->dim), qp->div->n_row,
1178 isl_upoly_copy(qp->upoly));
1179 if (!dup)
1180 return NULL;
1181 isl_mat_free(dup->div);
1182 dup->div = isl_mat_copy(qp->div);
1183 if (!dup->div)
1184 goto error;
1185
1186 return dup;
1187 error:
1188 isl_qpolynomial_free(dup);
1189 return NULL;
1190 }
1191
1192 __isl_give isl_qpolynomial *isl_qpolynomial_cow(__isl_take isl_qpolynomial *qp)
1193 {
1194 if (!qp)
1195 return NULL;
1196
1197 if (qp->ref == 1)
1198 return qp;
1199 qp->ref--;
1200 return isl_qpolynomial_dup(qp);
1201 }
1202
1203 __isl_null isl_qpolynomial *isl_qpolynomial_free(
1204 __isl_take isl_qpolynomial *qp)
1205 {
1206 if (!qp)
1207 return NULL;
1208
1209 if (--qp->ref > 0)
1210 return NULL;
1211
1212 isl_space_free(qp->dim);
1213 isl_mat_free(qp->div);
1214 isl_upoly_free(qp->upoly);
1215
1216 free(qp);
1217 return NULL;
1218 }
1219
1220 __isl_give struct isl_upoly *isl_upoly_var_pow(isl_ctx *ctx, int pos, int power)
1221 {
1222 int i;
1223 struct isl_upoly_rec *rec;
1224 struct isl_upoly_cst *cst;
1225
1226 rec = isl_upoly_alloc_rec(ctx, pos, 1 + power);
1227 if (!rec)
1228 return NULL;
1229 for (i = 0; i < 1 + power; ++i) {
1230 rec->p[i] = isl_upoly_zero(ctx);
1231 if (!rec->p[i])
1232 goto error;
1233 rec->n++;
1234 }
1235 cst = isl_upoly_as_cst(rec->p[power]);
1236 isl_int_set_si(cst->n, 1);
1237
1238 return &rec->up;
1239 error:
1240 isl_upoly_free(&rec->up);
1241 return NULL;
1242 }
1243
1244 /* r array maps original positions to new positions.
1245 */
1246 static __isl_give struct isl_upoly *reorder(__isl_take struct isl_upoly *up,
1247 int *r)
1248 {
1249 int i;
1250 struct isl_upoly_rec *rec;
1251 struct isl_upoly *base;
1252 struct isl_upoly *res;
1253
1254 if (isl_upoly_is_cst(up))
1255 return up;
1256
1257 rec = isl_upoly_as_rec(up);
1258 if (!rec)
1259 goto error;
1260
1261 isl_assert(up->ctx, rec->n >= 1, goto error);
1262
1263 base = isl_upoly_var_pow(up->ctx, r[up->var], 1);
1264 res = reorder(isl_upoly_copy(rec->p[rec->n - 1]), r);
1265
1266 for (i = rec->n - 2; i >= 0; --i) {
1267 res = isl_upoly_mul(res, isl_upoly_copy(base));
1268 res = isl_upoly_sum(res, reorder(isl_upoly_copy(rec->p[i]), r));
1269 }
1270
1271 isl_upoly_free(base);
1272 isl_upoly_free(up);
1273
1274 return res;
1275 error:
1276 isl_upoly_free(up);
1277 return NULL;
1278 }
1279
1280 static isl_bool compatible_divs(__isl_keep isl_mat *div1,
1281 __isl_keep isl_mat *div2)
1282 {
1283 int n_row, n_col;
1284 isl_bool equal;
1285
1286 isl_assert(div1->ctx, div1->n_row >= div2->n_row &&
1287 div1->n_col >= div2->n_col,
1288 return isl_bool_error);
1289
1290 if (div1->n_row == div2->n_row)
1291 return isl_mat_is_equal(div1, div2);
1292
1293 n_row = div1->n_row;
1294 n_col = div1->n_col;
1295 div1->n_row = div2->n_row;
1296 div1->n_col = div2->n_col;
1297
1298 equal = isl_mat_is_equal(div1, div2);
1299
1300 div1->n_row = n_row;
1301 div1->n_col = n_col;
1302
1303 return equal;
1304 }
1305
1306 static int cmp_row(__isl_keep isl_mat *div, int i, int j)
1307 {
1308 int li, lj;
1309
1310 li = isl_seq_last_non_zero(div->row[i], div->n_col);
1311 lj = isl_seq_last_non_zero(div->row[j], div->n_col);
1312
1313 if (li != lj)
1314 return li - lj;
1315
1316 return isl_seq_cmp(div->row[i], div->row[j], div->n_col);
1317 }
1318
1319 struct isl_div_sort_info {
1320 isl_mat *div;
1321 int row;
1322 };
1323
1324 static int div_sort_cmp(const void *p1, const void *p2)
1325 {
1326 const struct isl_div_sort_info *i1, *i2;
1327 i1 = (const struct isl_div_sort_info *) p1;
1328 i2 = (const struct isl_div_sort_info *) p2;
1329
1330 return cmp_row(i1->div, i1->row, i2->row);
1331 }
1332
1333 /* Sort divs and remove duplicates.
1334 */
1335 static __isl_give isl_qpolynomial *sort_divs(__isl_take isl_qpolynomial *qp)
1336 {
1337 int i;
1338 int skip;
1339 int len;
1340 struct isl_div_sort_info *array = NULL;
1341 int *pos = NULL, *at = NULL;
1342 int *reordering = NULL;
1343 unsigned div_pos;
1344
1345 if (!qp)
1346 return NULL;
1347 if (qp->div->n_row <= 1)
1348 return qp;
1349
1350 div_pos = isl_space_dim(qp->dim, isl_dim_all);
1351
1352 array = isl_alloc_array(qp->div->ctx, struct isl_div_sort_info,
1353 qp->div->n_row);
1354 pos = isl_alloc_array(qp->div->ctx, int, qp->div->n_row);
1355 at = isl_alloc_array(qp->div->ctx, int, qp->div->n_row);
1356 len = qp->div->n_col - 2;
1357 reordering = isl_alloc_array(qp->div->ctx, int, len);
1358 if (!array || !pos || !at || !reordering)
1359 goto error;
1360
1361 for (i = 0; i < qp->div->n_row; ++i) {
1362 array[i].div = qp->div;
1363 array[i].row = i;
1364 pos[i] = i;
1365 at[i] = i;
1366 }
1367
1368 qsort(array, qp->div->n_row, sizeof(struct isl_div_sort_info),
1369 div_sort_cmp);
1370
1371 for (i = 0; i < div_pos; ++i)
1372 reordering[i] = i;
1373
1374 for (i = 0; i < qp->div->n_row; ++i) {
1375 if (pos[array[i].row] == i)
1376 continue;
1377 qp->div = isl_mat_swap_rows(qp->div, i, pos[array[i].row]);
1378 pos[at[i]] = pos[array[i].row];
1379 at[pos[array[i].row]] = at[i];
1380 at[i] = array[i].row;
1381 pos[array[i].row] = i;
1382 }
1383
1384 skip = 0;
1385 for (i = 0; i < len - div_pos; ++i) {
1386 if (i > 0 &&
1387 isl_seq_eq(qp->div->row[i - skip - 1],
1388 qp->div->row[i - skip], qp->div->n_col)) {
1389 qp->div = isl_mat_drop_rows(qp->div, i - skip, 1);
1390 isl_mat_col_add(qp->div, 2 + div_pos + i - skip - 1,
1391 2 + div_pos + i - skip);
1392 qp->div = isl_mat_drop_cols(qp->div,
1393 2 + div_pos + i - skip, 1);
1394 skip++;
1395 }
1396 reordering[div_pos + array[i].row] = div_pos + i - skip;
1397 }
1398
1399 qp->upoly = reorder(qp->upoly, reordering);
1400
1401 if (!qp->upoly || !qp->div)
1402 goto error;
1403
1404 free(at);
1405 free(pos);
1406 free(array);
1407 free(reordering);
1408
1409 return qp;
1410 error:
1411 free(at);
1412 free(pos);
1413 free(array);
1414 free(reordering);
1415 isl_qpolynomial_free(qp);
1416 return NULL;
1417 }
1418
1419 static __isl_give struct isl_upoly *expand(__isl_take struct isl_upoly *up,
1420 int *exp, int first)
1421 {
1422 int i;
1423 struct isl_upoly_rec *rec;
1424
1425 if (isl_upoly_is_cst(up))
1426 return up;
1427
1428 if (up->var < first)
1429 return up;
1430
1431 if (exp[up->var - first] == up->var - first)
1432 return up;
1433
1434 up = isl_upoly_cow(up);
1435 if (!up)
1436 goto error;
1437
1438 up->var = exp[up->var - first] + first;
1439
1440 rec = isl_upoly_as_rec(up);
1441 if (!rec)
1442 goto error;
1443
1444 for (i = 0; i < rec->n; ++i) {
1445 rec->p[i] = expand(rec->p[i], exp, first);
1446 if (!rec->p[i])
1447 goto error;
1448 }
1449
1450 return up;
1451 error:
1452 isl_upoly_free(up);
1453 return NULL;
1454 }
1455
1456 static __isl_give isl_qpolynomial *with_merged_divs(
1457 __isl_give isl_qpolynomial *(*fn)(__isl_take isl_qpolynomial *qp1,
1458 __isl_take isl_qpolynomial *qp2),
1459 __isl_take isl_qpolynomial *qp1, __isl_take isl_qpolynomial *qp2)
1460 {
1461 int *exp1 = NULL;
1462 int *exp2 = NULL;
1463 isl_mat *div = NULL;
1464 int n_div1, n_div2;
1465
1466 qp1 = isl_qpolynomial_cow(qp1);
1467 qp2 = isl_qpolynomial_cow(qp2);
1468
1469 if (!qp1 || !qp2)
1470 goto error;
1471
1472 isl_assert(qp1->div->ctx, qp1->div->n_row >= qp2->div->n_row &&
1473 qp1->div->n_col >= qp2->div->n_col, goto error);
1474
1475 n_div1 = qp1->div->n_row;
1476 n_div2 = qp2->div->n_row;
1477 exp1 = isl_alloc_array(qp1->div->ctx, int, n_div1);
1478 exp2 = isl_alloc_array(qp2->div->ctx, int, n_div2);
1479 if ((n_div1 && !exp1) || (n_div2 && !exp2))
1480 goto error;
1481
1482 div = isl_merge_divs(qp1->div, qp2->div, exp1, exp2);
1483 if (!div)
1484 goto error;
1485
1486 isl_mat_free(qp1->div);
1487 qp1->div = isl_mat_copy(div);
1488 isl_mat_free(qp2->div);
1489 qp2->div = isl_mat_copy(div);
1490
1491 qp1->upoly = expand(qp1->upoly, exp1, div->n_col - div->n_row - 2);
1492 qp2->upoly = expand(qp2->upoly, exp2, div->n_col - div->n_row - 2);
1493
1494 if (!qp1->upoly || !qp2->upoly)
1495 goto error;
1496
1497 isl_mat_free(div);
1498 free(exp1);
1499 free(exp2);
1500
1501 return fn(qp1, qp2);
1502 error:
1503 isl_mat_free(div);
1504 free(exp1);
1505 free(exp2);
1506 isl_qpolynomial_free(qp1);
1507 isl_qpolynomial_free(qp2);
1508 return NULL;
1509 }
1510
1511 __isl_give isl_qpolynomial *isl_qpolynomial_add(__isl_take isl_qpolynomial *qp1,
1512 __isl_take isl_qpolynomial *qp2)
1513 {
1514 isl_bool compatible;
1515
1516 qp1 = isl_qpolynomial_cow(qp1);
1517
1518 if (!qp1 || !qp2)
1519 goto error;
1520
1521 if (qp1->div->n_row < qp2->div->n_row)
1522 return isl_qpolynomial_add(qp2, qp1);
1523
1524 isl_assert(qp1->dim->ctx, isl_space_is_equal(qp1->dim, qp2->dim), goto error);
1525 compatible = compatible_divs(qp1->div, qp2->div);
1526 if (compatible < 0)
1527 goto error;
1528 if (!compatible)
1529 return with_merged_divs(isl_qpolynomial_add, qp1, qp2);
1530
1531 qp1->upoly = isl_upoly_sum(qp1->upoly, isl_upoly_copy(qp2->upoly));
1532 if (!qp1->upoly)
1533 goto error;
1534
1535 isl_qpolynomial_free(qp2);
1536
1537 return qp1;
1538 error:
1539 isl_qpolynomial_free(qp1);
1540 isl_qpolynomial_free(qp2);
1541 return NULL;
1542 }
1543
1544 __isl_give isl_qpolynomial *isl_qpolynomial_add_on_domain(
1545 __isl_keep isl_set *dom,
1546 __isl_take isl_qpolynomial *qp1,
1547 __isl_take isl_qpolynomial *qp2)
1548 {
1549 qp1 = isl_qpolynomial_add(qp1, qp2);
1550 qp1 = isl_qpolynomial_gist(qp1, isl_set_copy(dom));
1551 return qp1;
1552 }
1553
1554 __isl_give isl_qpolynomial *isl_qpolynomial_sub(__isl_take isl_qpolynomial *qp1,
1555 __isl_take isl_qpolynomial *qp2)
1556 {
1557 return isl_qpolynomial_add(qp1, isl_qpolynomial_neg(qp2));
1558 }
1559
1560 __isl_give isl_qpolynomial *isl_qpolynomial_add_isl_int(
1561 __isl_take isl_qpolynomial *qp, isl_int v)
1562 {
1563 if (isl_int_is_zero(v))
1564 return qp;
1565
1566 qp = isl_qpolynomial_cow(qp);
1567 if (!qp)
1568 return NULL;
1569
1570 qp->upoly = isl_upoly_add_isl_int(qp->upoly, v);
1571 if (!qp->upoly)
1572 goto error;
1573
1574 return qp;
1575 error:
1576 isl_qpolynomial_free(qp);
1577 return NULL;
1578
1579 }
1580
1581 __isl_give isl_qpolynomial *isl_qpolynomial_neg(__isl_take isl_qpolynomial *qp)
1582 {
1583 if (!qp)
1584 return NULL;
1585
1586 return isl_qpolynomial_mul_isl_int(qp, qp->dim->ctx->negone);
1587 }
1588
1589 __isl_give isl_qpolynomial *isl_qpolynomial_mul_isl_int(
1590 __isl_take isl_qpolynomial *qp, isl_int v)
1591 {
1592 if (isl_int_is_one(v))
1593 return qp;
1594
1595 if (qp && isl_int_is_zero(v)) {
1596 isl_qpolynomial *zero;
1597 zero = isl_qpolynomial_zero_on_domain(isl_space_copy(qp->dim));
1598 isl_qpolynomial_free(qp);
1599 return zero;
1600 }
1601
1602 qp = isl_qpolynomial_cow(qp);
1603 if (!qp)
1604 return NULL;
1605
1606 qp->upoly = isl_upoly_mul_isl_int(qp->upoly, v);
1607 if (!qp->upoly)
1608 goto error;
1609
1610 return qp;
1611 error:
1612 isl_qpolynomial_free(qp);
1613 return NULL;
1614 }
1615
1616 __isl_give isl_qpolynomial *isl_qpolynomial_scale(
1617 __isl_take isl_qpolynomial *qp, isl_int v)
1618 {
1619 return isl_qpolynomial_mul_isl_int(qp, v);
1620 }
1621
1622 /* Multiply "qp" by "v".
1623 */
1624 __isl_give isl_qpolynomial *isl_qpolynomial_scale_val(
1625 __isl_take isl_qpolynomial *qp, __isl_take isl_val *v)
1626 {
1627 if (!qp || !v)
1628 goto error;
1629
1630 if (!isl_val_is_rat(v))
1631 isl_die(isl_qpolynomial_get_ctx(qp), isl_error_invalid,
1632 "expecting rational factor", goto error);
1633
1634 if (isl_val_is_one(v)) {
1635 isl_val_free(v);
1636 return qp;
1637 }
1638
1639 if (isl_val_is_zero(v)) {
1640 isl_space *space;
1641
1642 space = isl_qpolynomial_get_domain_space(qp);
1643 isl_qpolynomial_free(qp);
1644 isl_val_free(v);
1645 return isl_qpolynomial_zero_on_domain(space);
1646 }
1647
1648 qp = isl_qpolynomial_cow(qp);
1649 if (!qp)
1650 goto error;
1651
1652 qp->upoly = isl_upoly_scale_val(qp->upoly, v);
1653 if (!qp->upoly)
1654 qp = isl_qpolynomial_free(qp);
1655
1656 isl_val_free(v);
1657 return qp;
1658 error:
1659 isl_val_free(v);
1660 isl_qpolynomial_free(qp);
1661 return NULL;
1662 }
1663
1664 /* Divide "qp" by "v".
