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iscc: support addition on a pair of a fold and a quasipolynomial.
[barvinok.git] / barvinok_enumerate.cc
blob53cf811aaa437bfb3c443cdc8ea5830593cfa246
1 #include <assert.h>
2 #include <unistd.h>
3 #include <stdlib.h>
4 #include <isl_set_polylib.h>
5 #include <barvinok/evalue.h>
6 #include <barvinok/util.h>
7 #include <barvinok/barvinok.h>
8 #include "barvinok_enumerate_options.h"
9 #include "verify.h"
10 #include "verif_ehrhart.h"
11 #include "verify_series.h"
12 #include "remove_equalities.h"
13 #include "evalue_convert.h"
14 #include "conversion.h"
15 #include "skewed_genfun.h"
16
17 #undef CS /* for Solaris 10 */
18
19 using std::cout;
20 using std::endl;
21
22 /* The input of this example program is the same as that of testehrhart
23 * in the PolyLib distribution, i.e., a polytope in combined
24 * data and parameter space, a context polytope in parameter space
25 * and (optionally) the names of the parameters.
26 * Both polytopes are in PolyLib notation.
27 */
28
29 struct verify_point_enum {
30 struct verify_point_data vpd;
31 isl_set *set;
32 isl_pw_qpolynomial *pwqp;
33 };
34
35 static int verify_point(__isl_take isl_point *pnt, void *user)
36 {
37 struct verify_point_enum *vpe = (struct verify_point_enum *) user;
38 isl_set *set;
39 int i;
40 unsigned nparam;
41 isl_int v, n, d;
42 isl_qpolynomial *cnt = NULL;
43 int pa = vpe->vpd.options->barvinok->approx->approximation;
44 int cst;
45 int ok;
46 FILE *out = vpe->vpd.options->print_all ? stdout : stderr;
47
48 vpe->vpd.n--;
49
50 isl_int_init(v);
51 isl_int_init(n);
52 isl_int_init(d);
53 set = isl_set_copy(vpe->set);
54 nparam = isl_set_dim(set, isl_dim_param);
55 for (i = 0; i < nparam; ++i) {
56 isl_point_get_coordinate(pnt, isl_dim_param, i, &v);
57 set = isl_set_fix(set, isl_dim_param, i, v);
58 }
59
60 if (isl_set_count(set, &v) < 0)
61 goto error;
62
63 cnt = isl_pw_qpolynomial_eval(isl_pw_qpolynomial_copy(vpe->pwqp),
64 isl_point_copy(pnt));
65
66 cst = isl_qpolynomial_is_cst(cnt, &n, &d);
67 if (cst != 1)
68 goto error;
69
70 if (pa == BV_APPROX_SIGN_LOWER)
71 isl_int_cdiv_q(n, n, d);
72 else if (pa == BV_APPROX_SIGN_UPPER)
73 isl_int_fdiv_q(n, n, d);
74 else
75 isl_int_tdiv_q(n, n, d);
76
77 if (pa == BV_APPROX_SIGN_APPROX)
78 /* just accept everything */
79 ok = 1;
80 else if (pa == BV_APPROX_SIGN_LOWER)
81 ok = isl_int_le(n, v);
82 else if (pa == BV_APPROX_SIGN_UPPER)
83 ok = isl_int_ge(n, v);
84 else
85 ok = isl_int_eq(n, v);
86
87 if (vpe->vpd.options->print_all || !ok) {
88 fprintf(out, "EP(");
89 for (i = 0; i < nparam; ++i) {
90 if (i)
91 fprintf(out, ", ");
92 isl_point_get_coordinate(pnt, isl_dim_param, i, &d);
93 isl_int_print(out, d, 0);
94 }
95 fprintf(out, ") = ");
96 isl_int_print(out, n, 0);
97 fprintf(out, ", count = ");
98 isl_int_print(out, v, 0);
99 if (ok)
100 fprintf(out, ". OK\n");
101 else
102 fprintf(out, ". NOT OK\n");
103 } else if ((vpe->vpd.n % vpe->vpd.s) == 0) {
104 printf("o");
105 fflush(stdout);
106 }
107
108 if (0) {
109 error:
110 ok = 0;
111 }
112 isl_set_free(set);
113 isl_qpolynomial_free(cnt);
114 isl_int_clear(v);
115 isl_int_clear(n);
116 isl_int_clear(d);
117 isl_point_free(pnt);
118
119 if (!ok)
120 vpe->vpd.error = 1;
121
122 if (vpe->vpd.options->continue_on_error)
123 ok = 1;
124
125 return (vpe->vpd.n >= 1 && ok) ? 0 : -1;
126 }
127
128 static int verify_isl(Polyhedron *P, Polyhedron *C,
129 evalue *EP, const struct verify_options *options)
130 {
