/* * Copyright 2006-2007 Universiteit Leiden * Copyright 2008-2009 Katholieke Universiteit Leuven * Copyright 2010 INRIA Saclay * * Use of this software is governed by the MIT license * * Written by Sven Verdoolaege, Leiden Institute of Advanced Computer Science, * Universiteit Leiden, Niels Bohrweg 1, 2333 CA Leiden, The Netherlands * and K.U.Leuven, Departement Computerwetenschappen, Celestijnenlaan 200A, * B-3001 Leuven, Belgium * and INRIA Saclay - Ile-de-France, Parc Club Orsay Universite, * ZAC des vignes, 4 rue Jacques Monod, 91893 Orsay, France */ #include #include #include #include #include #include #include #include #include #include #include struct bernstein_data { enum isl_fold type; isl_qpolynomial *poly; int check_tight; isl_cell *cell; isl_qpolynomial_fold *fold; isl_qpolynomial_fold *fold_tight; isl_pw_qpolynomial_fold *pwf; isl_pw_qpolynomial_fold *pwf_tight; }; static int vertex_is_integral(__isl_keep isl_basic_set *vertex) { unsigned nvar; unsigned nparam; int i; nvar = isl_basic_set_dim(vertex, isl_dim_set); nparam = isl_basic_set_dim(vertex, isl_dim_param); for (i = 0; i < nvar; ++i) { int r = nvar - 1 - i; if (!isl_int_is_one(vertex->eq[r][1 + nparam + i]) && !isl_int_is_negone(vertex->eq[r][1 + nparam + i])) return 0; } return 1; } static __isl_give isl_qpolynomial *vertex_coordinate( __isl_keep isl_basic_set *vertex, int i, __isl_take isl_space *dim) { unsigned nvar; unsigned nparam; int r; isl_int denom; isl_qpolynomial *v; nvar = isl_basic_set_dim(vertex, isl_dim_set); nparam = isl_basic_set_dim(vertex, isl_dim_param); r = nvar - 1 - i; isl_int_init(denom); isl_int_set(denom, vertex->eq[r][1 + nparam + i]); isl_assert(vertex->ctx, !isl_int_is_zero(denom), goto error); if (isl_int_is_pos(denom)) isl_seq_neg(vertex->eq[r], vertex->eq[r], 1 + isl_basic_set_total_dim(vertex)); else isl_int_neg(denom, denom); v = isl_qpolynomial_from_affine(dim, vertex->eq[r], denom); isl_int_clear(denom); return v; error: isl_space_free(dim); isl_int_clear(denom); return NULL; } /* Check whether the bound associated to the selection "k" is tight, * which is the case if we select exactly one vertex and if that vertex * is integral for all values of the parameters. */ static int is_tight(int *k, int n, int d, isl_cell *cell) { int i; for (i = 0; i < n; ++i) { int v; if (k[i] != d) { if (k[i]) return 0; continue; } v = cell->ids[n - 1 - i]; return vertex_is_integral(cell->vertices->v[v].vertex); } return 0; } static void add_fold(__isl_take isl_qpolynomial *b, __isl_keep isl_set *dom, int *k, int n, int d, struct bernstein_data *data) { isl_qpolynomial_fold *fold; fold = isl_qpolynomial_fold_alloc(data->type, b); if (data->check_tight && is_tight(k, n, d, data->cell)) data->fold_tight = isl_qpolynomial_fold_fold_on_domain(dom, data->fold_tight, fold); else data->fold = isl_qpolynomial_fold_fold_on_domain(dom, data->fold, fold); } /* Extract the coefficients of the Bernstein base polynomials and store * them in data->fold and data->fold_tight. * * In particular, the coefficient of each monomial * of multi-degree (k[0], k[1], ..., k[n-1]) is divided by the corresponding * multinomial coefficient d!