1665 */
1666 __isl_give isl_qpolynomial *isl_qpolynomial_scale_down_val(
1667 __isl_take isl_qpolynomial *qp, __isl_take isl_val *v)
1668 {
1669 if (!qp || !v)
1670 goto error;
1671
1672 if (!isl_val_is_rat(v))
1673 isl_die(isl_qpolynomial_get_ctx(qp), isl_error_invalid,
1674 "expecting rational factor", goto error);
1675 if (isl_val_is_zero(v))
1676 isl_die(isl_val_get_ctx(v), isl_error_invalid,
1677 "cannot scale down by zero", goto error);
1678
1679 return isl_qpolynomial_scale_val(qp, isl_val_inv(v));
1680 error:
1681 isl_val_free(v);
1682 isl_qpolynomial_free(qp);
1683 return NULL;
1684 }
1685
1686 __isl_give isl_qpolynomial *isl_qpolynomial_mul(__isl_take isl_qpolynomial *qp1,
1687 __isl_take isl_qpolynomial *qp2)
1688 {
1689 isl_bool compatible;
1690
1691 qp1 = isl_qpolynomial_cow(qp1);
1692
1693 if (!qp1 || !qp2)
1694 goto error;
1695
1696 if (qp1->div->n_row < qp2->div->n_row)
1697 return isl_qpolynomial_mul(qp2, qp1);
1698
1699 isl_assert(qp1->dim->ctx, isl_space_is_equal(qp1->dim, qp2->dim), goto error);
1700 compatible = compatible_divs(qp1->div, qp2->div);
1701 if (compatible < 0)
1702 goto error;
1703 if (!compatible)
1704 return with_merged_divs(isl_qpolynomial_mul, qp1, qp2);
1705
1706 qp1->upoly = isl_upoly_mul(qp1->upoly, isl_upoly_copy(qp2->upoly));
1707 if (!qp1->upoly)
1708 goto error;
1709
1710 isl_qpolynomial_free(qp2);
1711
1712 return qp1;
1713 error:
1714 isl_qpolynomial_free(qp1);
1715 isl_qpolynomial_free(qp2);
1716 return NULL;
1717 }
1718
1719 __isl_give isl_qpolynomial *isl_qpolynomial_pow(__isl_take isl_qpolynomial *qp,
1720 unsigned power)
1721 {
1722 qp = isl_qpolynomial_cow(qp);
1723
1724 if (!qp)
1725 return NULL;
1726
1727 qp->upoly = isl_upoly_pow(qp->upoly, power);
1728 if (!qp->upoly)
1729 goto error;
1730
1731 return qp;
1732 error:
1733 isl_qpolynomial_free(qp);
1734 return NULL;
1735 }
1736
1737 __isl_give isl_pw_qpolynomial *isl_pw_qpolynomial_pow(
1738 __isl_take isl_pw_qpolynomial *pwqp, unsigned power)
1739 {
1740 int i;
1741
1742 if (power == 1)
1743 return pwqp;
1744
1745 pwqp = isl_pw_qpolynomial_cow(pwqp);
1746 if (!pwqp)
1747 return NULL;
1748
1749 for (i = 0; i < pwqp->n; ++i) {
1750 pwqp->p[i].qp = isl_qpolynomial_pow(pwqp->p[i].qp, power);
1751 if (!pwqp->p[i].qp)
1752 return isl_pw_qpolynomial_free(pwqp);
1753 }
1754
1755 return pwqp;
1756 }
1757
1758 __isl_give isl_qpolynomial *isl_qpolynomial_zero_on_domain(
1759 __isl_take isl_space *dim)
1760 {
1761 if (!dim)
1762 return NULL;
1763 return isl_qpolynomial_alloc(dim, 0, isl_upoly_zero(dim->ctx));
1764 }
1765
1766 __isl_give isl_qpolynomial *isl_qpolynomial_one_on_domain(
1767 __isl_take isl_space *dim)
1768 {
1769 if (!dim)
1770 return NULL;
1771 return isl_qpolynomial_alloc(dim, 0, isl_upoly_one(dim->ctx));
1772 }
1773
1774 __isl_give isl_qpolynomial *isl_qpolynomial_infty_on_domain(
1775 __isl_take isl_space *dim)
1776 {
1777 if (!dim)
1778 return NULL;
1779 return isl_qpolynomial_alloc(dim, 0, isl_upoly_infty(dim->ctx));
1780 }
1781
1782 __isl_give isl_qpolynomial *isl_qpolynomial_neginfty_on_domain(
1783 __isl_take isl_space *dim)
1784 {
1785 if (!dim)
1786 return NULL;
1787 return isl_qpolynomial_alloc(dim, 0, isl_upoly_neginfty(dim->ctx));
1788 }
1789
1790 __isl_give isl_qpolynomial *isl_qpolynomial_nan_on_domain(
1791 __isl_take isl_space *dim)
1792 {
1793 if (!dim)
1794 return NULL;
1795 return isl_qpolynomial_alloc(dim, 0, isl_upoly_nan(dim->ctx));
1796 }
1797
1798 __isl_give isl_qpolynomial *isl_qpolynomial_cst_on_domain(
1799 __isl_take isl_space *dim,
1800 isl_int v)
1801 {
1802 struct isl_qpolynomial *qp;
1803 struct isl_upoly_cst *cst;
1804
1805 if (!dim)
1806 return NULL;
1807
1808 qp = isl_qpolynomial_alloc(dim, 0, isl_upoly_zero(dim->ctx));
1809 if (!qp)
1810 return NULL;
1811
1812 cst = isl_upoly_as_cst(qp->upoly);
1813 isl_int_set(cst->n, v);
1814
1815 return qp;
1816 }
1817
1818 int isl_qpolynomial_is_cst(__isl_keep isl_qpolynomial *qp,
1819 isl_int *n, isl_int *d)
1820 {
1821 struct isl_upoly_cst *cst;
1822
1823 if (!qp)
1824 return -1;
1825
1826 if (!isl_upoly_is_cst(qp->upoly))
1827 return 0;
1828
1829 cst = isl_upoly_as_cst(qp->upoly);
1830 if (!cst)
1831 return -1;
1832
1833 if (n)
1834 isl_int_set(*n, cst->n);
1835 if (d)
1836 isl_int_set(*d, cst->d);
1837
1838 return 1;
1839 }
1840
1841 /* Return the constant term of "up".
1842 */
1843 static __isl_give isl_val *isl_upoly_get_constant_val(
1844 __isl_keep struct isl_upoly *up)
1845 {
1846 struct isl_upoly_cst *cst;
1847
1848 if (!up)
1849 return NULL;
1850
1851 while (!isl_upoly_is_cst(up)) {
1852 struct isl_upoly_rec *rec;
1853
1854 rec = isl_upoly_as_rec(up);
1855 if (!rec)
1856 return NULL;
1857 up = rec->p[0];
1858 }
1859
1860 cst = isl_upoly_as_cst(up);
1861 if (!cst)
1862 return NULL;
1863 return isl_val_rat_from_isl_int(cst->up.ctx, cst->n, cst->d);
1864 }
1865
1866 /* Return the constant term of "qp".
1867 */
1868 __isl_give isl_val *isl_qpolynomial_get_constant_val(
1869 __isl_keep isl_qpolynomial *qp)
1870 {
1871 if (!qp)
1872 return NULL;
1873
1874 return isl_upoly_get_constant_val(qp->upoly);
1875 }
1876
1877 int isl_upoly_is_affine(__isl_keep struct isl_upoly *up)
1878 {
1879 int is_cst;
1880 struct isl_upoly_rec *rec;
1881
1882 if (!up)
1883 return -1;
1884
1885 if (up->var < 0)
1886 return 1;
1887
1888 rec = isl_upoly_as_rec(up);
1889 if (!rec)
1890 return -1;
1891
1892 if (rec->n > 2)
1893 return 0;
1894
1895 isl_assert(up->ctx, rec->n > 1, return -1);
1896
1897 is_cst = isl_upoly_is_cst(rec->p[1]);
1898 if (is_cst < 0)
1899 return -1;
1900 if (!is_cst)
1901 return 0;
1902
1903 return isl_upoly_is_affine(rec->p[0]);
1904 }
1905
1906 int isl_qpolynomial_is_affine(__isl_keep isl_qpolynomial *qp)
1907 {
1908 if (!qp)
1909 return -1;
1910
1911 if (qp->div->n_row > 0)
1912 return 0;
1913
1914 return isl_upoly_is_affine(qp->upoly);
1915 }
1916
1917 static void update_coeff(__isl_keep isl_vec *aff,
1918 __isl_keep struct isl_upoly_cst *cst, int pos)
1919 {
1920 isl_int gcd;
1921 isl_int f;
1922
1923 if (isl_int_is_zero(cst->n))
1924 return;
1925
1926 isl_int_init(gcd);
1927 isl_int_init(f);
1928 isl_int_gcd(gcd, cst->d, aff->el[0]);
1929 isl_int_divexact(f, cst->d, gcd);
1930 isl_int_divexact(gcd, aff->el[0], gcd);
1931 isl_seq_scale(aff->el, aff->el, f, aff->size);
1932 isl_int_mul(aff->el[1 + pos], gcd, cst->n);
1933 isl_int_clear(gcd);
1934 isl_int_clear(f);
1935 }
1936
1937 int isl_upoly_update_affine(__isl_keep struct isl_upoly *up,
1938 __isl_keep isl_vec *aff)
1939 {
1940 struct isl_upoly_cst *cst;
1941 struct isl_upoly_rec *rec;
1942
1943 if (!up || !aff)
1944 return -1;
1945
1946 if (up->var < 0) {
1947 struct isl_upoly_cst *cst;
1948
1949 cst = isl_upoly_as_cst(up);
1950 if (!cst)
1951 return -1;
1952 update_coeff(aff, cst, 0);
1953 return 0;
1954 }
1955
1956 rec = isl_upoly_as_rec(up);
1957 if (!rec)
1958 return -1;
1959 isl_assert(up->ctx, rec->n == 2, return -1);
1960
1961 cst = isl_upoly_as_cst(rec->p[1]);
1962 if (!cst)
1963 return -1;
1964 update_coeff(aff, cst, 1 + up->var);
1965
1966 return isl_upoly_update_affine(rec->p[0], aff);
1967 }
1968
1969 __isl_give isl_vec *isl_qpolynomial_extract_affine(
1970 __isl_keep isl_qpolynomial *qp)
1971 {
1972 isl_vec *aff;
1973 unsigned d;
1974
1975 if (!qp)
1976 return NULL;
1977
1978 d = isl_space_dim(qp->dim, isl_dim_all);
1979 aff = isl_vec_alloc(qp->div->ctx, 2 + d + qp->div->n_row);
1980 if (!aff)
1981 return NULL;
1982
1983 isl_seq_clr(aff->el + 1, 1 + d + qp->div->n_row);
1984 isl_int_set_si(aff->el[0], 1);
1985
1986 if (isl_upoly_update_affine(qp->upoly, aff) < 0)
1987 goto error;
1988
1989 return aff;
1990 error:
1991 isl_vec_free(aff);
1992 return NULL;
1993 }
1994
1995 /* Compare two quasi-polynomials.
1996 *
1997 * Return -1 if "qp1" is "smaller" than "qp2", 1 if "qp1" is "greater"
1998 * than "qp2" and 0 if they are equal.
1999 */
2000 int isl_qpolynomial_plain_cmp(__isl_keep isl_qpolynomial *qp1,
2001 __isl_keep isl_qpolynomial *qp2)
2002 {
2003 int cmp;
2004
2005 if (qp1 == qp2)
2006 return 0;
2007 if (!qp1)
2008 return -1;
2009 if (!qp2)
2010 return 1;
2011
2012 cmp = isl_space_cmp(qp1->dim, qp2->dim);
2013 if (cmp != 0)
2014 return cmp;
2015
2016 cmp = isl_local_cmp(qp1->div, qp2->div);
2017 if (cmp != 0)
2018 return cmp;
2019
2020 return isl_upoly_plain_cmp(qp1->upoly, qp2->upoly);
2021 }
2022
2023 /* Is "qp1" obviously equal to "qp2"?
2024 *
2025 * NaN is not equal to anything, not even to another NaN.
2026 */
2027 isl_bool isl_qpolynomial_plain_is_equal(__isl_keep isl_qpolynomial *qp1,
2028 __isl_keep isl_qpolynomial *qp2)
2029 {
2030 isl_bool equal;
2031
2032 if (!qp1 || !qp2)
2033 return isl_bool_error;
2034
2035 if (isl_qpolynomial_is_nan(qp1) || isl_qpolynomial_is_nan(qp2))
2036 return isl_bool_false;
2037
2038 equal = isl_space_is_equal(qp1->dim, qp2->dim);
2039 if (equal < 0 || !equal)
2040 return equal;
2041
2042 equal = isl_mat_is_equal(qp1->div, qp2->div);
2043 if (equal < 0 || !equal)
2044 return equal;
2045
2046 return isl_upoly_is_equal(qp1->upoly, qp2->upoly);
2047 }
2048
2049 static void upoly_update_den(__isl_keep struct isl_upoly *up, isl_int *d)
2050 {
2051 int i;
2052 struct isl_upoly_rec *rec;
2053
2054 if (isl_upoly_is_cst(up)) {
2055 struct isl_upoly_cst *cst;
2056 cst = isl_upoly_as_cst(up);
2057 if (!cst)
2058 return;
2059 isl_int_lcm(*d, *d, cst->d);
2060 return;
2061 }
2062
2063 rec = isl_upoly_as_rec(up);
2064 if (!rec)
2065 return;
2066
2067 for (i = 0; i < rec->n; ++i)
2068 upoly_update_den(rec->p[i], d);
2069 }
2070
2071 void isl_qpolynomial_get_den(__isl_keep isl_qpolynomial *qp, isl_int *d)
2072 {
2073 isl_int_set_si(*d, 1);
2074 if (!qp)
2075 return;
2076 upoly_update_den(qp->upoly, d);
2077 }
2078
2079 __isl_give isl_qpolynomial *isl_qpolynomial_var_pow_on_domain(
2080 __isl_take isl_space *dim, int pos, int power)
2081 {
2082 struct isl_ctx *ctx;
2083
2084 if (!dim)
2085 return NULL;
2086
2087 ctx = dim->ctx;
2088
2089 return isl_qpolynomial_alloc(dim, 0, isl_upoly_var_pow(ctx, pos, power));
2090 }
2091
2092 __isl_give isl_qpolynomial *isl_qpolynomial_var_on_domain(__isl_take isl_space *dim,
2093 enum isl_dim_type type, unsigned pos)
2094 {
2095 if (!dim)
2096 return NULL;
2097
2098 isl_assert(dim->ctx, isl_space_dim(dim, isl_dim_in) == 0, goto error);
2099 isl_assert(dim->ctx, pos < isl_space_dim(dim, type), goto error);
2100
2101 if (type == isl_dim_set)
2102 pos += isl_space_dim(dim, isl_dim_param);
2103
2104 return isl_qpolynomial_var_pow_on_domain(dim, pos, 1);
2105 error:
2106 isl_space_free(dim);
2107 return NULL;
2108 }
2109
2110 __isl_give struct isl_upoly *isl_upoly_subs(__isl_take struct isl_upoly *up,
2111 unsigned first, unsigned n, __isl_keep struct isl_upoly **subs)
2112 {
2113 int i;
2114 struct isl_upoly_rec *rec;
2115 struct isl_upoly *base, *res;
2116
2117 if (!up)
2118 return NULL;
2119
2120 if (isl_upoly_is_cst(up))
2121 return up;
2122
2123 if (up->var < first)
2124 return up;
2125
2126 rec = isl_upoly_as_rec(up);
2127 if (!rec)
2128 goto error;
2129
2130 isl_assert(up->ctx, rec->n >= 1, goto error);
2131
2132 if (up->var >= first + n)
2133 base = isl_upoly_var_pow(up->ctx, up->var, 1);
2134 else
2135 base = isl_upoly_copy(subs[up->var - first]);
2136
2137 res = isl_upoly_subs(isl_upoly_copy(rec->p[rec->n - 1]), first, n, subs);
2138 for (i = rec->n - 2; i >= 0; --i) {
2139 struct isl_upoly *t;
2140 t = isl_upoly_subs(isl_upoly_copy(rec->p[i]), first, n, subs);
2141 res = isl_upoly_mul(res, isl_upoly_copy(base));
2142 res = isl_upoly_sum(res, t);
2143 }
2144
2145 isl_upoly_free(base);
2146 isl_upoly_free(up);
2147
2148 return res;
2149 error:
2150 isl_upoly_free(up);
2151 return NULL;
2152 }
2153
2154 __isl_give struct isl_upoly *isl_upoly_from_affine(isl_ctx *ctx, isl_int *f,
2155 isl_int denom, unsigned len)
2156 {
2157 int i;
2158 struct isl_upoly *up;
2159
2160 isl_assert(ctx, len >= 1, return NULL);
2161
2162 up = isl_upoly_rat_cst(ctx, f[0], denom);
2163 for (i = 0; i < len - 1; ++i) {
2164 struct isl_upoly *t;
2165 struct isl_upoly *c;
2166
2167 if (isl_int_is_zero(f[1 + i]))
2168 continue;
2169
2170 c = isl_upoly_rat_cst(ctx, f[1 + i], denom);
2171 t = isl_upoly_var_pow(ctx, i, 1);
2172 t = isl_upoly_mul(c, t);
2173 up = isl_upoly_sum(up, t);
2174 }
2175
2176 return up;
2177 }
2178
2179 /* Remove common factor of non-constant terms and denominator.
