4b0528fae9c54634ab0e2838d440cda91c89e64c
| blob | 4b0528fae9c54634ab0e2838d440cda91c89e64c |
1 #include <assert.h>
2 #include <NTL/mat_ZZ.h>
3 #include <NTL/vec_ZZ.h>
4 #include <barvinok/barvinok.h>
5 #include <barvinok/evalue.h>
6 #include <barvinok/util.h>
15 #define ALLOC(type) (type*)malloc(sizeof(type))
17 /* returns an evalue that corresponds to
18 *
19 * c/(*den) x_param
20 */
22 {
31 else
35 }
37 /* returns an evalue that corresponds to
38 *
39 * sum_i p[i] * x_i
40 */
42 {
56 }
58 }
60 /*
61 * Check whether mapping polyhedron P on the affine combination
62 * num yields a range that has a fixed quotient on integer
63 * division by d
64 * If zero is true, then we are only interested in the quotient
65 * for the cases where the remainder is zero.
66 * Returns NULL if false and a newly allocated value if true.
67 */
69 {
83 }
93 else
101 }
105 }
107 /*
108 * Normalize linear expression coef modulo m
109 * Removes common factor and reduces coefficients
110 * Returns index of first non-zero coefficient or len
111 */
113 {
114 Value gcd;
135 }
138 {
145 evalue EV;
155 }
157 /* Computes the fractional part of the affine expression specified
158 * by coef (of length nvar+1) and the denominator denom.
159 * If PD is not NULL, then it specifies additional constraints
160 * on the variables that may be used to simplify the resulting
161 * fractional part expression.
162 *
163 * Modifies coef argument !
164 */
166 {
167 Value m;
178 }
180 vec_ZZ num;
183 ZZ g;
186 evalue tmp;
204 }
213 evalue EV;
237 }
241 }
245 out:
249 }
251 /* Computes the ceil of the affine expression specified
252 * by coef (of length nvar+1) and the denominator denom.
253 * If PD is not NULL, then it specifies additional constraints
254 * on the variables that may be used to simplify the resulting
255 * ceil expression.
256 *
257 * Modifies coef argument !
258 */
260 {
268 }
272 {
280 }
285 {
302 }
303 }
306 {
312 }
314 #define FORALL_COSETS(det,D,i,k) \
315 do { \
316 Vector *k = Vector_Alloc(D->NbRows+1); \
317 value_set_si(k->p[D->NbRows], 1); \
318 for (unsigned long i = 0; i < det; ++i) { \
319 if (i) \
320 for (int j = D->NbRows-1; j >= 0; --j) { \
321 value_increment(k->p[j], k->p[j]); \
322 if (value_eq(k->p[j], D->p[j][j])) \
323 value_set_si(k->p[j], 0); \
324 else \
325 break; \
326 } \
327 {
328 #define END_FORALL_COSETS \
329 } \
330 } \
331 Vector_Free(k); \
332 } while(0);
334 /* Compute the lattice points in the vertex cone at "values" with rays "rays".
335 * The lattice points are returned in "vertex".
336 *
337 * Rays has the generators as rows and so does W.
338 * We first compute { m-v, u_i^* } with m = k W, where k runs through
339 * the cosets.
340 * We compute
341 * [k 1] [ d1*W 0 ] [ U' 0 ] = [k 1] T2
342 * [ -v d1 ] [ 0 d2 ]
343 * where d1 and d2 are the denominators of v and U^{-1}=U'/d2.
344 * Then lambda = { k } (componentwise)
345 * We compute x - floor(x) = {x} = { a/b } as fdiv_r(a,b)/b
346 * For open rays/facets, we need values in (0,1] rather than [0,1),
347 * so we compute {{x}} = x - ceil(x-1) = a/b - ceil((a-b)/b)
348 * = (a - b cdiv_q(a-b,b) - b + b)/b
349 * = (cdiv_r(a,b)+b)/b
350 * Finally, we compute v + lambda * U
351 * The denominator of lambda can be d1*d2, that of lambda2 = lambda*U
352 * can be at most d1, since it is integer if v = 0.
353 * The denominator of v + lambda2 is 1.
354 *
355 * The _res variants of the input variables may have been multiplied with
356 * a (list of) nonorthogonal vector(s) and may therefore have fewer columns
357 * than their original counterparts.
358 */
362 {
368 }
373 /* Sanity check */
410 END_FORALL_COSETS
417 }
419 /* Returns the power of (t+1) in the term of a rational generating function,
420 * i.e., the scalar product of the actual lattice point and lambda.
421 * The lattice point is the unique lattice point in the fundamental parallelepiped
422 * of the unimodual cone i shifted to the parametric vertex W/lcm.
423 *
424 * The rows of W refer to the coordinates of the vertex
425 * The first nparam columns are the coefficients of the parameters
426 * and the final column is the constant term.
427 * lcm is the common denominator of all coefficients.
428 */
432 {
443 mat_ZZ vertex;
446 vec_ZZ num;
456 mat_ZZ RT;
462 Value tmp;
474 }
480 Value denom;
489 /* Sanity check */
518 }
519 END_FORALL_COSETS
528 }
536 }
542 {
547 }
549 }
552 {
561 /* temporarily ignore (common) denominator */
569 }
571 /* returns the unique lattice point in the fundamental parallelepiped
572 * of the unimodual cone C shifted to the parametric vertex V.
573 *
574 * The return values num and E_vertex are such that
575 * coordinate i of this lattice point is equal to
576 *
577 * num[i] + E_vertex[i]
578 */
581 {
585 /* It doesn't really make sense to call lattice_point when dim == 0,
586 * but apparently it happens from indicator_constructor in lexmin.
587 */
591 vec_ZZ vertex;
594 Value tmp;
606 evalue f;
613 options);
630 evalue cp;
637 }
640 }
641 }
651 }
655 /* fixed value */
663 }
664 }
665 }
669 {
682 mat_ZZ vertex;
694 }
696 /* Returns the power of (t+1) in the term of a rational generating function,
697 * i.e., the scalar product of the actual lattice point and lambda.
698 * The lattice point is the unique lattice point in the fundamental parallelepiped
699 * of the unimodual cone i shifted to the parametric vertex V.
700 *
701 * The result is returned in term.
702 */
706 {
709 mat_ZZ vertex;
720 }
724 }
726 vec_ZZ num;
740 }
741 }