131 struct verify_point_enum vpe = { { options } };
132 int i;
133 isl_ctx *ctx = isl_ctx_alloc();
134 isl_dim *dim;
135 isl_set *set;
136 isl_set *set_C;
137 int r;
138
139 dim = isl_dim_set_alloc(ctx, C->Dimension, P->Dimension - C->Dimension);
140 for (i = 0; i < C->Dimension; ++i)
141 dim = isl_dim_set_name(dim, isl_dim_param, i, options->params[i]);
142 set = isl_set_new_from_polylib(P, isl_dim_copy(dim));
143 dim = isl_dim_drop(dim, isl_dim_set, 0, P->Dimension - C->Dimension);
144 set_C = isl_set_new_from_polylib(C, dim);
145 set_C = isl_set_intersect(isl_set_copy(set), set_C);
146 set_C = isl_set_remove(set_C, isl_dim_set, 0, P->Dimension - C->Dimension);
147
148 set_C = verify_context_set_bounds(set_C, options);
149
150 r = verify_point_data_init(&vpe.vpd, set_C);
151
152 vpe.set = set;
153 vpe.pwqp = isl_pw_qpolynomial_from_evalue(isl_set_get_dim(set_C), EP);
154 if (r == 0)
155 isl_set_foreach_point(set_C, verify_point, &vpe);
156 if (vpe.vpd.error)
157 r = -1;
158
159 isl_pw_qpolynomial_free(vpe.pwqp);
160 isl_set_free(set);
161 isl_set_free(set_C);
162
163 isl_ctx_free(ctx);
164
165 verify_point_data_fini(&vpe.vpd);
166
167 return r;
168 }
169
170 static int verify(Polyhedron *P, Polyhedron *C, evalue *EP, skewed_gen_fun *gf,
171 struct enumerate_options *options)
172 {
173 Polyhedron *CS, *S;
174 Vector *p;
175 int result = 0;
176
177 if (!options->series || options->function)
178 return verify_isl(P, C, EP, options->verify);
179
180 CS = check_poly_context_scan(P, &C, C->Dimension, options->verify);
181
182 p = Vector_Alloc(P->Dimension+2);
183 value_set_si(p->p[P->Dimension+1], 1);
184
185 /* S = scanning list of polyhedra */
186 S = Polyhedron_Scan(P, C, options->verify->barvinok->MaxRays);
187
188 check_poly_init(C, options->verify);
189
190 /******* CHECK NOW *********/
191 if (S) {
192 if (!options->series || options->function) {
193 if (!check_poly_EP(S, CS, EP, 0, C->Dimension, 0, p->p,
194 options->verify))
195 result = -1;
196 } else {
197 if (!check_poly_gf(S, CS, gf, 0, C->Dimension, 0, p->p,
198 options->verify))
199 result = -1;
200 }
201 Domain_Free(S);
202 }
203
204 if (result == -1)
205 fprintf(stderr,"Check failed !\n");
206
207 if (!options->verify->print_all)
208 printf( "\n" );
209
210 Vector_Free(p);
211 if (CS) {
212 Domain_Free(CS);
213 Domain_Free(C);
214 }
215
216 return result;
217 }
218
219 /* frees M and Minv */
220 static void apply_transformation(Polyhedron **P, Polyhedron **C,
221 bool free_P, bool free_C,
222 Matrix *M, Matrix *Minv, Matrix **inv,
223 barvinok_options *options)
224 {
225 Polyhedron *T;
226 Matrix *M2;
227
228 M2 = align_matrix(M, (*P)->Dimension + 1);
229 T = *P;
230 *P = Polyhedron_Preimage(*P, M2, options->MaxRays);
231 if (free_P)
232 Polyhedron_Free(T);
233 Matrix_Free(M2);
234
235 T = *C;
236 *C = Polyhedron_Preimage(*C, M, options->MaxRays);
237 if (free_C)
238 Polyhedron_Free(T);
239
240 Matrix_Free(M);
241
242 if (*inv) {
243 Matrix *T = *inv;
244 *inv = Matrix_Alloc(Minv->NbRows, T->NbColumns);
245 Matrix_Product(Minv, T, *inv);
246 Matrix_Free(T);
247 Matrix_Free(Minv);
248 } else
249 *inv = Minv;
250 }
251
252 /* Since we have "compressed" the parameters (in case there were
253 * any equalities), the result is independent of the coordinates in the
254 * coordinate subspace spanned by the lines. We can therefore assume
255 * these coordinates are zero and compute the inverse image of the map
256 * from a lower dimensional space that adds zeros in the appropriate
257 * places.