2180 */
2181 static void normalize_div(__isl_keep isl_qpolynomial *qp, int div)
2182 {
2183 isl_ctx *ctx = qp->div->ctx;
2184 unsigned total = qp->div->n_col - 2;
2185
2186 isl_seq_gcd(qp->div->row[div] + 2, total, &ctx->normalize_gcd);
2187 isl_int_gcd(ctx->normalize_gcd,
2188 ctx->normalize_gcd, qp->div->row[div][0]);
2189 if (isl_int_is_one(ctx->normalize_gcd))
2190 return;
2191
2192 isl_seq_scale_down(qp->div->row[div] + 2, qp->div->row[div] + 2,
2193 ctx->normalize_gcd, total);
2194 isl_int_divexact(qp->div->row[div][0], qp->div->row[div][0],
2195 ctx->normalize_gcd);
2196 isl_int_fdiv_q(qp->div->row[div][1], qp->div->row[div][1],
2197 ctx->normalize_gcd);
2198 }
2199
2200 /* Replace the integer division identified by "div" by the polynomial "s".
2201 * The integer division is assumed not to appear in the definition
2202 * of any other integer divisions.
2203 */
2204 static __isl_give isl_qpolynomial *substitute_div(
2205 __isl_take isl_qpolynomial *qp,
2206 int div, __isl_take struct isl_upoly *s)
2207 {
2208 int i;
2209 int total;
2210 int *reordering;
2211
2212 if (!qp || !s)
2213 goto error;
2214
2215 qp = isl_qpolynomial_cow(qp);
2216 if (!qp)
2217 goto error;
2218
2219 total = isl_space_dim(qp->dim, isl_dim_all);
2220 qp->upoly = isl_upoly_subs(qp->upoly, total + div, 1, &s);
2221 if (!qp->upoly)
2222 goto error;
2223
2224 reordering = isl_alloc_array(qp->dim->ctx, int, total + qp->div->n_row);
2225 if (!reordering)
2226 goto error;
2227 for (i = 0; i < total + div; ++i)
2228 reordering[i] = i;
2229 for (i = total + div + 1; i < total + qp->div->n_row; ++i)
2230 reordering[i] = i - 1;
2231 qp->div = isl_mat_drop_rows(qp->div, div, 1);
2232 qp->div = isl_mat_drop_cols(qp->div, 2 + total + div, 1);
2233 qp->upoly = reorder(qp->upoly, reordering);
2234 free(reordering);
2235
2236 if (!qp->upoly || !qp->div)
2237 goto error;
2238
2239 isl_upoly_free(s);
2240 return qp;
2241 error:
2242 isl_qpolynomial_free(qp);
2243 isl_upoly_free(s);
2244 return NULL;
2245 }
2246
2247 /* Replace all integer divisions [e/d] that turn out to not actually be integer
2248 * divisions because d is equal to 1 by their definition, i.e., e.
2249 */
2250 static __isl_give isl_qpolynomial *substitute_non_divs(
2251 __isl_take isl_qpolynomial *qp)
2252 {
2253 int i, j;
2254 int total;
2255 struct isl_upoly *s;
2256
2257 if (!qp)
2258 return NULL;
2259
2260 total = isl_space_dim(qp->dim, isl_dim_all);
2261 for (i = 0; qp && i < qp->div->n_row; ++i) {
2262 if (!isl_int_is_one(qp->div->row[i][0]))
2263 continue;
2264 for (j = i + 1; j < qp->div->n_row; ++j) {
2265 if (isl_int_is_zero(qp->div->row[j][2 + total + i]))
2266 continue;
2267 isl_seq_combine(qp->div->row[j] + 1,
2268 qp->div->ctx->one, qp->div->row[j] + 1,
2269 qp->div->row[j][2 + total + i],
2270 qp->div->row[i] + 1, 1 + total + i);
2271 isl_int_set_si(qp->div->row[j][2 + total + i], 0);
2272 normalize_div(qp, j);
2273 }
2274 s = isl_upoly_from_affine(qp->dim->ctx, qp->div->row[i] + 1,
2275 qp->div->row[i][0], qp->div->n_col - 1);
2276 qp = substitute_div(qp, i, s);
2277 --i;
2278 }
2279
2280 return qp;
2281 }
2282
2283 /* Reduce the coefficients of div "div" to lie in the interval [0, d-1],
2284 * with d the denominator. When replacing the coefficient e of x by
2285 * d * frac(e/d) = e - d * floor(e/d), we are subtracting d * floor(e/d) * x
2286 * inside the division, so we need to add floor(e/d) * x outside.
2287 * That is, we replace q by q' + floor(e/d) * x and we therefore need
2288 * to adjust the coefficient of x in each later div that depends on the
2289 * current div "div" and also in the affine expressions in the rows of "mat"
2290 * (if they too depend on "div").
2291 */
2292 static void reduce_div(__isl_keep isl_qpolynomial *qp, int div,
2293 __isl_keep isl_mat **mat)
2294 {
2295 int i, j;
2296 isl_int v;
2297 unsigned total = qp->div->n_col - qp->div->n_row - 2;
2298
2299 isl_int_init(v);
2300 for (i = 0; i < 1 + total + div; ++i) {
2301 if (isl_int_is_nonneg(qp->div->row[div][1 + i]) &&
2302 isl_int_lt(qp->div->row[div][1 + i], qp->div->row[div][0]))
2303 continue;
2304 isl_int_fdiv_q(v, qp->div->row[div][1 + i], qp->div->row[div][0]);
2305 isl_int_fdiv_r(qp->div->row[div][1 + i],
2306 qp->div->row[div][1 + i], qp->div->row[div][0]);
2307 *mat = isl_mat_col_addmul(*mat, i, v, 1 + total + div);
2308 for (j = div + 1; j < qp->div->n_row; ++j) {
2309 if (isl_int_is_zero(qp->div->row[j][2 + total + div]))
2310 continue;
2311 isl_int_addmul(qp->div->row[j][1 + i],
2312 v, qp->div->row[j][2 + total + div]);
2313 }
2314 }
2315 isl_int_clear(v);
2316 }
2317
2318 /* Check if the last non-zero coefficient is bigger that half of the
2319 * denominator. If so, we will invert the div to further reduce the number
2320 * of distinct divs that may appear.
2321 * If the last non-zero coefficient is exactly half the denominator,
2322 * then we continue looking for earlier coefficients that are bigger
2323 * than half the denominator.
2324 */
2325 static int needs_invert(__isl_keep isl_mat *div, int row)
2326 {
2327 int i;
2328 int cmp;
2329
2330 for (i = div->n_col - 1; i >= 1; --i) {
2331 if (isl_int_is_zero(div->row[row][i]))
2332 continue;
2333 isl_int_mul_ui(div->row[row][i], div->row[row][i], 2);
2334 cmp = isl_int_cmp(div->row[row][i], div->row[row][0]);
2335 isl_int_divexact_ui(div->row[row][i], div->row[row][i], 2);
2336 if (cmp)
2337 return cmp > 0;
2338 if (i == 1)
2339 return 1;
2340 }
2341
2342 return 0;
2343 }
2344
2345 /* Replace div "div" q = [e/d] by -[(-e+(d-1))/d].
2346 * We only invert the coefficients of e (and the coefficient of q in
2347 * later divs and in the rows of "mat"). After calling this function, the
2348 * coefficients of e should be reduced again.
2349 */
2350 static void invert_div(__isl_keep isl_qpolynomial *qp, int div,
2351 __isl_keep isl_mat **mat)
2352 {
2353 unsigned total = qp->div->n_col - qp->div->n_row - 2;
2354
2355 isl_seq_neg(qp->div->row[div] + 1,
2356 qp->div->row[div] + 1, qp->div->n_col - 1);
2357 isl_int_sub_ui(qp->div->row[div][1], qp->div->row[div][1], 1);
2358 isl_int_add(qp->div->row[div][1],
2359 qp->div->row[div][1], qp->div->row[div][0]);
2360 *mat = isl_mat_col_neg(*mat, 1 + total + div);
2361 isl_mat_col_mul(qp->div, 2 + total + div,
2362 qp->div->ctx->negone, 2 + total + div);
2363 }
2364
2365 /* Reduce all divs of "qp" to have coefficients
2366 * in the interval [0, d-1], with d the denominator and such that the
2367 * last non-zero coefficient that is not equal to d/2 is smaller than d/2.
2368 * The modifications to the integer divisions need to be reflected
2369 * in the factors of the polynomial that refer to the original
2370 * integer divisions. To this end, the modifications are collected
2371 * as a set of affine expressions and then plugged into the polynomial.
2372 *
2373 * After the reduction, some divs may have become redundant or identical,
2374 * so we call substitute_non_divs and sort_divs. If these functions
2375 * eliminate divs or merge two or more divs into one, the coefficients
2376 * of the enclosing divs may have to be reduced again, so we call
2377 * ourselves recursively if the number of divs decreases.
2378 */
2379 static __isl_give isl_qpolynomial *reduce_divs(__isl_take isl_qpolynomial *qp)
2380 {
2381 int i;
2382 isl_ctx *ctx;
2383 isl_mat *mat;
2384 struct isl_upoly **s;
2385 unsigned o_div, n_div, total;
2386
2387 if (!qp)
2388 return NULL;
2389
2390 total = isl_qpolynomial_domain_dim(qp, isl_dim_all);
2391 n_div = isl_qpolynomial_domain_dim(qp, isl_dim_div);
2392 o_div = isl_qpolynomial_domain_offset(qp, isl_dim_div);
2393 ctx = isl_qpolynomial_get_ctx(qp);
2394 mat = isl_mat_zero(ctx, n_div, 1 + total);
2395
2396 for (i = 0; i < n_div; ++i)
2397 mat = isl_mat_set_element_si(mat, i, o_div + i, 1);
2398
2399 for (i = 0; i < qp->div->n_row; ++i) {
2400 normalize_div(qp, i);
2401 reduce_div(qp, i, &mat);
2402 if (needs_invert(qp->div, i)) {
2403 invert_div(qp, i, &mat);
2404 reduce_div(qp, i, &mat);
2405 }
2406 }
2407 if (!mat)
2408 goto error;
2409
2410 s = isl_alloc_array(ctx, struct isl_upoly *, n_div);
2411 if (n_div && !s)
2412 goto error;
2413 for (i = 0; i < n_div; ++i)
2414 s[i] = isl_upoly_from_affine(ctx, mat->row[i], ctx->one,
2415 1 + total);
2416 qp->upoly = isl_upoly_subs(qp->upoly, o_div - 1, n_div, s);
2417 for (i = 0; i < n_div; ++i)
2418 isl_upoly_free(s[i]);
2419 free(s);
2420 if (!qp->upoly)
2421 goto error;
2422
2423 isl_mat_free(mat);
2424
2425 qp = substitute_non_divs(qp);
2426 qp = sort_divs(qp);
2427 if (qp && isl_qpolynomial_domain_dim(qp, isl_dim_div) < n_div)
2428 return reduce_divs(qp);
2429
2430 return qp;
2431 error:
2432 isl_qpolynomial_free(qp);
2433 isl_mat_free(mat);
2434 return NULL;
2435 }
2436
2437 __isl_give isl_qpolynomial *isl_qpolynomial_rat_cst_on_domain(
2438 __isl_take isl_space *dim, const isl_int n, const isl_int d)
2439 {
2440 struct isl_qpolynomial *qp;
2441 struct isl_upoly_cst *cst;
2442
2443 if (!dim)
2444 return NULL;
2445
2446 qp = isl_qpolynomial_alloc(dim, 0, isl_upoly_zero(dim->ctx));
2447 if (!qp)
2448 return NULL;
2449
2450 cst = isl_upoly_as_cst(qp->upoly);
2451 isl_int_set(cst->n, n);
2452 isl_int_set(cst->d, d);
2453
2454 return qp;
2455 }
2456
2457 /* Return an isl_qpolynomial that is equal to "val" on domain space "domain".
2458 */
2459 __isl_give isl_qpolynomial *isl_qpolynomial_val_on_domain(
2460 __isl_take isl_space *domain, __isl_take isl_val *val)
2461 {
2462 isl_qpolynomial *qp;
2463 struct isl_upoly_cst *cst;
2464
2465 if (!domain || !val)
2466 goto error;
2467
2468 qp = isl_qpolynomial_alloc(isl_space_copy(domain), 0,
2469 isl_upoly_zero(domain->ctx));
2470 if (!qp)
2471 goto error;
2472
2473 cst = isl_upoly_as_cst(qp->upoly);
2474 isl_int_set(cst->n, val->n);
2475 isl_int_set(cst->d, val->d);
2476
2477 isl_space_free(domain);
2478 isl_val_free(val);
2479 return qp;
2480 error:
2481 isl_space_free(domain);
2482 isl_val_free(val);
2483 return NULL;
2484 }
2485
2486 static int up_set_active(__isl_keep struct isl_upoly *up, int *active, int d)
2487 {
2488 struct isl_upoly_rec *rec;
2489 int i;
2490
2491 if (!up)
2492 return -1;
2493
2494 if (isl_upoly_is_cst(up))
2495 return 0;
2496
2497 if (up->var < d)
2498 active[up->var] = 1;
2499
2500 rec = isl_upoly_as_rec(up);
2501 for (i = 0; i < rec->n; ++i)
2502 if (up_set_active(rec->p[i], active, d) < 0)
2503 return -1;
2504
2505 return 0;
2506 }
2507
2508 static int set_active(__isl_keep isl_qpolynomial *qp, int *active)
2509 {
2510 int i, j;
2511 int d = isl_space_dim(qp->dim, isl_dim_all);
2512
2513 if (!qp || !active)
2514 return -1;
2515
2516 for (i = 0; i < d; ++i)
2517 for (j = 0; j < qp->div->n_row; ++j) {
2518 if (isl_int_is_zero(qp->div->row[j][2 + i]))
2519 continue;
2520 active[i] = 1;
2521 break;
2522 }
2523
2524 return up_set_active(qp->upoly, active, d);
2525 }
2526
2527 isl_bool isl_qpolynomial_involves_dims(__isl_keep isl_qpolynomial *qp,
2528 enum isl_dim_type type, unsigned first, unsigned n)
2529 {
2530 int i;
2531 int *active = NULL;
2532 isl_bool involves = isl_bool_false;
2533
2534 if (!qp)
2535 return isl_bool_error;
2536 if (n == 0)
2537 return isl_bool_false;
2538
2539 isl_assert(qp->dim->ctx,
2540 first + n <= isl_qpolynomial_dim(qp, type),
2541 return isl_bool_error);
2542 isl_assert(qp->dim->ctx, type == isl_dim_param ||
2543 type == isl_dim_in, return isl_bool_error);
2544
2545 active = isl_calloc_array(qp->dim->ctx, int,
2546 isl_space_dim(qp->dim, isl_dim_all));
2547 if (set_active(qp, active) < 0)
2548 goto error;
2549
2550 if (type == isl_dim_in)
2551 first += isl_space_dim(qp->dim, isl_dim_param);
2552 for (i = 0; i < n; ++i)
2553 if (active[first + i]) {
2554 involves = isl_bool_true;
2555 break;
2556 }
2557
2558 free(active);
2559
2560 return involves;
2561 error:
2562 free(active);
2563 return isl_bool_error;
2564 }
2565
2566 /* Remove divs that do not appear in the quasi-polynomial, nor in any
2567 * of the divs that do appear in the quasi-polynomial.
2568 */
2569 static __isl_give isl_qpolynomial *remove_redundant_divs(
2570 __isl_take isl_qpolynomial *qp)
2571 {
2572 int i, j;
2573 int d;
2574 int len;
2575 int skip;
2576 int *active = NULL;
2577 int *reordering = NULL;
2578 int redundant = 0;
2579 int n_div;
2580 isl_ctx *ctx;
2581
2582 if (!qp)
2583 return NULL;
2584 if (qp->div->n_row == 0)
2585 return qp;
2586
2587 d = isl_space_dim(qp->dim, isl_dim_all);
2588 len = qp->div->n_col - 2;
2589 ctx = isl_qpolynomial_get_ctx(qp);
2590 active = isl_calloc_array(ctx, int, len);
2591 if (!active)
2592 goto error;
2593
2594 if (up_set_active(qp->upoly, active, len) < 0)
2595 goto error;
2596
2597 for (i = qp->div->n_row - 1; i >= 0; --i) {
2598 if (!active[d + i]) {
2599 redundant = 1;
2600 continue;
2601 }
2602 for (j = 0; j < i; ++j) {
2603 if (isl_int_is_zero(qp->div->row[i][2 + d + j]))
2604 continue;
2605 active[d + j] = 1;
2606 break;
2607 }
2608 }
2609
2610 if (!redundant) {
2611 free(active);
2612 return qp;
2613 }
2614
2615 reordering = isl_alloc_array(qp->div->ctx, int, len);
2616 if (!reordering)
2617 goto error;
2618
2619 for (i = 0; i < d; ++i)
2620 reordering[i] = i;
2621
2622 skip = 0;
2623 n_div = qp->div->n_row;
2624 for (i = 0; i < n_div; ++i) {
2625 if (!active[d + i]) {
2626 qp->div = isl_mat_drop_rows(qp->div, i - skip, 1);
2627 qp->div = isl_mat_drop_cols(qp->div,
2628 2 + d + i - skip, 1);
2629 skip++;
2630 }
2631 reordering[d + i] = d + i - skip;
2632 }
2633
2634 qp->upoly = reorder(qp->upoly, reordering);
2635
2636 if (!qp->upoly || !qp->div)
2637 goto error;
2638
2639 free(active);
2640 free(reordering);
2641
2642 return qp;
2643 error:
2644 free(active);
2645 free(reordering);
2646 isl_qpolynomial_free(qp);
2647 return NULL;
2648 }
2649
2650 __isl_give struct isl_upoly *isl_upoly_drop(__isl_take struct isl_upoly *up,
2651 unsigned first, unsigned n)
2652 {
2653 int i;
2654 struct isl_upoly_rec *rec;
2655
2656 if (!up)
2657 return NULL;
2658 if (n == 0 || up->var < 0 || up->var < first)
2659 return up;
2660 if (up->var < first + n) {
2661 up = replace_by_constant_term(up);
2662 return isl_upoly_drop(up, first, n);
2663 }
2664 up = isl_upoly_cow(up);
2665 if (!up)
2666 return NULL;
2667 up->var -= n;
2668 rec = isl_upoly_as_rec(up);
2669 if (!rec)
2670 goto error;
2671
2672 for (i = 0; i < rec->n; ++i) {
2673 rec->p[i] = isl_upoly_drop(rec->p[i], first, n);
2674 if (!rec->p[i])
2675 goto error;
2676 }
2677
2678 return up;
2679 error:
2680 isl_upoly_free(up);
2681 return NULL;
2682 }
2683
2684 __isl_give isl_qpolynomial *isl_qpolynomial_set_dim_name(
2685 __isl_take isl_qpolynomial *qp,
2686 enum isl_dim_type type, unsigned pos, const char *s)
2687 {
2688 qp = isl_qpolynomial_cow(qp);
2689 if (!qp)
2690 return NULL;
2691 if (type == isl_dim_out)
2692 isl_die(isl_qpolynomial_get_ctx(qp), isl_error_invalid,
2693 "cannot set name of output/set dimension",
2694 return isl_qpolynomial_free(qp));
2695 if (type == isl_dim_in)
2696 type = isl_dim_set;
2697 qp->dim = isl_space_set_dim_name(qp->dim, type, pos, s);
2698 if (!qp->dim)
2699 goto error;
2700 return qp;
2701 error:
2702 isl_qpolynomial_free(qp);
2703 return NULL;
2704 }
2705
2706 __isl_give isl_qpolynomial *isl_qpolynomial_drop_dims(
2707 __isl_take isl_qpolynomial *qp,
2708 enum isl_dim_type type, unsigned first, unsigned n)
2709 {
2710 if (!qp)
2711 return NULL;
2712 if (type == isl_dim_out)
2713 isl_die(qp->dim->ctx, isl_error_invalid,
2714 "cannot drop output/set dimension",
2715 goto error);
2716 if (type == isl_dim_in)
2717 type = isl_dim_set;
2718 if (n == 0 && !isl_space_is_named_or_nested(qp->dim, type))
2719 return qp;
2720
2721 qp = isl_qpolynomial_cow(qp);
2722 if (!qp)
2723 return NULL;
2724
2725 isl_assert(qp->dim->ctx, first + n <= isl_space_dim(qp->dim, type),
2726 goto error);
2727 isl_assert(qp->dim->ctx, type == isl_dim_param ||
2728 type == isl_dim_set, goto error);
2729
2730 qp->dim = isl_space_drop_dims(qp->dim, type, first, n);
2731 if (!qp->dim)
2732 goto error;
2733
2734 if (type == isl_dim_set)
2735 first += isl_space_dim(qp->dim, isl_dim_param);
2736
2737 qp->div = isl_mat_drop_cols(qp->div, 2 + first, n);
2738 if (!qp->div)
2739 goto error;
2740
2741 qp->upoly = isl_upoly_drop(qp->upoly, first, n);
2742 if (!qp->upoly)
2743 goto error;
2744
2745 return qp;
2746 error:
2747 isl_qpolynomial_free(qp);
2748 return NULL;
2749 }
2750
2751 /* Project the domain of the quasi-polynomial onto its parameter space.
2752 * The quasi-polynomial may not involve any of the domain dimensions.
2753 */
2754 __isl_give isl_qpolynomial *isl_qpolynomial_project_domain_on_params(
2755 __isl_take isl_qpolynomial *qp)
2756 {
2757 isl_space *space;
2758 unsigned n;
2759 int involves;
2760
2761 n = isl_qpolynomial_dim(qp, isl_dim_in);
2762 involves = isl_qpolynomial_involves_dims(qp, isl_dim_in, 0, n);
2763 if (involves < 0)
2764 return isl_qpolynomial_free(qp);
2765 if (involves)
2766 isl_die(isl_qpolynomial_get_ctx(qp), isl_error_invalid,
2767 "polynomial involves some of the domain dimensions",
2768 return isl_qpolynomial_free(qp));
2769 qp = isl_qpolynomial_drop_dims(qp, isl_dim_in, 0, n);
2770 space = isl_qpolynomial_get_domain_space(qp);
2771 space = isl_space_params(space);
2772 qp = isl_qpolynomial_reset_domain_space(qp, space);
2773 return qp;
2774 }
2775
2776 static __isl_give isl_qpolynomial *isl_qpolynomial_substitute_equalities_lifted(
2777 __isl_take isl_qpolynomial *qp, __isl_take isl_basic_set *eq)
2778 {
2779 int i, j, k;
2780 isl_int denom;
2781 unsigned total;
2782 unsigned n_div;
2783 struct isl_upoly *up;
2784
2785 if (!eq)
2786 goto error;
2787 if (eq->n_eq == 0) {
2788 isl_basic_set_free(eq);
2789 return qp;
2790 }
2791
2792 qp = isl_qpolynomial_cow(qp);
2793 if (!qp)
2794 goto error;
2795 qp->div = isl_mat_cow(qp->div);
2796 if (!qp->div)
2797 goto error;
2798
2799 total = 1 + isl_space_dim(eq->dim, isl_dim_all);
2800 n_div = eq->n_div;
2801 isl_int_init(denom);
2802 for (i = 0; i < eq->n_eq; ++i) {
2803 j = isl_seq_last_non_zero(eq->eq[i], total + n_div);
2804 if (j < 0 || j == 0 || j >= total)
2805 continue;
2806
2807 for (k = 0; k < qp->div->n_row; ++k) {
2808 if (isl_int_is_zero(qp->div->row[k][1 + j]))
2809 continue;
2810 isl_seq_elim(qp->div->row[k] + 1, eq->eq[i], j, total,
2811 &qp->div->row[k][0]);
2812 normalize_div(qp, k);
2813 }
2814
2815 if (isl_int_is_pos(eq->eq[i][j]))
2816 isl_seq_neg(eq->eq[i], eq->eq[i], total);
2817 isl_int_abs(denom, eq->eq[i][j]);
2818 isl_int_set_si(eq->eq[i][j], 0);
2819
2820 up = isl_upoly_from_affine(qp->dim->ctx,
2821 eq->eq[i], denom, total);
2822 qp->upoly = isl_upoly_subs(qp->upoly, j - 1, 1, &up);
2823 isl_upoly_free(up);
2824 }
2825 isl_int_clear(denom);
2826
2827 if (!qp->upoly)
2828 goto error;
2829
2830 isl_basic_set_free(eq);
2831
2832 qp = substitute_non_divs(qp);
2833 qp = sort_divs(qp);
2834
2835 return qp;
2836 error:
2837 isl_basic_set_free(eq);
2838 isl_qpolynomial_free(qp);
2839 return NULL;
2840 }
2841
2842 /* Exploit the equalities in "eq" to simplify the quasi-polynomial.
2843 */
2844 __isl_give isl_qpolynomial *isl_qpolynomial_substitute_equalities(
2845 __isl_take isl_qpolynomial *qp, __isl_take isl_basic_set *eq)
2846 {
2847 if (!qp || !eq)
2848 goto error;
2849 if (qp->div->n_row > 0)
2850 eq = isl_basic_set_add_dims(eq, isl_dim_set, qp->div->n_row);
2851 return isl_qpolynomial_substitute_equalities_lifted(qp, eq);
2852 error:
2853 isl_basic_set_free(eq);
2854 isl_qpolynomial_free(qp);
2855 return NULL;
2856 }
2857
2858 static __isl_give isl_basic_set *add_div_constraints(
2859 __isl_take isl_basic_set *bset, __isl_take isl_mat *div)
2860 {
2861 int i;
2862 unsigned total;
2863
2864 if (!bset || !div)
2865 goto error;
2866
2867 bset = isl_basic_set_extend_constraints(bset, 0, 2 * div->n_row);
2868 if (!bset)
2869 goto error;
2870 total = isl_basic_set_total_dim(bset);
2871 for (i = 0; i < div->n_row; ++i)
2872 if (isl_basic_set_add_div_constraints_var(bset,
2873 total - div->n_row + i, div->row[i]) < 0)
2874 goto error;
2875
2876 isl_mat_free(div);
2877 return bset;
2878 error:
2879 isl_mat_free(div);
2880 isl_basic_set_free(bset);
2881 return NULL;
2882 }
2883
2884 /* Look for equalities among the variables shared by context and qp
2885 * and the integer divisions of qp, if any.
2886 * The equalities are then used to eliminate variables and/or integer
2887 * divisions from qp.
2888 */
2889 __isl_give isl_qpolynomial *isl_qpolynomial_gist(
2890 __isl_take isl_qpolynomial *qp, __isl_take isl_set *context)
2891 {
2892 isl_basic_set *aff;
2893
2894 if (!qp)
2895 goto error;
2896 if (qp->div->n_row > 0) {
2897 isl_basic_set *bset;
2898 context = isl_set_add_dims(context, isl_dim_set,
2899 qp->div->n_row);
2900 bset = isl_basic_set_universe(isl_set_get_space(context));
2901 bset = add_div_constraints(bset, isl_mat_copy(qp->div));
2902 context = isl_set_intersect(context,
2903 isl_set_from_basic_set(bset));
2904 }
2905
2906 aff = isl_set_affine_hull(context);
2907 return isl_qpolynomial_substitute_equalities_lifted(qp, aff);
2908 error:
2909 isl_qpolynomial_free(qp);
2910 isl_set_free(context);
2911 return NULL;
2912 }
2913
2914 __isl_give isl_qpolynomial *isl_qpolynomial_gist_params(
2915 __isl_take isl_qpolynomial *qp, __isl_take isl_set *context)
2916 {
2917 isl_space *space = isl_qpolynomial_get_domain_space(qp);
2918 isl_set *dom_context = isl_set_universe(space);
2919 dom_context = isl_set_intersect_params(dom_context, context);
2920 return isl_qpolynomial_gist(qp, dom_context);
2921 }
2922
2923 __isl_give isl_pw_qpolynomial *isl_pw_qpolynomial_from_qpolynomial(
2924 __isl_take isl_qpolynomial *qp)
2925 {
2926 isl_set *dom;
2927
2928 if (!qp)
2929 return NULL;
2930 if (isl_qpolynomial_is_zero(qp)) {
2931 isl_space *dim = isl_qpolynomial_get_space(qp);
2932 isl_qpolynomial_free(qp);
2933 return isl_pw_qpolynomial_zero(dim);
2934 }
2935
2936 dom = isl_set_universe(isl_qpolynomial_get_domain_space(qp));
2937 return isl_pw_qpolynomial_alloc(dom, qp);
2938 }
2939
2940 #define isl_qpolynomial_involves_nan isl_qpolynomial_is_nan
2941
2942 #undef PW
2943 #define PW isl_pw_qpolynomial
2944 #undef EL
2945 #define EL isl_qpolynomial
2946 #undef EL_IS_ZERO
2947 #define EL_IS_ZERO is_zero
2948 #undef ZERO
2949 #define ZERO zero
2950 #undef IS_ZERO
2951 #define IS_ZERO is_zero
2952 #undef FIELD
2953 #define FIELD qp
2954 #undef DEFAULT_IS_ZERO
2955 #define DEFAULT_IS_ZERO 1
2956
2957 #define NO_PULLBACK
2958
2959 #include <isl_pw_templ.c>
2960
2961 #undef UNION
2962 #define UNION isl_union_pw_qpolynomial
2963 #undef PART
2964 #define PART isl_pw_qpolynomial
2965 #undef PARTS
2966 #define PARTS pw_qpolynomial
2967
2968 #include <isl_union_single.c>
2969 #include <isl_union_eval.c>
2970 #include <isl_union_neg.c>
2971
2972 int isl_pw_qpolynomial_is_one(__isl_keep isl_pw_qpolynomial *pwqp)
2973 {
2974 if (!pwqp)
2975 return -1;
2976
2977 if (pwqp->n != -1)
2978 return 0;
2979
2980 if (!isl_set_plain_is_universe(pwqp->p[0].set))
2981 return 0;
2982
2983 return isl_qpolynomial_is_one(pwqp->p[0].qp);
2984 }
2985
2986 __isl_give isl_pw_qpolynomial *isl_pw_qpolynomial_add(
2987 __isl_take isl_pw_qpolynomial *pwqp1,
2988 __isl_take isl_pw_qpolynomial *pwqp2)
2989 {
2990 return isl_pw_qpolynomial_union_add_(pwqp1, pwqp2);
2991 }
2992
2993 __isl_give isl_pw_qpolynomial *isl_pw_qpolynomial_mul(
2994 __isl_take isl_pw_qpolynomial *pwqp1,
2995 __isl_take isl_pw_qpolynomial *pwqp2)
2996 {
2997 int i, j, n;
2998 struct isl_pw_qpolynomial *res;
2999
3000 if (!pwqp1 || !pwqp2)
3001 goto error;
3002
3003 isl_assert(pwqp1->dim->ctx, isl_space_is_equal(pwqp1->dim, pwqp2->dim),
3004 goto error);
3005
3006 if (isl_pw_qpolynomial_is_zero(pwqp1)) {
3007 isl_pw_qpolynomial_free(pwqp2);
3008 return pwqp1;
3009 }
3010
3011 if (isl_pw_qpolynomial_is_zero(pwqp2)) {
3012 isl_pw_qpolynomial_free(pwqp1);
3013 return pwqp2;
3014 }
3015
3016 if (isl_pw_qpolynomial_is_one(pwqp1)) {
3017 isl_pw_qpolynomial_free(pwqp1);
3018 return pwqp2;
3019 }
3020
3021 if (isl_pw_qpolynomial_is_one(pwqp2)) {
3022 isl_pw_qpolynomial_free(pwqp2);
3023 return pwqp1;
3024 }
3025
3026 n = pwqp1->n * pwqp2->n;
3027 res = isl_pw_qpolynomial_alloc_size(isl_space_copy(pwqp1->dim), n);
3028
3029 for (i = 0; i < pwqp1->n; ++i) {
3030 for (j = 0; j < pwqp2->n; ++j) {
3031 struct isl_set *common;
3032 struct isl_qpolynomial *prod;
3033 common = isl_set_intersect(isl_set_copy(pwqp1->p[i].set),
3034 isl_set_copy(pwqp2->p[j].set));
3035 if (isl_set_plain_is_empty(common)) {
3036 isl_set_free(common);
3037 continue;
3038 }
3039
3040 prod = isl_qpolynomial_mul(
3041 isl_qpolynomial_copy(pwqp1->p[i].qp),
3042 isl_qpolynomial_copy(pwqp2->p[j].qp));
3043
3044 res = isl_pw_qpolynomial_add_piece(res, common, prod);
3045 }
3046 }
3047
3048 isl_pw_qpolynomial_free(pwqp1);
3049 isl_pw_qpolynomial_free(pwqp2);
3050
3051 return res;
3052 error:
3053 isl_pw_qpolynomial_free(pwqp1);
3054 isl_pw_qpolynomial_free(pwqp2);
3055 return NULL;
3056 }
3057
3058 __isl_give isl_val *isl_upoly_eval(__isl_take struct isl_upoly *up,
3059 __isl_take isl_vec *vec)
3060 {
3061 int i;
3062 struct isl_upoly_rec *rec;
3063 isl_val *res;
3064 isl_val *base;
3065
3066 if (isl_upoly_is_cst(up)) {
3067 isl_vec_free(vec);
3068 res = isl_upoly_get_constant_val(up);
3069 isl_upoly_free(up);
3070 return res;
3071 }
3072
3073 rec = isl_upoly_as_rec(up);
3074 if (!rec || !vec)
3075 goto error;
3076
3077 isl_assert(up->ctx, rec->n >= 1, goto error);
3078
3079 base = isl_val_rat_from_isl_int(up->ctx,
3080 vec->el[1 + up->var], vec->el[0]);
3081
3082 res = isl_upoly_eval(isl_upoly_copy(rec->p[rec->n - 1]),
3083 isl_vec_copy(vec));
3084
3085 for (i = rec->n - 2; i >= 0; --i) {
3086 res = isl_val_mul(res, isl_val_copy(base));
3087 res = isl_val_add(res,
3088 isl_upoly_eval(isl_upoly_copy(rec->p[i]),
3089 isl_vec_copy(vec)));
3090 }
3091
3092 isl_val_free(base);
3093 isl_upoly_free(up);
3094 isl_vec_free(vec);
3095 return res;
3096 error:
3097 isl_upoly_free(up);
3098 isl_vec_free(vec);
3099 return NULL;
3100 }
3101
3102 /* Evaluate "qp" in the void point "pnt".
3103 * In particular, return the value NaN.