258 */
259 static void remove_lines(Polyhedron *C, Matrix **M, Matrix **Minv)
260 {
261 Matrix *L = Matrix_Alloc(C->Dimension+1, C->Dimension+1);
262 for (int r = 0; r < C->NbBid; ++r)
263 Vector_Copy(C->Ray[r]+1, L->p[r], C->Dimension);
264 unimodular_complete(L, C->NbBid);
265 assert(value_one_p(L->p[C->Dimension][C->Dimension]));
266 assert(First_Non_Zero(L->p[C->Dimension], C->Dimension) == -1);
267 Matrix_Transposition(L);
268 assert(First_Non_Zero(L->p[C->Dimension], C->Dimension) == -1);
269
270 *M = Matrix_Alloc(C->Dimension+1, C->Dimension-C->NbBid+1);
271 for (int i = 0; i < C->Dimension+1; ++i)
272 Vector_Copy(L->p[i]+C->NbBid, (*M)->p[i], C->Dimension-C->NbBid+1);
273
274 Matrix *Linv = Matrix_Alloc(C->Dimension+1, C->Dimension+1);
275 int ok = Matrix_Inverse(L, Linv);
276 assert(ok);
277 Matrix_Free(L);
278
279 *Minv = Matrix_Alloc(C->Dimension-C->NbBid+1, C->Dimension+1);
280 for (int i = C->NbBid; i < C->Dimension+1; ++i)
281 Vector_AntiScale(Linv->p[i], (*Minv)->p[i-C->NbBid],
282 Linv->p[C->Dimension][C->Dimension], C->Dimension+1);
283 Matrix_Free(Linv);
284 }
285
286 static skewed_gen_fun *series(Polyhedron *P, Polyhedron* C,
287 barvinok_options *options)
288 {
289 Polyhedron *C1, *C2;
290 gen_fun *gf;
291 Matrix *inv = NULL;
292 Matrix *eq = NULL;
293 Matrix *div = NULL;
294 Polyhedron *PT = P;
295
296 /* Compute true context */
297 C1 = Polyhedron_Project(P, C->Dimension);
298 C2 = DomainIntersection(C, C1, options->MaxRays);
299 Polyhedron_Free(C1);
300
301 POL_ENSURE_VERTICES(C2);
302 if (C2->NbBid != 0) {
303 Polyhedron *T;
304 Matrix *M, *Minv, *M2;
305 Matrix *CP;
306 if (C2->NbEq || P->NbEq) {
307 /* We remove all equalities to be sure all lines are unit vectors */
308 Polyhedron *CT = C2;
309 remove_all_equalities(&PT, &CT, &CP, NULL, C2->Dimension,
310 options->MaxRays);
311 if (CT != C2) {
312 Polyhedron_Free(C2);
313 C2 = CT;
314 }
315 if (CP) {
316 inv = left_inverse(CP, &eq);
317 Matrix_Free(CP);
318
319 int d = 0;
320 Value tmp;
321 value_init(tmp);
322 div = Matrix_Alloc(inv->NbRows-1, inv->NbColumns+1);
323 for (int i = 0; i < inv->NbRows-1; ++i) {
324 Vector_Gcd(inv->p[i], inv->NbColumns, &tmp);
325 if (mpz_divisible_p(tmp,
326 inv->p[inv->NbRows-1][inv->NbColumns-1]))
327 continue;
328 Vector_Copy(inv->p[i], div->p[d], inv->NbColumns);
329 value_assign(div->p[d][inv->NbColumns],
330 inv->p[inv->NbRows-1][inv->NbColumns-1]);
331 ++d;
332 }
333 value_clear(tmp);
334
335 if (!d) {
336 Matrix_Free(div);
337 div = NULL;
338 } else
339 div->NbRows = d;
340 }
341 }
342 POL_ENSURE_VERTICES(C2);
343
344 if (C2->NbBid) {
345 Matrix *M, *Minv;
346 remove_lines(C2, &M, &Minv);
347 apply_transformation(&PT, &C2, PT != P, C2 != C, M, Minv, &inv,
348 options);
349 }
350 }
351 POL_ENSURE_VERTICES(C2);
352 if (!Polyhedron_has_revlex_positive_rays(C2, C2->Dimension)) {
353 Polyhedron *T;
354 Matrix *Constraints;
355 Matrix *H, *Q, *U;
356 Constraints = Matrix_Alloc(C2->NbConstraints, C2->Dimension+1);
357 for (int i = 0; i < C2->NbConstraints; ++i)