3104 */
3105 static __isl_give isl_val *eval_void(__isl_take isl_qpolynomial *qp,
3106 __isl_take isl_point *pnt)
3107 {
3108 isl_ctx *ctx;
3109
3110 ctx = isl_point_get_ctx(pnt);
3111 isl_qpolynomial_free(qp);
3112 isl_point_free(pnt);
3113 return isl_val_nan(ctx);
3114 }
3115
3116 __isl_give isl_val *isl_qpolynomial_eval(__isl_take isl_qpolynomial *qp,
3117 __isl_take isl_point *pnt)
3118 {
3119 isl_bool is_void;
3120 isl_vec *ext;
3121 isl_val *v;
3122
3123 if (!qp || !pnt)
3124 goto error;
3125 isl_assert(pnt->dim->ctx, isl_space_is_equal(pnt->dim, qp->dim), goto error);
3126 is_void = isl_point_is_void(pnt);
3127 if (is_void < 0)
3128 goto error;
3129 if (is_void)
3130 return eval_void(qp, pnt);
3131
3132 ext = isl_local_extend_point_vec(qp->div, isl_vec_copy(pnt->vec));
3133
3134 v = isl_upoly_eval(isl_upoly_copy(qp->upoly), ext);
3135
3136 isl_qpolynomial_free(qp);
3137 isl_point_free(pnt);
3138
3139 return v;
3140 error:
3141 isl_qpolynomial_free(qp);
3142 isl_point_free(pnt);
3143 return NULL;
3144 }
3145
3146 int isl_upoly_cmp(__isl_keep struct isl_upoly_cst *cst1,
3147 __isl_keep struct isl_upoly_cst *cst2)
3148 {
3149 int cmp;
3150 isl_int t;
3151 isl_int_init(t);
3152 isl_int_mul(t, cst1->n, cst2->d);
3153 isl_int_submul(t, cst2->n, cst1->d);
3154 cmp = isl_int_sgn(t);
3155 isl_int_clear(t);
3156 return cmp;
3157 }
3158
3159 __isl_give isl_qpolynomial *isl_qpolynomial_insert_dims(
3160 __isl_take isl_qpolynomial *qp, enum isl_dim_type type,
3161 unsigned first, unsigned n)
3162 {
3163 unsigned total;
3164 unsigned g_pos;
3165 int *exp;
3166
3167 if (!qp)
3168 return NULL;
3169 if (type == isl_dim_out)
3170 isl_die(qp->div->ctx, isl_error_invalid,
3171 "cannot insert output/set dimensions",
3172 goto error);
3173 if (type == isl_dim_in)
3174 type = isl_dim_set;
3175 if (n == 0 && !isl_space_is_named_or_nested(qp->dim, type))
3176 return qp;
3177
3178 qp = isl_qpolynomial_cow(qp);
3179 if (!qp)
3180 return NULL;
3181
3182 isl_assert(qp->div->ctx, first <= isl_space_dim(qp->dim, type),
3183 goto error);
3184
3185 g_pos = pos(qp->dim, type) + first;
3186
3187 qp->div = isl_mat_insert_zero_cols(qp->div, 2 + g_pos, n);
3188 if (!qp->div)
3189 goto error;
3190
3191 total = qp->div->n_col - 2;
3192 if (total > g_pos) {
3193 int i;
3194 exp = isl_alloc_array(qp->div->ctx, int, total - g_pos);
3195 if (!exp)
3196 goto error;
3197 for (i = 0; i < total - g_pos; ++i)
3198 exp[i] = i + n;
3199 qp->upoly = expand(qp->upoly, exp, g_pos);
3200 free(exp);
3201 if (!qp->upoly)
3202 goto error;
3203 }
3204
3205 qp->dim = isl_space_insert_dims(qp->dim, type, first, n);
3206 if (!qp->dim)
3207 goto error;
3208
3209 return qp;
3210 error:
3211 isl_qpolynomial_free(qp);
3212 return NULL;
3213 }
3214
3215 __isl_give isl_qpolynomial *isl_qpolynomial_add_dims(
3216 __isl_take isl_qpolynomial *qp, enum isl_dim_type type, unsigned n)
3217 {
3218 unsigned pos;
3219
3220 pos = isl_qpolynomial_dim(qp, type);
3221
3222 return isl_qpolynomial_insert_dims(qp, type, pos, n);
3223 }
3224
3225 __isl_give isl_pw_qpolynomial *isl_pw_qpolynomial_add_dims(
3226 __isl_take isl_pw_qpolynomial *pwqp,
3227 enum isl_dim_type type, unsigned n)
3228 {
3229 unsigned pos;
3230
3231 pos = isl_pw_qpolynomial_dim(pwqp, type);
3232
3233 return isl_pw_qpolynomial_insert_dims(pwqp, type, pos, n);
3234 }
3235
3236 static int *reordering_move(isl_ctx *ctx,
3237 unsigned len, unsigned dst, unsigned src, unsigned n)
3238 {
3239 int i;
3240 int *reordering;
3241
3242 reordering = isl_alloc_array(ctx, int, len);
3243 if (!reordering)
3244 return NULL;
3245
3246 if (dst <= src) {
3247 for (i = 0; i < dst; ++i)
3248 reordering[i] = i;
3249 for (i = 0; i < n; ++i)
3250 reordering[src + i] = dst + i;
3251 for (i = 0; i < src - dst; ++i)
3252 reordering[dst + i] = dst + n + i;
3253 for (i = 0; i < len - src - n; ++i)
3254 reordering[src + n + i] = src + n + i;
3255 } else {
3256 for (i = 0; i < src; ++i)
3257 reordering[i] = i;
3258 for (i = 0; i < n; ++i)
3259 reordering[src + i] = dst + i;
3260 for (i = 0; i < dst - src; ++i)
3261 reordering[src + n + i] = src + i;
3262 for (i = 0; i < len - dst - n; ++i)
3263 reordering[dst + n + i] = dst + n + i;
3264 }
3265
3266 return reordering;
3267 }
3268
3269 __isl_give isl_qpolynomial *isl_qpolynomial_move_dims(
3270 __isl_take isl_qpolynomial *qp,
3271 enum isl_dim_type dst_type, unsigned dst_pos,
3272 enum isl_dim_type src_type, unsigned src_pos, unsigned n)
3273 {
3274 unsigned g_dst_pos;
3275 unsigned g_src_pos;
3276 int *reordering;
3277
3278 if (!qp)
3279 return NULL;
3280
3281 if (dst_type == isl_dim_out || src_type == isl_dim_out)
3282 isl_die(qp->dim->ctx, isl_error_invalid,
3283 "cannot move output/set dimension",
3284 goto error);
3285 if (dst_type == isl_dim_in)
3286 dst_type = isl_dim_set;
3287 if (src_type == isl_dim_in)
3288 src_type = isl_dim_set;
3289
3290 if (n == 0 &&
3291 !isl_space_is_named_or_nested(qp->dim, src_type) &&
3292 !isl_space_is_named_or_nested(qp->dim, dst_type))
3293 return qp;
3294
3295 qp = isl_qpolynomial_cow(qp);
3296 if (!qp)
3297 return NULL;
3298
3299 isl_assert(qp->dim->ctx, src_pos + n <= isl_space_dim(qp->dim, src_type),
3300 goto error);
3301
3302 g_dst_pos = pos(qp->dim, dst_type) + dst_pos;
3303 g_src_pos = pos(qp->dim, src_type) + src_pos;
3304 if (dst_type > src_type)
3305 g_dst_pos -= n;
3306
3307 qp->div = isl_mat_move_cols(qp->div, 2 + g_dst_pos, 2 + g_src_pos, n);
3308 if (!qp->div)
3309 goto error;
3310 qp = sort_divs(qp);
3311 if (!qp)
3312 goto error;
3313
3314 reordering = reordering_move(qp->dim->ctx,
3315 qp->div->n_col - 2, g_dst_pos, g_src_pos, n);
3316 if (!reordering)
3317 goto error;
3318
3319 qp->upoly = reorder(qp->upoly, reordering);
3320 free(reordering);
3321 if (!qp->upoly)
3322 goto error;
3323
3324 qp->dim = isl_space_move_dims(qp->dim, dst_type, dst_pos, src_type, src_pos, n);
3325 if (!qp->dim)
3326 goto error;
3327
3328 return qp;
3329 error:
3330 isl_qpolynomial_free(qp);
3331 return NULL;
3332 }
3333
3334 __isl_give isl_qpolynomial *isl_qpolynomial_from_affine(__isl_take isl_space *dim,
3335 isl_int *f, isl_int denom)
3336 {
3337 struct isl_upoly *up;
3338
3339 dim = isl_space_domain(dim);
3340 if (!dim)
3341 return NULL;
3342
3343 up = isl_upoly_from_affine(dim->ctx, f, denom,
3344 1 + isl_space_dim(dim, isl_dim_all));
3345
3346 return isl_qpolynomial_alloc(dim, 0, up);
3347 }
3348
3349 __isl_give isl_qpolynomial *isl_qpolynomial_from_aff(__isl_take isl_aff *aff)
3350 {
3351 isl_ctx *ctx;
3352 struct isl_upoly *up;
3353 isl_qpolynomial *qp;
3354
3355 if (!aff)
3356 return NULL;
3357
3358 ctx = isl_aff_get_ctx(aff);
3359 up = isl_upoly_from_affine(ctx, aff->v->el + 1, aff->v->el[0],
3360 aff->v->size - 1);
3361
3362 qp = isl_qpolynomial_alloc(isl_aff_get_domain_space(aff),
3363 aff->ls->div->n_row, up);
3364 if (!qp)
3365 goto error;
3366
3367 isl_mat_free(qp->div);
3368 qp->div = isl_mat_copy(aff->ls->div);
3369 qp->div = isl_mat_cow(qp->div);
3370 if (!qp->div)
3371 goto error;
3372
3373 isl_aff_free(aff);
3374 qp = reduce_divs(qp);
3375 qp = remove_redundant_divs(qp);
3376 return qp;
3377 error:
3378 isl_aff_free(aff);
3379 return isl_qpolynomial_free(qp);
3380 }
3381
3382 __isl_give isl_pw_qpolynomial *isl_pw_qpolynomial_from_pw_aff(
3383 __isl_take isl_pw_aff *pwaff)
3384 {
3385 int i;
3386 isl_pw_qpolynomial *pwqp;
3387
3388 if (!pwaff)
3389 return NULL;
3390
3391 pwqp = isl_pw_qpolynomial_alloc_size(isl_pw_aff_get_space(pwaff),
3392 pwaff->n);
3393
3394 for (i = 0; i < pwaff->n; ++i) {
3395 isl_set *dom;
3396 isl_qpolynomial *qp;
3397
3398 dom = isl_set_copy(pwaff->p[i].set);
3399 qp = isl_qpolynomial_from_aff(isl_aff_copy(pwaff->p[i].aff));
3400 pwqp = isl_pw_qpolynomial_add_piece(pwqp, dom, qp);
3401 }
3402
3403 isl_pw_aff_free(pwaff);
3404 return pwqp;
3405 }
3406
3407 __isl_give isl_qpolynomial *isl_qpolynomial_from_constraint(
3408 __isl_take isl_constraint *c, enum isl_dim_type type, unsigned pos)
3409 {
3410 isl_aff *aff;
3411
3412 aff = isl_constraint_get_bound(c, type, pos);
3413 isl_constraint_free(c);
3414 return isl_qpolynomial_from_aff(aff);
3415 }
3416
3417 /* For each 0 <= i < "n", replace variable "first" + i of type "type"
3418 * in "qp" by subs[i].
3419 */
3420 __isl_give isl_qpolynomial *isl_qpolynomial_substitute(
3421 __isl_take isl_qpolynomial *qp,
3422 enum isl_dim_type type, unsigned first, unsigned n,
3423 __isl_keep isl_qpolynomial **subs)
3424 {
3425 int i;
3426 struct isl_upoly **ups;
3427
3428 if (n == 0)
3429 return qp;
3430
3431 qp = isl_qpolynomial_cow(qp);
3432 if (!qp)
3433 return NULL;
3434
3435 if (type == isl_dim_out)
3436 isl_die(qp->dim->ctx, isl_error_invalid,
3437 "cannot substitute output/set dimension",
3438 goto error);
3439 if (type == isl_dim_in)
3440 type = isl_dim_set;
3441
3442 for (i = 0; i < n; ++i)
3443 if (!subs[i])
3444 goto error;
3445
3446 isl_assert(qp->dim->ctx, first + n <= isl_space_dim(qp->dim, type),
3447 goto error);
3448
3449 for (i = 0; i < n; ++i)
3450 isl_assert(qp->dim->ctx, isl_space_is_equal(qp->dim, subs[i]->dim),
3451 goto error);
3452
3453 isl_assert(qp->dim->ctx, qp->div->n_row == 0, goto error);
3454 for (i = 0; i < n; ++i)
3455 isl_assert(qp->dim->ctx, subs[i]->div->n_row == 0, goto error);
3456
3457 first += pos(qp->dim, type);
3458
3459 ups = isl_alloc_array(qp->dim->ctx, struct isl_upoly *, n);
3460 if (!ups)
3461 goto error;
3462 for (i = 0; i < n; ++i)
3463 ups[i] = subs[i]->upoly;
3464
3465 qp->upoly = isl_upoly_subs(qp->upoly, first, n, ups);
3466
3467 free(ups);
3468
3469 if (!qp->upoly)
3470 goto error;
3471
3472 return qp;
3473 error:
3474 isl_qpolynomial_free(qp);
3475 return NULL;
3476 }
3477
3478 /* Extend "bset" with extra set dimensions for each integer division
3479 * in "qp" and then call "fn" with the extended bset and the polynomial
3480 * that results from replacing each of the integer divisions by the
3481 * corresponding extra set dimension.
3482 */
3483 isl_stat isl_qpolynomial_as_polynomial_on_domain(__isl_keep isl_qpolynomial *qp,
3484 __isl_keep isl_basic_set *bset,
3485 isl_stat (*fn)(__isl_take isl_basic_set *bset,
3486 __isl_take isl_qpolynomial *poly, void *user), void *user)
3487 {
3488 isl_space *dim;
3489 isl_mat *div;
3490 isl_qpolynomial *poly;
3491
3492 if (!qp || !bset)
3493 return isl_stat_error;
3494 if (qp->div->n_row == 0)
3495 return fn(isl_basic_set_copy(bset), isl_qpolynomial_copy(qp),
3496 user);
3497
3498 div = isl_mat_copy(qp->div);
3499 dim = isl_space_copy(qp->dim);
3500 dim = isl_space_add_dims(dim, isl_dim_set, qp->div->n_row);
3501 poly = isl_qpolynomial_alloc(dim, 0, isl_upoly_copy(qp->upoly));
3502 bset = isl_basic_set_copy(bset);
3503 bset = isl_basic_set_add_dims(bset, isl_dim_set, qp->div->n_row);
3504 bset = add_div_constraints(bset, div);
3505
3506 return fn(bset, poly, user);
3507 }
3508
3509 /* Return total degree in variables first (inclusive) up to last (exclusive).
3510 */
3511 int isl_upoly_degree(__isl_keep struct isl_upoly *up, int first, int last)
3512 {
3513 int deg = -1;
3514 int i;
3515 struct isl_upoly_rec *rec;
3516
3517 if (!up)
3518 return -2;
3519 if (isl_upoly_is_zero(up))
3520 return -1;
3521 if (isl_upoly_is_cst(up) || up->var < first)
3522 return 0;
3523
3524 rec = isl_upoly_as_rec(up);
3525 if (!rec)
3526 return -2;
3527
3528 for (i = 0; i < rec->n; ++i) {
3529 int d;
3530
3531 if (isl_upoly_is_zero(rec->p[i]))
3532 continue;
3533 d = isl_upoly_degree(rec->p[i], first, last);
3534 if (up->var < last)
3535 d += i;
3536 if (d > deg)
3537 deg = d;
3538 }
3539
3540 return deg;
3541 }
3542
3543 /* Return total degree in set variables.
3544 */
3545 int isl_qpolynomial_degree(__isl_keep isl_qpolynomial *poly)
3546 {
3547 unsigned ovar;
3548 unsigned nvar;
3549
3550 if (!poly)
3551 return -2;
3552
3553 ovar = isl_space_offset(poly->dim, isl_dim_set);
3554 nvar = isl_space_dim(poly->dim, isl_dim_set);
3555 return isl_upoly_degree(poly->upoly, ovar, ovar + nvar);
3556 }
3557
3558 __isl_give struct isl_upoly *isl_upoly_coeff(__isl_keep struct isl_upoly *up,
3559 unsigned pos, int deg)
3560 {
3561 int i;
3562 struct isl_upoly_rec *rec;
3563
3564 if (!up)
3565 return NULL;
3566
3567 if (isl_upoly_is_cst(up) || up->var < pos) {
3568 if (deg == 0)
3569 return isl_upoly_copy(up);
3570 else
3571 return isl_upoly_zero(up->ctx);
3572 }
3573
3574 rec = isl_upoly_as_rec(up);
3575 if (!rec)
3576 return NULL;
3577
3578 if (up->var == pos) {
3579 if (deg < rec->n)
3580 return isl_upoly_copy(rec->p[deg]);
3581 else
3582 return isl_upoly_zero(up->ctx);
3583 }
3584
3585 up = isl_upoly_copy(up);
3586 up = isl_upoly_cow(up);
3587 rec = isl_upoly_as_rec(up);
3588 if (!rec)
3589 goto error;
3590
3591 for (i = 0; i < rec->n; ++i) {
3592 struct isl_upoly *t;
3593 t = isl_upoly_coeff(rec->p[i], pos, deg);
3594 if (!t)
3595 goto error;
3596 isl_upoly_free(rec->p[i]);
3597 rec->p[i] = t;
3598 }
3599
3600 return up;
3601 error:
3602 isl_upoly_free(up);
3603 return NULL;
3604 }
3605
3606 /* Return coefficient of power "deg" of variable "t_pos" of type "type".
3607 */
3608 __isl_give isl_qpolynomial *isl_qpolynomial_coeff(
3609 __isl_keep isl_qpolynomial *qp,
3610 enum isl_dim_type type, unsigned t_pos, int deg)
3611 {
3612 unsigned g_pos;
3613 struct isl_upoly *up;
3614 isl_qpolynomial *c;
3615
3616 if (!qp)
3617 return NULL;
3618
3619 if (type == isl_dim_out)
3620 isl_die(qp->div->ctx, isl_error_invalid,
3621 "output/set dimension does not have a coefficient",
3622 return NULL);
3623 if (type == isl_dim_in)
3624 type = isl_dim_set;
3625
3626 isl_assert(qp->div->ctx, t_pos < isl_space_dim(qp->dim, type),
3627 return NULL);
3628
3629 g_pos = pos(qp->dim, type) + t_pos;
3630 up = isl_upoly_coeff(qp->upoly, g_pos, deg);
3631
3632 c = isl_qpolynomial_alloc(isl_space_copy(qp->dim), qp->div->n_row, up);
3633 if (!c)
3634 return NULL;
3635 isl_mat_free(c->div);
3636 c->div = isl_mat_copy(qp->div);
3637 if (!c->div)
3638 goto error;
3639 return c;
3640 error:
3641 isl_qpolynomial_free(c);
3642 return NULL;
3643 }
3644
3645 /* Homogenize the polynomial in the variables first (inclusive) up to
3646 * last (exclusive) by inserting powers of variable first.
3647 * Variable first is assumed not to appear in the input.
3648 */
3649 __isl_give struct isl_upoly *isl_upoly_homogenize(
3650 __isl_take struct isl_upoly *up, int deg, int target,
3651 int first, int last)
3652 {
3653 int i;
3654 struct isl_upoly_rec *rec;
3655
3656 if (!up)
3657 return NULL;
3658 if (isl_upoly_is_zero(up))
3659 return up;
3660 if (deg == target)
3661 return up;
3662 if (isl_upoly_is_cst(up) || up->var < first) {
3663 struct isl_upoly *hom;
3664
3665 hom = isl_upoly_var_pow(up->ctx, first, target - deg);
3666 if (!hom)
3667 goto error;
3668 rec = isl_upoly_as_rec(hom);
3669 rec->p[target - deg] = isl_upoly_mul(rec->p[target - deg], up);
3670
3671 return hom;
3672 }
3673
3674 up = isl_upoly_cow(up);
3675 rec = isl_upoly_as_rec(up);
3676 if (!rec)
3677 goto error;
3678
3679 for (i = 0; i < rec->n; ++i) {
3680 if (isl_upoly_is_zero(rec->p[i]))
3681 continue;
3682 rec->p[i] = isl_upoly_homogenize(rec->p[i],
3683 up->var < last ? deg + i : i, target,
3684 first, last);
3685 if (!rec->p[i])
3686 goto error;
3687 }
3688
3689 return up;
3690 error:
3691 isl_upoly_free(up);
3692 return NULL;
3693 }
3694
3695 /* Homogenize the polynomial in the set variables by introducing
3696 * powers of an extra set variable at position 0.
3697 */
3698 __isl_give isl_qpolynomial *isl_qpolynomial_homogenize(
3699 __isl_take isl_qpolynomial *poly)
3700 {
3701 unsigned ovar;
3702 unsigned nvar;
3703 int deg = isl_qpolynomial_degree(poly);
3704
3705 if (deg < -1)
3706 goto error;
3707
3708 poly = isl_qpolynomial_insert_dims(poly, isl_dim_in, 0, 1);
3709 poly = isl_qpolynomial_cow(poly);
3710 if (!poly)
3711 goto error;
3712
3713 ovar = isl_space_offset(poly->dim, isl_dim_set);
3714 nvar = isl_space_dim(poly->dim, isl_dim_set);
3715 poly->upoly = isl_upoly_homogenize(poly->upoly, 0, deg,
3716 ovar, ovar + nvar);
3717 if (!poly->upoly)
3718 goto error;
3719
3720 return poly;
3721 error:
3722 isl_qpolynomial_free(poly);
3723 return NULL;
3724 }
3725
3726 __isl_give isl_term *isl_term_alloc(__isl_take isl_space *dim,
3727 __isl_take isl_mat *div)
3728 {
3729 isl_term *term;
3730 int n;
3731
3732 if (!dim || !div)
3733 goto error;
3734
3735 n = isl_space_dim(dim, isl_dim_all) + div->n_row;
3736
3737 term = isl_calloc(dim->ctx, struct isl_term,
3738 sizeof(struct isl_term) + (n - 1) * sizeof(int));
3739 if (!term)
3740 goto error;
3741
3742 term->ref = 1;
3743 term->dim = dim;
3744 term->div = div;
3745 isl_int_init(term->n);
3746 isl_int_init(term->d);
3747
3748 return term;
3749 error:
3750 isl_space_free(dim);
3751 isl_mat_free(div);
3752 return NULL;
3753 }
3754
3755 __isl_give isl_term *isl_term_copy(__isl_keep isl_term *term)
3756 {
3757 if (!term)
3758 return NULL;
3759
3760 term->ref++;
3761 return term;
3762 }
3763
3764 __isl_give isl_term *isl_term_dup(__isl_keep isl_term *term)
3765 {
3766 int i;
3767 isl_term *dup;
3768 unsigned total;
3769
3770 if (!term)
3771 return NULL;
3772
3773 total = isl_space_dim(term->dim, isl_dim_all) + term->div->n_row;
3774
3775 dup = isl_term_alloc(isl_space_copy(term->dim), isl_mat_copy(term->div));
3776 if (!dup)
3777 return NULL;
3778
3779 isl_int_set(dup->n, term->n);
3780 isl_int_set(dup->d, term->d);
3781
3782 for (i = 0; i < total; ++i)
3783 dup->pow[i] = term->pow[i];
3784
3785 return dup;
3786 }
3787
3788 __isl_give isl_term *isl_term_cow(__isl_take isl_term *term)
3789 {
3790 if (!term)
3791 return NULL;
3792
3793 if (term->ref == 1)
3794 return term;
3795 term->ref--;
3796 return isl_term_dup(term);
3797 }
3798
3799 void isl_term_free(__isl_take isl_term *term)
3800 {
3801 if (!term)
3802 return;
3803
3804 if (--term->ref > 0)
3805 return;
3806
3807 isl_space_free(term->dim);
3808 isl_mat_free(term->div);
3809 isl_int_clear(term->n);
3810 isl_int_clear(term->d);
3811 free(term);
3812 }
3813
3814 unsigned isl_term_dim(__isl_keep isl_term *term, enum isl_dim_type type)
3815 {
3816 if (!term)
3817 return 0;
3818
3819 switch (type) {
3820 case isl_dim_param:
3821 case isl_dim_in:
3822 case isl_dim_out: return isl_space_dim(term->dim, type);
3823 case isl_dim_div: return term->div->n_row;
3824 case isl_dim_all: return isl_space_dim(term->dim, isl_dim_all) +
3825 term->div->n_row;
3826 default: return 0;
3827 }
3828 }
3829
3830 isl_ctx *isl_term_get_ctx(__isl_keep isl_term *term)
3831 {
3832 return term ? term->dim->ctx : NULL;
3833 }
3834
3835 void isl_term_get_num(__isl_keep isl_term *term, isl_int *n)
3836 {
3837 if (!term)
3838 return;
3839 isl_int_set(*n, term->n);
3840 }
3841
3842 /* Return the coefficient of the term "term".
3843 */
3844 __isl_give isl_val *isl_term_get_coefficient_val(__isl_keep isl_term *term)
3845 {
3846 if (!term)
3847 return NULL;
3848
3849 return isl_val_rat_from_isl_int(isl_term_get_ctx(term),
3850 term->n, term->d);
3851 }
3852
3853 int isl_term_get_exp(__isl_keep isl_term *term,
3854 enum isl_dim_type type, unsigned pos)
3855 {
3856 if (!term)
3857 return -1;
3858
3859 isl_assert(term->dim->ctx, pos < isl_term_dim(term, type), return -1);
3860
3861 if (type >= isl_dim_set)
3862 pos += isl_space_dim(term->dim, isl_dim_param);
3863 if (type >= isl_dim_div)
3864 pos += isl_space_dim(term->dim, isl_dim_set);
3865
3866 return term->pow[pos];
3867 }
3868
3869 __isl_give isl_aff *isl_term_get_div(__isl_keep isl_term *term, unsigned pos)
3870 {
3871 isl_local_space *ls;
3872 isl_aff *aff;
3873
3874 if (!term)
3875 return NULL;
3876
3877 isl_assert(term->dim->ctx, pos < isl_term_dim(term, isl_dim_div),
3878 return NULL);
3879
3880 ls = isl_local_space_alloc_div(isl_space_copy(term->dim),
3881 isl_mat_copy(term->div));
3882 aff = isl_aff_alloc(ls);
3883 if (!aff)
3884 return NULL;
3885
3886 isl_seq_cpy(aff->v->el, term->div->row[pos], aff->v->size);
3887
3888 aff = isl_aff_normalize(aff);
3889
3890 return aff;
3891 }
3892
3893 __isl_give isl_term *isl_upoly_foreach_term(__isl_keep struct isl_upoly *up,
3894 isl_stat (*fn)(__isl_take isl_term *term, void *user),
3895 __isl_take isl_term *term, void *user)
3896 {
3897 int i;
3898 struct isl_upoly_rec *rec;
3899
3900 if (!up || !term)
3901 goto error;
3902
3903 if (isl_upoly_is_zero(up))
3904 return term;
3905
3906 isl_assert(up->ctx, !isl_upoly_is_nan(up), goto error);
3907 isl_assert(up->ctx, !isl_upoly_is_infty(up), goto error);
3908 isl_assert(up->ctx, !isl_upoly_is_neginfty(up), goto error);
3909
3910 if (isl_upoly_is_cst(up)) {
3911 struct isl_upoly_cst *cst;
3912 cst = isl_upoly_as_cst(up);
3913 if (!cst)
3914 goto error;
3915 term = isl_term_cow(term);
3916 if (!term)
3917 goto error;
3918 isl_int_set(term->n, cst->n);
3919 isl_int_set(term->d, cst->d);
3920 if (fn(isl_term_copy(term), user) < 0)
3921 goto error;
3922 return term;
3923 }
3924
3925 rec = isl_upoly_as_rec(up);
3926 if (!rec)
3927 goto error;
3928
3929 for (i = 0; i < rec->n; ++i) {
3930 term = isl_term_cow(term);
3931 if (!term)
3932 goto error;
3933 term->pow[up->var] = i;
3934 term = isl_upoly_foreach_term(rec->p[i], fn, term, user);
3935 if (!term)
3936 goto error;
3937 }
3938 term->pow[up->var] = 0;
3939
3940 return term;
3941 error:
3942 isl_term_free(term);
3943 return NULL;
3944 }
3945
3946 isl_stat isl_qpolynomial_foreach_term(__isl_keep isl_qpolynomial *qp,
3947 isl_stat (*fn)(__isl_take isl_term *term, void *user), void *user)
3948 {
3949 isl_term *term;
3950
3951 if (!qp)
3952 return isl_stat_error;
3953
3954 term = isl_term_alloc(isl_space_copy(qp->dim), isl_mat_copy(qp->div));
3955 if (!term)
3956 return isl_stat_error;
3957
3958 term = isl_upoly_foreach_term(qp->upoly, fn, term, user);
3959
3960 isl_term_free(term);
3961
3962 return term ? isl_stat_ok : isl_stat_error;
3963 }
3964
3965 __isl_give isl_qpolynomial *isl_qpolynomial_from_term(__isl_take isl_term *term)
3966 {
3967 struct isl_upoly *up;
3968 isl_qpolynomial *qp;
3969 int i, n;
3970
3971 if (!term)
3972 return NULL;
3973
3974 n = isl_space_dim(term->dim, isl_dim_all) + term->div->n_row;
3975
3976 up = isl_upoly_rat_cst(term->dim->ctx, term->n, term->d);
3977 for (i = 0; i < n; ++i) {
3978 if (!term->pow[i])
3979 continue;
3980 up = isl_upoly_mul(up,
3981 isl_upoly_var_pow(term->dim->ctx, i, term->pow[i]));
3982 }
3983
3984 qp = isl_qpolynomial_alloc(isl_space_copy(term->dim), term->div->n_row, up);
3985 if (!qp)
3986 goto error;
3987 isl_mat_free(qp->div);
3988 qp->div = isl_mat_copy(term->div);
3989 if (!qp->div)
3990 goto error;
3991
3992 isl_term_free(term);
3993 return qp;
3994 error:
3995 isl_qpolynomial_free(qp);
3996 isl_term_free(term);
3997 return NULL;
3998 }
3999
4000 __isl_give isl_qpolynomial *isl_qpolynomial_lift(__isl_take isl_qpolynomial *qp,
4001 __isl_take isl_space *dim)
4002 {
4003 int i;
4004 int extra;
4005 unsigned total;
4006
4007 if (!qp || !dim)
4008 goto error;
4009
4010 if (isl_space_is_equal(qp->dim, dim)) {
4011 isl_space_free(dim);
4012 return qp;
4013 }
4014
4015 qp = isl_qpolynomial_cow(qp);
4016 if (!qp)
4017 goto error;
4018
4019 extra = isl_space_dim(dim, isl_dim_set) -
4020 isl_space_dim(qp->dim, isl_dim_set);
4021 total = isl_space_dim(qp->dim, isl_dim_all);
4022 if (qp->div->n_row) {
4023 int *exp;
4024
4025 exp = isl_alloc_array(qp->div->ctx, int, qp->div->n_row);
4026 if (!exp)
4027 goto error;
4028 for (i = 0; i < qp->div->n_row; ++i)
4029 exp[i] = extra + i;
4030 qp->upoly = expand(qp->upoly, exp, total);
4031 free(exp);
4032 if (!qp->upoly)
4033 goto error;
4034 }
4035 qp->div = isl_mat_insert_cols(qp->div, 2 + total, extra);
4036 if (!qp->div)
4037 goto error;
4038 for (i = 0; i < qp->div->n_row; ++i)
4039 isl_seq_clr(qp->div->row[i] + 2 + total, extra);
4040
4041 isl_space_free(qp->dim);
4042 qp->dim = dim;
4043
4044 return qp;
4045 error:
4046 isl_space_free(dim);
4047 isl_qpolynomial_free(qp);
4048 return NULL;
4049 }
4050
4051 /* For each parameter or variable that does not appear in qp,
4052 * first eliminate the variable from all constraints and then set it to zero.