358 Vector_Copy(C2->Constraint[i]+1, Constraints->p[i], C2->Dimension);
359 left_hermite(Constraints, &H, &Q, &U);
360 Matrix_Free(Constraints);
361 /* flip rows of Q */
362 for (int i = 0; i < C2->Dimension/2; ++i)
363 Vector_Exchange(Q->p[i], Q->p[C2->Dimension-1-i], C2->Dimension);
364 Matrix_Free(H);
365 Matrix_Free(U);
366 Matrix *M = Matrix_Alloc(C2->Dimension+1, C2->Dimension+1);
367 U = Matrix_Copy(Q);
368 int ok = Matrix_Inverse(U, M);
369 assert(ok);
370 Matrix_Free(U);
371
372 apply_transformation(&PT, &C2, PT != P, C2 != C, M, Q, &inv, options);
373 }
374 gf = barvinok_series_with_options(PT, C2, options);
375 Polyhedron_Free(C2);
376 if (PT != P)
377 Polyhedron_Free(PT);
378 return new skewed_gen_fun(gf, inv, eq, div);
379 }
380
381 int main(int argc, char **argv)
382 {
383 Polyhedron *A, *C;
384 Matrix *M;
385 evalue *EP = NULL;
386 skewed_gen_fun *gf = NULL;
387 const char **param_name;
388 int print_solution = 1;
389 int result = 0;
390 struct enumerate_options *options = enumerate_options_new_with_defaults();
391
392 argc = enumerate_options_parse(options, argc, argv, ISL_ARG_ALL);
393
394 M = Matrix_Read();
395 assert(M);
396 A = Constraints2Polyhedron(M, options->verify->barvinok->MaxRays);
397 Matrix_Free(M);
398 M = Matrix_Read();
399 assert(M);
400 C = Constraints2Polyhedron(M, options->verify->barvinok->MaxRays);
401 Matrix_Free(M);
402 assert(A->Dimension >= C->Dimension);
403 param_name = Read_ParamNames(stdin, C->Dimension);
404
405 if (options->verify->verify) {
406 verify_options_set_range(options->verify, A->Dimension);
407 if (!options->verify->barvinok->verbose)
408 print_solution = 0;
409 }
410
411 if (print_solution && options->verify->barvinok->verbose) {
412 Polyhedron_Print(stdout, P_VALUE_FMT, A);
413 Polyhedron_Print(stdout, P_VALUE_FMT, C);
414 }
415
416 if (options->series) {
417 gf = series(A, C, options->verify->barvinok);
418 if (print_solution) {
419 gf->print(cout, C->Dimension, param_name);
420 puts("");
421 }
422 if (options->function) {
423 EP = *gf;
424 if (print_solution)
425 print_evalue(stdout, EP, param_name);
426 }
427 } else {
428 EP = barvinok_enumerate_with_options(A, C, options->verify->barvinok);
429 assert(EP);
430 if (evalue_convert(EP, options->convert, options->verify->barvinok->verbose,
431 C->Dimension, param_name))
432 print_solution = 0;
433 if (options->size)
434 printf("\nSize: %zd\n", evalue_size(EP));
435 if (print_solution)
436 print_evalue(stdout, EP, param_name);
437 }
438
439 if (options->verify->verify) {
440 options->verify->params = param_name;
441 result = verify(A, C, EP, gf, options);
442 }
443
444 if (gf)
445 delete gf;
446 if (EP)
447 evalue_free(EP);
448
449 if (options->verify->barvinok->print_stats)
450 barvinok_stats_print(options->verify->barvinok->stats, stdout);
451
452 Free_ParamNames(param_name, C->Dimension);
453 Polyhedron_Free(A);
454 Polyhedron_Free(C);
455 enumerate_options_free(options);
456 return result;
457 }
lattice point enumeration library