4053 */
4054 static __isl_give isl_set *fix_inactive(__isl_take isl_set *set,
4055 __isl_keep isl_qpolynomial *qp)
4056 {
4057 int *active = NULL;
4058 int i;
4059 int d;
4060 unsigned nparam;
4061 unsigned nvar;
4062
4063 if (!set || !qp)
4064 goto error;
4065
4066 d = isl_space_dim(set->dim, isl_dim_all);
4067 active = isl_calloc_array(set->ctx, int, d);
4068 if (set_active(qp, active) < 0)
4069 goto error;
4070
4071 for (i = 0; i < d; ++i)
4072 if (!active[i])
4073 break;
4074
4075 if (i == d) {
4076 free(active);
4077 return set;
4078 }
4079
4080 nparam = isl_space_dim(set->dim, isl_dim_param);
4081 nvar = isl_space_dim(set->dim, isl_dim_set);
4082 for (i = 0; i < nparam; ++i) {
4083 if (active[i])
4084 continue;
4085 set = isl_set_eliminate(set, isl_dim_param, i, 1);
4086 set = isl_set_fix_si(set, isl_dim_param, i, 0);
4087 }
4088 for (i = 0; i < nvar; ++i) {
4089 if (active[nparam + i])
4090 continue;
4091 set = isl_set_eliminate(set, isl_dim_set, i, 1);
4092 set = isl_set_fix_si(set, isl_dim_set, i, 0);
4093 }
4094
4095 free(active);
4096
4097 return set;
4098 error:
4099 free(active);
4100 isl_set_free(set);
4101 return NULL;
4102 }
4103
4104 struct isl_opt_data {
4105 isl_qpolynomial *qp;
4106 int first;
4107 isl_val *opt;
4108 int max;
4109 };
4110
4111 static isl_stat opt_fn(__isl_take isl_point *pnt, void *user)
4112 {
4113 struct isl_opt_data *data = (struct isl_opt_data *)user;
4114 isl_val *val;
4115
4116 val = isl_qpolynomial_eval(isl_qpolynomial_copy(data->qp), pnt);
4117 if (data->first) {
4118 data->first = 0;
4119 data->opt = val;
4120 } else if (data->max) {
4121 data->opt = isl_val_max(data->opt, val);
4122 } else {
4123 data->opt = isl_val_min(data->opt, val);
4124 }
4125
4126 return isl_stat_ok;
4127 }
4128
4129 __isl_give isl_val *isl_qpolynomial_opt_on_domain(
4130 __isl_take isl_qpolynomial *qp, __isl_take isl_set *set, int max)
4131 {
4132 struct isl_opt_data data = { NULL, 1, NULL, max };
4133
4134 if (!set || !qp)
4135 goto error;
4136
4137 if (isl_upoly_is_cst(qp->upoly)) {
4138 isl_set_free(set);
4139 data.opt = isl_qpolynomial_get_constant_val(qp);
4140 isl_qpolynomial_free(qp);
4141 return data.opt;
4142 }
4143
4144 set = fix_inactive(set, qp);
4145
4146 data.qp = qp;
4147 if (isl_set_foreach_point(set, opt_fn, &data) < 0)
4148 goto error;
4149
4150 if (data.first)
4151 data.opt = isl_val_zero(isl_set_get_ctx(set));
4152
4153 isl_set_free(set);
4154 isl_qpolynomial_free(qp);
4155 return data.opt;
4156 error:
4157 isl_set_free(set);
4158 isl_qpolynomial_free(qp);
4159 isl_val_free(data.opt);
4160 return NULL;
4161 }
4162
4163 __isl_give isl_qpolynomial *isl_qpolynomial_morph_domain(
4164 __isl_take isl_qpolynomial *qp, __isl_take isl_morph *morph)
4165 {
4166 int i;
4167 int n_sub;
4168 isl_ctx *ctx;
4169 struct isl_upoly **subs;
4170 isl_mat *mat, *diag;
4171
4172 qp = isl_qpolynomial_cow(qp);
4173 if (!qp || !morph)
4174 goto error;
4175
4176 ctx = qp->dim->ctx;
4177 isl_assert(ctx, isl_space_is_equal(qp->dim, morph->dom->dim), goto error);
4178
4179 n_sub = morph->inv->n_row - 1;
4180 if (morph->inv->n_row != morph->inv->n_col)
4181 n_sub += qp->div->n_row;
4182 subs = isl_calloc_array(ctx, struct isl_upoly *, n_sub);
4183 if (n_sub && !subs)
4184 goto error;
4185
4186 for (i = 0; 1 + i < morph->inv->n_row; ++i)
4187 subs[i] = isl_upoly_from_affine(ctx, morph->inv->row[1 + i],
4188 morph->inv->row[0][0], morph->inv->n_col);
4189 if (morph->inv->n_row != morph->inv->n_col)
4190 for (i = 0; i < qp->div->n_row; ++i)
4191 subs[morph->inv->n_row - 1 + i] =
4192 isl_upoly_var_pow(ctx, morph->inv->n_col - 1 + i, 1);
4193
4194 qp->upoly = isl_upoly_subs(qp->upoly, 0, n_sub, subs);
4195
4196 for (i = 0; i < n_sub; ++i)
4197 isl_upoly_free(subs[i]);
4198 free(subs);
4199
4200 diag = isl_mat_diag(ctx, 1, morph->inv->row[0][0]);
4201 mat = isl_mat_diagonal(diag, isl_mat_copy(morph->inv));
4202 diag = isl_mat_diag(ctx, qp->div->n_row, morph->inv->row[0][0]);
4203 mat = isl_mat_diagonal(mat, diag);
4204 qp->div = isl_mat_product(qp->div, mat);
4205 isl_space_free(qp->dim);
4206 qp->dim = isl_space_copy(morph->ran->dim);
4207
4208 if (!qp->upoly || !qp->div || !qp->dim)
4209 goto error;
4210
4211 isl_morph_free(morph);
4212
4213 return qp;
4214 error:
4215 isl_qpolynomial_free(qp);
4216 isl_morph_free(morph);
4217 return NULL;
4218 }
4219
4220 __isl_give isl_union_pw_qpolynomial *isl_union_pw_qpolynomial_mul(
4221 __isl_take isl_union_pw_qpolynomial *upwqp1,
4222 __isl_take isl_union_pw_qpolynomial *upwqp2)
4223 {
4224 return isl_union_pw_qpolynomial_match_bin_op(upwqp1, upwqp2,
4225 &isl_pw_qpolynomial_mul);
4226 }
4227
4228 /* Reorder the columns of the given div definitions according to the
4229 * given reordering.
4230 */
4231 static __isl_give isl_mat *reorder_divs(__isl_take isl_mat *div,
4232 __isl_take isl_reordering *r)
4233 {
4234 int i, j;
4235 isl_mat *mat;
4236 int extra;
4237
4238 if (!div || !r)
4239 goto error;
4240
4241 extra = isl_space_dim(r->dim, isl_dim_all) + div->n_row - r->len;
4242 mat = isl_mat_alloc(div->ctx, div->n_row, div->n_col + extra);
4243 if (!mat)
4244 goto error;
4245
4246 for (i = 0; i < div->n_row; ++i) {
4247 isl_seq_cpy(mat->row[i], div->row[i], 2);
4248 isl_seq_clr(mat->row[i] + 2, mat->n_col - 2);
4249 for (j = 0; j < r->len; ++j)
4250 isl_int_set(mat->row[i][2 + r->pos[j]],
4251 div->row[i][2 + j]);
4252 }
4253
4254 isl_reordering_free(r);
4255 isl_mat_free(div);
4256 return mat;
4257 error:
4258 isl_reordering_free(r);
4259 isl_mat_free(div);
4260 return NULL;
4261 }
4262
4263 /* Reorder the dimension of "qp" according to the given reordering.
4264 */
4265 __isl_give isl_qpolynomial *isl_qpolynomial_realign_domain(
4266 __isl_take isl_qpolynomial *qp, __isl_take isl_reordering *r)
4267 {
4268 qp = isl_qpolynomial_cow(qp);
4269 if (!qp)
4270 goto error;
4271
4272 r = isl_reordering_extend(r, qp->div->n_row);
4273 if (!r)
4274 goto error;
4275
4276 qp->div = reorder_divs(qp->div, isl_reordering_copy(r));
4277 if (!qp->div)
4278 goto error;
4279
4280 qp->upoly = reorder(qp->upoly, r->pos);
4281 if (!qp->upoly)
4282 goto error;
4283
4284 qp = isl_qpolynomial_reset_domain_space(qp, isl_space_copy(r->dim));
4285
4286 isl_reordering_free(r);
4287 return qp;
4288 error:
4289 isl_qpolynomial_free(qp);
4290 isl_reordering_free(r);
4291 return NULL;
4292 }
4293
4294 __isl_give isl_qpolynomial *isl_qpolynomial_align_params(
4295 __isl_take isl_qpolynomial *qp, __isl_take isl_space *model)
4296 {
4297 isl_bool equal_params;
4298
4299 if (!qp || !model)
4300 goto error;
4301
4302 equal_params = isl_space_has_equal_params(qp->dim, model);
4303 if (equal_params < 0)
4304 goto error;
4305 if (!equal_params) {
4306 isl_reordering *exp;
4307
4308 model = isl_space_drop_dims(model, isl_dim_in,
4309 0, isl_space_dim(model, isl_dim_in));
4310 model = isl_space_drop_dims(model, isl_dim_out,
4311 0, isl_space_dim(model, isl_dim_out));
4312 exp = isl_parameter_alignment_reordering(qp->dim, model);
4313 exp = isl_reordering_extend_space(exp,
4314 isl_qpolynomial_get_domain_space(qp));
4315 qp = isl_qpolynomial_realign_domain(qp, exp);
4316 }
4317
4318 isl_space_free(model);
4319 return qp;
4320 error:
4321 isl_space_free(model);
4322 isl_qpolynomial_free(qp);
4323 return NULL;
4324 }
4325
4326 struct isl_split_periods_data {
4327 int max_periods;
4328 isl_pw_qpolynomial *res;
4329 };
4330
4331 /* Create a slice where the integer division "div" has the fixed value "v".
4332 * In particular, if "div" refers to floor(f/m), then create a slice
4333 *
4334 * m v <= f <= m v + (m - 1)
4335 *
4336 * or
4337 *
4338 * f - m v >= 0
4339 * -f + m v + (m - 1) >= 0
4340 */
4341 static __isl_give isl_set *set_div_slice(__isl_take isl_space *dim,
4342 __isl_keep isl_qpolynomial *qp, int div, isl_int v)
4343 {
4344 int total;
4345 isl_basic_set *bset = NULL;
4346 int k;
4347
4348 if (!dim || !qp)
4349 goto error;
4350
4351 total = isl_space_dim(dim, isl_dim_all);
4352 bset = isl_basic_set_alloc_space(isl_space_copy(dim), 0, 0, 2);
4353
4354 k = isl_basic_set_alloc_inequality(bset);
4355 if (k < 0)
4356 goto error;
4357 isl_seq_cpy(bset->ineq[k], qp->div->row[div] + 1, 1 + total);
4358 isl_int_submul(bset->ineq[k][0], v, qp->div->row[div][0]);
4359
4360 k = isl_basic_set_alloc_inequality(bset);
4361 if (k < 0)
4362 goto error;
4363 isl_seq_neg(bset->ineq[k], qp->div->row[div] + 1, 1 + total);
4364 isl_int_addmul(bset->ineq[k][0], v, qp->div->row[div][0]);
4365 isl_int_add(bset->ineq[k][0], bset->ineq[k][0], qp->div->row[div][0]);
4366 isl_int_sub_ui(bset->ineq[k][0], bset->ineq[k][0], 1);
4367
4368 isl_space_free(dim);
4369 return isl_set_from_basic_set(bset);
4370 error:
4371 isl_basic_set_free(bset);
4372 isl_space_free(dim);
4373 return NULL;
4374 }
4375
4376 static isl_stat split_periods(__isl_take isl_set *set,
4377 __isl_take isl_qpolynomial *qp, void *user);
4378
4379 /* Create a slice of the domain "set" such that integer division "div"
4380 * has the fixed value "v" and add the results to data->res,
4381 * replacing the integer division by "v" in "qp".
4382 */
4383 static isl_stat set_div(__isl_take isl_set *set,
4384 __isl_take isl_qpolynomial *qp, int div, isl_int v,
4385 struct isl_split_periods_data *data)
4386 {
4387 int i;
4388 int total;
4389 isl_set *slice;
4390 struct isl_upoly *cst;
4391
4392 slice = set_div_slice(isl_set_get_space(set), qp, div, v);
4393 set = isl_set_intersect(set, slice);
4394
4395 if (!qp)
4396 goto error;
4397
4398 total = isl_space_dim(qp->dim, isl_dim_all);
4399
4400 for (i = div + 1; i < qp->div->n_row; ++i) {
4401 if (isl_int_is_zero(qp->div->row[i][2 + total + div]))
4402 continue;
4403 isl_int_addmul(qp->div->row[i][1],
4404 qp->div->row[i][2 + total + div], v);
4405 isl_int_set_si(qp->div->row[i][2 + total + div], 0);
4406 }
4407
4408 cst = isl_upoly_rat_cst(qp->dim->ctx, v, qp->dim->ctx->one);
4409 qp = substitute_div(qp, div, cst);
4410
4411 return split_periods(set, qp, data);
4412 error:
4413 isl_set_free(set);
4414 isl_qpolynomial_free(qp);
4415 return -1;
4416 }
4417
4418 /* Split the domain "set" such that integer division "div"
4419 * has a fixed value (ranging from "min" to "max") on each slice
4420 * and add the results to data->res.
4421 */
4422 static isl_stat split_div(__isl_take isl_set *set,
4423 __isl_take isl_qpolynomial *qp, int div, isl_int min, isl_int max,
4424 struct isl_split_periods_data *data)
4425 {
4426 for (; isl_int_le(min, max); isl_int_add_ui(min, min, 1)) {
4427 isl_set *set_i = isl_set_copy(set);
4428 isl_qpolynomial *qp_i = isl_qpolynomial_copy(qp);
4429
4430 if (set_div(set_i, qp_i, div, min, data) < 0)
4431 goto error;
4432 }
4433 isl_set_free(set);
4434 isl_qpolynomial_free(qp);
4435 return isl_stat_ok;
4436 error:
4437 isl_set_free(set);
4438 isl_qpolynomial_free(qp);
4439 return isl_stat_error;
4440 }
4441
4442 /* If "qp" refers to any integer division
4443 * that can only attain "max_periods" distinct values on "set"
4444 * then split the domain along those distinct values.
4445 * Add the results (or the original if no splitting occurs)
4446 * to data->res.
4447 */
4448 static isl_stat split_periods(__isl_take isl_set *set,
4449 __isl_take isl_qpolynomial *qp, void *user)
4450 {
4451 int i;
4452 isl_pw_qpolynomial *pwqp;
4453 struct isl_split_periods_data *data;
4454 isl_int min, max;
4455 int total;
4456 isl_stat r = isl_stat_ok;
4457
4458 data = (struct isl_split_periods_data *)user;
4459
4460 if (!set || !qp)
4461 goto error;
4462
4463 if (qp->div->n_row == 0) {
4464 pwqp = isl_pw_qpolynomial_alloc(set, qp);
4465 data->res = isl_pw_qpolynomial_add_disjoint(data->res, pwqp);
4466 return isl_stat_ok;
4467 }
4468
4469 isl_int_init(min);
4470 isl_int_init(max);
4471 total = isl_space_dim(qp->dim, isl_dim_all);
4472 for (i = 0; i < qp->div->n_row; ++i) {
4473 enum isl_lp_result lp_res;
4474
4475 if (isl_seq_first_non_zero(qp->div->row[i] + 2 + total,
4476 qp->div->n_row) != -1)
4477 continue;
4478
4479 lp_res = isl_set_solve_lp(set, 0, qp->div->row[i] + 1,
4480 set->ctx->one, &min, NULL, NULL);
4481 if (lp_res == isl_lp_error)
4482 goto error2;
4483 if (lp_res == isl_lp_unbounded || lp_res == isl_lp_empty)
4484 continue;
4485 isl_int_fdiv_q(min, min, qp->div->row[i][0]);
4486
4487 lp_res = isl_set_solve_lp(set, 1, qp->div->row[i] + 1,
4488 set->ctx->one, &max, NULL, NULL);
4489 if (lp_res == isl_lp_error)
4490 goto error2;
4491 if (lp_res == isl_lp_unbounded || lp_res == isl_lp_empty)
4492 continue;
4493 isl_int_fdiv_q(max, max, qp->div->row[i][0]);
4494
4495 isl_int_sub(max, max, min);
4496 if (isl_int_cmp_si(max, data->max_periods) < 0) {
4497 isl_int_add(max, max, min);
4498 break;
4499 }
4500 }
4501
4502 if (i < qp->div->n_row) {
4503 r = split_div(set, qp, i, min, max, data);
4504 } else {
4505 pwqp = isl_pw_qpolynomial_alloc(set, qp);
4506 data->res = isl_pw_qpolynomial_add_disjoint(data->res, pwqp);
4507 }
4508
4509 isl_int_clear(max);
4510 isl_int_clear(min);
4511
4512 return r;
4513 error2:
4514 isl_int_clear(max);
4515 isl_int_clear(min);
4516 error:
4517 isl_set_free(set);
4518 isl_qpolynomial_free(qp);
4519 return isl_stat_error;
4520 }
4521
4522 /* If any quasi-polynomial in pwqp refers to any integer division
4523 * that can only attain "max_periods" distinct values on its domain
4524 * then split the domain along those distinct values.
4525 */
4526 __isl_give isl_pw_qpolynomial *isl_pw_qpolynomial_split_periods(
4527 __isl_take isl_pw_qpolynomial *pwqp, int max_periods)
4528 {
4529 struct isl_split_periods_data data;
4530
4531 data.max_periods = max_periods;
4532 data.res = isl_pw_qpolynomial_zero(isl_pw_qpolynomial_get_space(pwqp));
4533
4534 if (isl_pw_qpolynomial_foreach_piece(pwqp, &split_periods, &data) < 0)
4535 goto error;
4536
4537 isl_pw_qpolynomial_free(pwqp);
4538
4539 return data.res;
4540 error:
4541 isl_pw_qpolynomial_free(data.res);
4542 isl_pw_qpolynomial_free(pwqp);
4543 return NULL;
4544 }
4545
4546 /* Construct a piecewise quasipolynomial that is constant on the given
4547 * domain. In particular, it is
4548 * 0 if cst == 0
4549 * 1 if cst == 1
4550 * infinity if cst == -1
4551 *
4552 * If cst == -1, then explicitly check whether the domain is empty and,
4553 * if so, return 0 instead.
4554 */
4555 static __isl_give isl_pw_qpolynomial *constant_on_domain(
4556 __isl_take isl_basic_set *bset, int cst)
4557 {
4558 isl_space *dim;
4559 isl_qpolynomial *qp;
4560
4561 if (cst < 0 && isl_basic_set_is_empty(bset) == isl_bool_true)
4562 cst = 0;
4563 if (!bset)
4564 return NULL;
4565
4566 bset = isl_basic_set_params(bset);
4567 dim = isl_basic_set_get_space(bset);
4568 if (cst < 0)
4569 qp = isl_qpolynomial_infty_on_domain(dim);
4570 else if (cst == 0)
4571 qp = isl_qpolynomial_zero_on_domain(dim);
4572 else
4573 qp = isl_qpolynomial_one_on_domain(dim);
4574 return isl_pw_qpolynomial_alloc(isl_set_from_basic_set(bset), qp);
4575 }
4576
4577 /* Factor bset, call fn on each of the factors and return the product.
4578 *
4579 * If no factors can be found, simply call fn on the input.
4580 * Otherwise, construct the factors based on the factorizer,
4581 * call fn on each factor and compute the product.
4582 */
4583 static __isl_give isl_pw_qpolynomial *compressed_multiplicative_call(
4584 __isl_take isl_basic_set *bset,
4585 __isl_give isl_pw_qpolynomial *(*fn)(__isl_take isl_basic_set *bset))
4586 {
4587 int i, n;
4588 isl_space *space;
4589 isl_set *set;
4590 isl_factorizer *f;
4591 isl_qpolynomial *qp;
4592 isl_pw_qpolynomial *pwqp;
4593 unsigned nparam;
4594 unsigned nvar;
4595
4596 f = isl_basic_set_factorizer(bset);
4597 if (!f)
4598 goto error;
4599 if (f->n_group == 0) {
4600 isl_factorizer_free(f);
4601 return fn(bset);
4602 }
4603
4604 nparam = isl_basic_set_dim(bset, isl_dim_param);
4605 nvar = isl_basic_set_dim(bset, isl_dim_set);
4606
4607 space = isl_basic_set_get_space(bset);
4608 space = isl_space_params(space);
4609 set = isl_set_universe(isl_space_copy(space));
4610 qp = isl_qpolynomial_one_on_domain(space);
4611 pwqp = isl_pw_qpolynomial_alloc(set, qp);
4612
4613 bset = isl_morph_basic_set(isl_morph_copy(f->morph), bset);
4614
4615 for (i = 0, n = 0; i < f->n_group; ++i) {
4616 isl_basic_set *bset_i;
4617 isl_pw_qpolynomial *pwqp_i;
4618
4619 bset_i = isl_basic_set_copy(bset);
4620 bset_i = isl_basic_set_drop_constraints_involving(bset_i,
4621 nparam + n + f->len[i], nvar - n - f->len[i]);
4622 bset_i = isl_basic_set_drop_constraints_involving(bset_i,
4623 nparam, n);
4624 bset_i = isl_basic_set_drop(bset_i, isl_dim_set,
4625 n + f->len[i], nvar - n - f->len[i]);
4626 bset_i = isl_basic_set_drop(bset_i, isl_dim_set, 0, n);
4627
4628 pwqp_i = fn(bset_i);
4629 pwqp = isl_pw_qpolynomial_mul(pwqp, pwqp_i);
4630
4631 n += f->len[i];
4632 }
4633
4634 isl_basic_set_free(bset);
4635 isl_factorizer_free(f);
4636
4637 return pwqp;
4638 error:
4639 isl_basic_set_free(bset);
4640 return NULL;
4641 }
4642
4643 /* Factor bset, call fn on each of the factors and return the product.
4644 * The function is assumed to evaluate to zero on empty domains,
4645 * to one on zero-dimensional domains and to infinity on unbounded domains
4646 * and will not be called explicitly on zero-dimensional or unbounded domains.
4647 *
4648 * We first check for some special cases and remove all equalities.
4649 * Then we hand over control to compressed_multiplicative_call.
4650 */
4651 __isl_give isl_pw_qpolynomial *isl_basic_set_multiplicative_call(
4652 __isl_take isl_basic_set *bset,
4653 __isl_give isl_pw_qpolynomial *(*fn)(__isl_take isl_basic_set *bset))
4654 {
4655 isl_bool bounded;
4656 isl_morph *morph;
4657 isl_pw_qpolynomial *pwqp;
4658
4659 if (!bset)
4660 return NULL;
4661
4662 if (isl_basic_set_plain_is_empty(bset))
4663 return constant_on_domain(bset, 0);
4664
4665 if (isl_basic_set_dim(bset, isl_dim_set) == 0)
4666 return constant_on_domain(bset, 1);
4667
4668 bounded = isl_basic_set_is_bounded(bset);
4669 if (bounded < 0)
4670 goto error;
4671 if (!bounded)
4672 return constant_on_domain(bset, -1);
4673
4674 if (bset->n_eq == 0)
4675 return compressed_multiplicative_call(bset, fn);
4676
4677 morph = isl_basic_set_full_compression(bset);
4678 bset = isl_morph_basic_set(isl_morph_copy(morph), bset);
4679
4680 pwqp = compressed_multiplicative_call(bset, fn);
4681
4682 morph = isl_morph_dom_params(morph);
4683 morph = isl_morph_ran_params(morph);
4684 morph = isl_morph_inverse(morph);
4685
4686 pwqp = isl_pw_qpolynomial_morph_domain(pwqp, morph);
4687
4688 return pwqp;
4689 error:
4690 isl_basic_set_free(bset);
4691 return NULL;
4692 }
4693
4694 /* Drop all floors in "qp", turning each integer division [a/m] into
4695 * a rational division a/m. If "down" is set, then the integer division
4696 * is replaced by (a-(m-1))/m instead.
4697 */
4698 static __isl_give isl_qpolynomial *qp_drop_floors(
4699 __isl_take isl_qpolynomial *qp, int down)
4700 {
4701 int i;
4702 struct isl_upoly *s;
4703
4704 if (!qp)
4705 return NULL;
4706 if (qp->div->n_row == 0)
4707 return qp;
4708
4709 qp = isl_qpolynomial_cow(qp);
4710 if (!qp)
4711 return NULL;
4712
4713 for (i = qp->div->n_row - 1; i >= 0; --i) {
4714 if (down) {
4715 isl_int_sub(qp->div->row[i][1],
4716 qp->div->row[i][1], qp->div->row[i][0]);
4717 isl_int_add_ui(qp->div->row[i][1],
4718 qp->div->row[i][1], 1);
4719 }
4720 s = isl_upoly_from_affine(qp->dim->ctx, qp->div->row[i] + 1,
4721 qp->div->row[i][0], qp->div->n_col - 1);
4722 qp = substitute_div(qp, i, s);
4723 if (!qp)
4724 return NULL;
4725 }
4726
4727 return qp;
4728 }
4729
4730 /* Drop all floors in "pwqp", turning each integer division [a/m] into
4731 * a rational division a/m.
4732 */
4733 static __isl_give isl_pw_qpolynomial *pwqp_drop_floors(
4734 __isl_take isl_pw_qpolynomial *pwqp)
4735 {
4736 int i;
4737
4738 if (!pwqp)
4739 return NULL;
4740
4741 if (isl_pw_qpolynomial_is_zero(pwqp))
4742 return pwqp;
4743
4744 pwqp = isl_pw_qpolynomial_cow(pwqp);
4745 if (!pwqp)
4746 return NULL;
4747
4748 for (i = 0; i < pwqp->n; ++i) {
4749 pwqp->p[i].qp = qp_drop_floors(pwqp->p[i].qp, 0);
4750 if (!pwqp->p[i].qp)
4751 goto error;
4752 }
4753
4754 return pwqp;
4755 error:
4756 isl_pw_qpolynomial_free(pwqp);
4757 return NULL;
4758 }
4759
4760 /* Adjust all the integer divisions in "qp" such that they are at least
4761 * one over the given orthant (identified by "signs"). This ensures
4762 * that they will still be non-negative even after subtracting (m-1)/m.
4763 *
4764 * In particular, f is replaced by f' + v, changing f = [a/m]
4765 * to f' = [(a - m v)/m].
4766 * If the constant term k in a is smaller than m,
4767 * the constant term of v is set to floor(k/m) - 1.
4768 * For any other term, if the coefficient c and the variable x have
4769 * the same sign, then no changes are needed.
4770 * Otherwise, if the variable is positive (and c is negative),
4771 * then the coefficient of x in v is set to floor(c/m).
4772 * If the variable is negative (and c is positive),
4773 * then the coefficient of x in v is set to ceil(c/m).
4774 */
4775 static __isl_give isl_qpolynomial *make_divs_pos(__isl_take isl_qpolynomial *qp,
4776 int *signs)
4777 {
4778 int i, j;
4779 int total;
4780 isl_vec *v = NULL;
4781 struct isl_upoly *s;
4782
4783 qp = isl_qpolynomial_cow(qp);
4784 if (!qp)
4785 return NULL;
4786 qp->div = isl_mat_cow(qp->div);
4787 if (!qp->div)
4788 goto error;
4789
4790 total = isl_space_dim(qp->dim, isl_dim_all);
4791 v = isl_vec_alloc(qp->div->ctx, qp->div->n_col - 1);
4792
4793 for (i = 0; i < qp->div->n_row; ++i) {
4794 isl_int *row = qp->div->row[i];
4795 v = isl_vec_clr(v);
4796 if (!v)
4797 goto error;
4798 if (isl_int_lt(row[1], row[0])) {
4799 isl_int_fdiv_q(v->el[0], row[1], row[0]);
4800 isl_int_sub_ui(v->el[0], v->el[0], 1);
4801 isl_int_submul(row[1], row[0], v->el[0]);
4802 }
4803 for (j = 0; j < total; ++j) {
4804 if (isl_int_sgn(row[2 + j]) * signs[j] >= 0)
4805 continue;
4806 if (signs[j] < 0)
4807 isl_int_cdiv_q(v->el[1 + j], row[2 + j], row[0]);
4808 else
4809 isl_int_fdiv_q(v->el[1 + j], row[2 + j], row[0]);
4810 isl_int_submul(row[2 + j], row[0], v->el[1 + j]);
4811 }
4812 for (j = 0; j < i; ++j) {
4813 if (isl_int_sgn(row[2 + total + j]) >= 0)
4814 continue;
4815 isl_int_fdiv_q(v->el[1 + total + j],
4816 row[2 + total + j], row[0]);
4817 isl_int_submul(row[2 + total + j],
4818 row[0], v->el[1 + total + j]);
4819 }
4820 for (j = i + 1; j < qp->div->n_row; ++j) {
4821 if (isl_int_is_zero(qp->div->row[j][2 + total + i]))
4822 continue;
4823 isl_seq_combine(qp->div->row[j] + 1,
4824 qp->div->ctx->one, qp->div->row[j] + 1,
4825 qp->div->row[j][2 + total + i], v->el, v->size);
4826 }
4827 isl_int_set_si(v->el[1 + total + i], 1);
4828 s = isl_upoly_from_affine(qp->dim->ctx, v->el,
4829 qp->div->ctx->one, v->size);
4830 qp->upoly = isl_upoly_subs(qp->upoly, total + i, 1, &s);
4831 isl_upoly_free(s);
4832 if (!qp->upoly)
4833 goto error;
4834 }
4835
4836 isl_vec_free(v);
4837 return qp;
4838 error:
4839 isl_vec_free(v);
4840 isl_qpolynomial_free(qp);
4841 return NULL;
4842 }
4843
4844 struct isl_to_poly_data {
4845 int sign;
4846 isl_pw_qpolynomial *res;
4847 isl_qpolynomial *qp;
4848 };
4849
4850 /* Appoximate data->qp by a polynomial on the orthant identified by "signs".
4851 * We first make all integer divisions positive and then split the
4852 * quasipolynomials into terms with sign data->sign (the direction
4853 * of the requested approximation) and terms with the opposite sign.
4854 * In the first set of terms, each integer division [a/m] is
4855 * overapproximated by a/m, while in the second it is underapproximated
4856 * by (a-(m-1))/m.
4857 */
4858 static isl_stat to_polynomial_on_orthant(__isl_take isl_set *orthant,
4859 int *signs, void *user)
4860 {
4861 struct isl_to_poly_data *data = user;
4862 isl_pw_qpolynomial *t;
4863 isl_qpolynomial *qp, *up, *down;
4864
4865 qp = isl_qpolynomial_copy(data->qp);
4866 qp = make_divs_pos(qp, signs);
4867
4868 up = isl_qpolynomial_terms_of_sign(qp, signs, data->sign);
4869 up = qp_drop_floors(up, 0);
4870 down = isl_qpolynomial_terms_of_sign(qp, signs, -data->sign);
4871 down = qp_drop_floors(down, 1);
4872
4873 isl_qpolynomial_free(qp);
4874 qp = isl_qpolynomial_add(up, down);
4875
4876 t = isl_pw_qpolynomial_alloc(orthant, qp);
4877 data->res = isl_pw_qpolynomial_add_disjoint(data->res, t);
4878
4879 return isl_stat_ok;
4880 }
4881
4882 /* Approximate each quasipolynomial by a polynomial. If "sign" is positive,
4883 * the polynomial will be an overapproximation. If "sign" is negative,
4884 * it will be an underapproximation. If "sign" is zero, the approximation
4885 * will lie somewhere in between.
4886 *
4887 * In particular, is sign == 0, we simply drop the floors, turning
4888 * the integer divisions into rational divisions.
4889 * Otherwise, we split the domains into orthants, make all integer divisions
4890 * positive and then approximate each [a/m] by either a/m or (a-(m-1))/m,
4891 * depending on the requested sign and the sign of the term in which
4892 * the integer division appears.
4893 */
4894 __isl_give isl_pw_qpolynomial *isl_pw_qpolynomial_to_polynomial(
4895 __isl_take isl_pw_qpolynomial *pwqp, int sign)
4896 {
4897 int i;
4898 struct isl_to_poly_data data;
4899
4900 if (sign == 0)
4901 return pwqp_drop_floors(pwqp);
4902
4903 if (!pwqp)
4904 return NULL;
4905
4906 data.sign = sign;
4907 data.res = isl_pw_qpolynomial_zero(isl_pw_qpolynomial_get_space(pwqp));
4908
4909 for (i = 0; i < pwqp->n; ++i) {
4910 if (pwqp->p[i].qp->div->n_row == 0) {
4911 isl_pw_qpolynomial *t;
4912 t = isl_pw_qpolynomial_alloc(
4913 isl_set_copy(pwqp->p[i].set),
4914 isl_qpolynomial_copy(pwqp->p[i].qp));
4915 data.res = isl_pw_qpolynomial_add_disjoint(data.res, t);
4916 continue;
4917 }
4918 data.qp = pwqp->p[i].qp;
4919 if (isl_set_foreach_orthant(pwqp->p[i].set,
4920 &to_polynomial_on_orthant, &data) < 0)
4921 goto error;
4922 }
4923
4924 isl_pw_qpolynomial_free(pwqp);
4925
4926 return data.res;
4927 error:
4928 isl_pw_qpolynomial_free(pwqp);
4929 isl_pw_qpolynomial_free(data.res);
4930 return NULL;
4931 }
4932
4933 static __isl_give isl_pw_qpolynomial *poly_entry(
4934 __isl_take isl_pw_qpolynomial *pwqp, void *user)
4935 {
4936 int *sign = user;
4937
4938 return isl_pw_qpolynomial_to_polynomial(pwqp, *sign);
4939 }
4940
4941 __isl_give isl_union_pw_qpolynomial *isl_union_pw_qpolynomial_to_polynomial(
4942 __isl_take isl_union_pw_qpolynomial *upwqp, int sign)
4943 {
4944 return isl_union_pw_qpolynomial_transform_inplace(upwqp,
4945 &poly_entry, &sign);
4946 }
4947
4948 __isl_give isl_basic_map *isl_basic_map_from_qpolynomial(
4949 __isl_take isl_qpolynomial *qp)
4950 {
4951 int i, k;
4952 isl_space *dim;
4953 isl_vec *aff = NULL;
4954 isl_basic_map *bmap = NULL;
4955 unsigned pos;
4956 unsigned n_div;
4957
4958 if (!qp)
4959 return NULL;
4960 if (!isl_upoly_is_affine(qp->upoly))
4961 isl_die(qp->dim->ctx, isl_error_invalid,
4962 "input quasi-polynomial not affine", goto error);
4963 aff = isl_qpolynomial_extract_affine(qp);
4964 if (!aff)
4965 goto error;
4966 dim = isl_qpolynomial_get_space(qp);
4967 pos = 1 + isl_space_offset(dim, isl_dim_out);
4968 n_div = qp->div->n_row;
4969 bmap = isl_basic_map_alloc_space(dim, n_div, 1, 2 * n_div);
4970
4971 for (i = 0; i < n_div; ++i) {
4972 k = isl_basic_map_alloc_div(bmap);
4973 if (k < 0)
4974 goto error;
4975 isl_seq_cpy(bmap->div[k], qp->div->row[i], qp->div->n_col);
4976 isl_int_set_si(bmap->div[k][qp->div->n_col], 0);
4977 if (isl_basic_map_add_div_constraints(bmap, k) < 0)
4978 goto error;
4979 }
4980 k = isl_basic_map_alloc_equality(bmap);
4981 if (k < 0)
4982 goto error;
4983 isl_int_neg(bmap->eq[k][pos], aff->el[0]);
4984 isl_seq_cpy(bmap->eq[k], aff->el + 1, pos);
4985 isl_seq_cpy(bmap->eq[k] + pos + 1, aff->el + 1 + pos, n_div);
4986
4987 isl_vec_free(aff);
4988 isl_qpolynomial_free(qp);
4989 bmap = isl_basic_map_finalize(bmap);
4990 return bmap;
4991 error:
4992 isl_vec_free(aff);
4993 isl_qpolynomial_free(qp);
4994 isl_basic_map_free(bmap);
4995 return NULL;
4996 }
Integer set library