/k[0]! k[1]! ... k[n-1]! * * c[i] contains the coefficient of the selected powers of the first i+1 vars. * multinom[i] contains the partial multinomial coefficient. */ static void extract_coefficients(isl_qpolynomial *poly, __isl_keep isl_set *dom, struct bernstein_data *data) { int i; int d; int n; isl_ctx *ctx; isl_qpolynomial **c = NULL; int *k = NULL; int *left = NULL; isl_vec *multinom = NULL; if (!poly) return; ctx = isl_qpolynomial_get_ctx(poly); n = isl_qpolynomial_dim(poly, isl_dim_in); d = isl_qpolynomial_degree(poly); isl_assert(ctx, n >= 2, return); c = isl_calloc_array(ctx, isl_qpolynomial *, n); k = isl_alloc_array(ctx, int, n); left = isl_alloc_array(ctx, int, n); multinom = isl_vec_alloc(ctx, n); if (!c || !k || !left || !multinom) goto error; isl_int_set_si(multinom->el[0], 1); for (k[0] = d; k[0] >= 0; --k[0]) { int i = 1; isl_qpolynomial_free(c[0]); c[0] = isl_qpolynomial_coeff(poly, isl_dim_in, n - 1, k[0]); left[0] = d - k[0]; k[1] = -1; isl_int_set(multinom->el[1], multinom->el[0]); while (i > 0) { if (i == n - 1) { int j; isl_space *dim; isl_qpolynomial *b; isl_qpolynomial *f; for (j = 2; j <= left[i - 1]; ++j) isl_int_divexact_ui(multinom->el[i], multinom->el[i], j); b = isl_qpolynomial_coeff(c[i - 1], isl_dim_in, n - 1 - i, left[i - 1]); b = isl_qpolynomial_project_domain_on_params(b); dim = isl_qpolynomial_get_domain_space(b); f = isl_qpolynomial_rat_cst_on_domain(dim, ctx->one, multinom->el[i]); b = isl_qpolynomial_mul(b, f); k[n - 1] = left[n - 2]; add_fold(b, dom, k, n, d, data); --i; continue; } if (k[i] >= left[i - 1]) { --i; continue; } ++k[i]; if (k[i]) isl_int_divexact_ui(multinom->el[i], multinom->el[i], k[i]); isl_qpolynomial_free(c[i]); c[i] = isl_qpolynomial_coeff(c[i - 1], isl_dim_in, n - 1 - i, k[i]); left[i] = left[i - 1] - k[i]; k[i + 1] = -1; isl_int_set(multinom->el[i + 1], multinom->el[i]); ++i; } isl_int_mul_ui(multinom->el[0], multinom->el[0], k[0]); } for (i = 0; i < n; ++i) isl_qpolynomial_free(c[i]); isl_vec_free(multinom); free(left); free(k); free(c); return; error: isl_vec_free(multinom); free(left); free(k); if (c) for (i = 0; i < n; ++i) isl_qpolynomial_free(c[i]); free(c); return; } /* Perform bernstein expansion on the parametric vertices that are active * on "cell". * * data->poly has been homogenized in the calling function. * * We plug in the barycentric coordinates for the set variables * * \vec x = \sum_i \alpha_i v_i(\vec p) * * and the constant "1 = \sum_i \alpha_i" for the homogeneous dimension. * Next, we extract the coefficients of the Bernstein base polynomials. */ static int bernstein_coefficients_cell(__isl_take isl_cell *cell, void *user) { int i, j; struct bernstein_data *data = (struct bernstein_data *)user; isl_space *dim_param; isl_space *dim_dst; isl_qpolynomial *poly = data->poly; unsigned nvar; int n_vertices; isl_qpolynomial **subs; isl_pw_qpolynomial_fold *pwf; isl_set *dom; isl_ctx *ctx; if (!poly) goto error; nvar = isl_qpolynomial_dim(poly, isl_dim_in) - 1; n_vertices = cell->n_vertices; ctx = isl_qpolynomial_get_ctx(poly); if (n_vertices > nvar + 1 && ctx->opt->bernstein_triangulate) return isl_cell_foreach_simplex(cell, &bernstein_coefficients_cell, user); subs = isl_alloc_array(ctx, isl_qpolynomial *, 1 + nvar); if (!subs) goto error; dim_param = isl_basic_set_get_space(cell->dom); dim_dst = isl_qpolynomial_get_domain_space(poly); dim_dst = isl_space_add_dims(dim_dst, isl_dim_set, n_vertices); for (i = 0; i < 1 + nvar; ++i) subs[i] = isl_qpolynomial_zero_on_domain(isl_space_copy(dim_dst)); for (i = 0; i < n_vertices; ++i) { isl_qpolynomial *c; c = isl_qpolynomial_var_on_domain(isl_space_copy(dim_dst), isl_dim_set, 1 + nvar + i); for (j = 0; j < nvar; ++j) { int k = cell->ids[i]; isl_qpolynomial *v; v = vertex_coordinate(cell->vertices->v[k].vertex, j, isl_space_copy(dim_param)); v = isl_qpolynomial_add_dims(v, isl_dim_in, 1 + nvar + n_vertices); v = isl_qpolynomial_mul(v, isl_qpolynomial_copy(c)); subs[1 + j] = isl_qpolynomial_add(subs[1 + j], v); } subs[0] = isl_qpolynomial_add(subs[0], c); } isl_space_free(dim_dst); poly = isl_qpolynomial_copy(poly); poly = isl_qpolynomial_add_dims(poly, isl_dim_in, n_vertices); poly = isl_qpolynomial_substitute(poly, isl_dim_in, 0, 1 + nvar, subs); poly = isl_qpolynomial_drop_dims(poly, isl_dim_in, 0, 1 + nvar); data->cell = cell; dom = isl_set_from_basic_set(isl_basic_set_copy(cell->dom)); data->fold = isl_qpolynomial_fold_empty(data->type, isl_space_copy(dim_param)); data->fold_tight = isl_qpolynomial_fold_empty(data->type, dim_param); extract_coefficients(poly, dom, data); pwf = isl_pw_qpolynomial_fold_alloc(data->type, isl_set_copy(dom), data->fold); data->pwf = isl_pw_qpolynomial_fold_fold(data->pwf, pwf); pwf = isl_pw_qpolynomial_fold_alloc(data->type, dom, data->fold_tight); data->pwf_tight = isl_pw_qpolynomial_fold_fold(data->pwf_tight, pwf); isl_qpolynomial_free(poly); isl_cell_free(cell); for (i = 0; i < 1 + nvar; ++i) isl_qpolynomial_free(subs[i]); free(subs); return 0; error: isl_cell_free(cell); return -1; } /* Base case of applying bernstein expansion. * * We compute the chamber decomposition of the parametric polytope "bset" * and then perform bernstein expansion on the parametric vertices * that are active on each chamber. */ static __isl_give isl_pw_qpolynomial_fold *bernstein_coefficients_base( __isl_take isl_basic_set *bset, __isl_take isl_qpolynomial *poly, struct bernstein_data *data, int *tight) { unsigned nvar; isl_space *dim; isl_pw_qpolynomial_fold *pwf; isl_vertices *vertices; int covers; nvar = isl_basic_set_dim(bset, isl_dim_set); if (nvar == 0) { isl_set *dom; isl_qpolynomial_fold *fold; fold = isl_qpolynomial_fold_alloc(data->type, poly); dom = isl_set_from_basic_set(bset); if (tight) *tight = 1; pwf = isl_pw_qpolynomial_fold_alloc(data->type, dom, fold); return isl_pw_qpolynomial_fold_project_domain_on_params(pwf); } if (isl_qpolynomial_is_zero(poly)) { isl_set *dom; isl_qpolynomial_fold *fold; fold = isl_qpolynomial_fold_alloc(data->type, poly); dom = isl_set_from_basic_set(bset); pwf = isl_pw_qpolynomial_fold_alloc(data->type, dom, fold); if (tight) *tight = 1; return isl_pw_qpolynomial_fold_project_domain_on_params(pwf); } dim = isl_basic_set_get_space(bset); dim = isl_space_params(dim); dim = isl_space_from_domain(dim); dim = isl_space_add_dims(dim, isl_dim_set, 1); data->pwf = isl_pw_qpolynomial_fold_zero(isl_space_copy(dim), data->type); data->pwf_tight = isl_pw_qpolynomial_fold_zero(dim, data->type); data->poly = isl_qpolynomial_homogenize(isl_qpolynomial_copy(poly)); vertices = isl_basic_set_compute_vertices(bset); isl_vertices_foreach_disjoint_cell(vertices, &bernstein_coefficients_cell, data); isl_vertices_free(vertices); isl_qpolynomial_free(data->poly); isl_basic_set_free(bset); isl_qpolynomial_free(poly); covers = isl_pw_qpolynomial_fold_covers(data->pwf_tight, data->pwf); if (covers < 0) goto error; if (tight) *tight = covers; if (covers) { isl_pw_qpolynomial_fold_free(data->pwf); return data->pwf_tight; } data->pwf = isl_pw_qpolynomial_fold_fold(data->pwf, data->pwf_tight); return data->pwf; error: isl_pw_qpolynomial_fold_free(data->pwf_tight); isl_pw_qpolynomial_fold_free(data->pwf); return NULL; } /* Apply bernstein expansion recursively by working in on len[i] * set variables at a time, with i ranging from n_group - 1 to 0. */ static __isl_give isl_pw_qpolynomial_fold *bernstein_coefficients_recursive( __isl_take isl_pw_qpolynomial *pwqp, int n_group, int *len, struct bernstein_data *data, int *tight) { int i; unsigned nparam; unsigned nvar; isl_pw_qpolynomial_fold *pwf; if (!pwqp) return NULL; nparam = isl_pw_qpolynomial_dim(pwqp, isl_dim_param); nvar = isl_pw_qpolynomial_dim(pwqp, isl_dim_in); pwqp = isl_pw_qpolynomial_move_dims(pwqp, isl_dim_param, nparam, isl_dim_in, 0, nvar - len[n_group - 1]); pwf = isl_pw_qpolynomial_bound(pwqp, data->type, tight); for (i = n_group - 2; i >= 0; --i) { nparam = isl_pw_qpolynomial_fold_dim(pwf, isl_dim_param); pwf = isl_pw_qpolynomial_fold_move_dims(pwf, isl_dim_in, 0, isl_dim_param, nparam - len[i], len[i]); if (tight && !*tight) tight = NULL; pwf = isl_pw_qpolynomial_fold_bound(pwf, tight); } return pwf; } static __isl_give isl_pw_qpolynomial_fold *bernstein_coefficients_factors( __isl_take isl_basic_set *bset, __isl_take isl_qpolynomial *poly, struct bernstein_data *data, int *tight) { isl_factorizer *f; isl_set *set; isl_pw_qpolynomial *pwqp; isl_pw_qpolynomial_fold *pwf; f = isl_basic_set_factorizer(bset); if (!f) goto error; if (f->n_group == 0) { isl_factorizer_free(f); return bernstein_coefficients_base(bset, poly, data, tight); } set = isl_set_from_basic_set(bset); pwqp = isl_pw_qpolynomial_alloc(set, poly); pwqp = isl_pw_qpolynomial_morph_domain(pwqp, isl_morph_copy(f->morph)); pwf = bernstein_coefficients_recursive(pwqp, f->n_group, f->len, data, tight); isl_factorizer_free(f); return pwf; error: isl_basic_set_free(bset); isl_qpolynomial_free(poly); return NULL; } static __isl_give isl_pw_qpolynomial_fold *bernstein_coefficients_full_recursive( __isl_take isl_basic_set *bset, __isl_take isl_qpolynomial *poly, struct bernstein_data *data, int *tight) { int i; int *len; unsigned nvar; isl_pw_qpolynomial_fold *pwf; isl_set *set; isl_pw_qpolynomial *pwqp; if (!bset || !poly) goto error; nvar = isl_basic_set_dim(bset, isl_dim_set); len = isl_alloc_array(bset->ctx, int, nvar); if (nvar && !len) goto error; for (i = 0; i < nvar; ++i) len[i] = 1; set = isl_set_from_basic_set(bset); pwqp = isl_pw_qpolynomial_alloc(set, poly); pwf = bernstein_coefficients_recursive(pwqp, nvar, len, data, tight); free(len); return pwf; error: isl_basic_set_free(bset); isl_qpolynomial_free(poly); return NULL; } /* Compute a bound on the polynomial defined over the parametric polytope * using bernstein expansion and store the result * in bound->pwf and bound->pwf_tight. * * If bernstein_recurse is set to ISL_BERNSTEIN_FACTORS, we check if * the polytope can be factorized and apply bernstein expansion recursively * on the factors. * If bernstein_recurse is set to ISL_BERNSTEIN_INTERVALS, we apply * bernstein expansion recursively on each dimension. * Otherwise, we apply bernstein expansion on the entire polytope. */ int isl_qpolynomial_bound_on_domain_bernstein(__isl_take isl_basic_set *bset, __isl_take isl_qpolynomial *poly, struct isl_bound *bound) { struct bernstein_data data; isl_pw_qpolynomial_fold *pwf; unsigned nvar; int tight = 0; int *tp = bound->check_tight ? &tight : NULL; if (!bset || !poly) goto error; data.type = bound->type; data.check_tight = bound->check_tight; nvar = isl_basic_set_dim(bset, isl_dim_set); if (bset->ctx->opt->bernstein_recurse & ISL_BERNSTEIN_FACTORS) pwf = bernstein_coefficients_factors(bset, poly, &data, tp); else if (nvar > 1 && (bset->ctx->opt->bernstein_recurse & ISL_BERNSTEIN_INTERVALS)) pwf = bernstein_coefficients_full_recursive(bset, poly, &data, tp); else pwf = bernstein_coefficients_base(bset, poly, &data, tp); if (tight) bound->pwf_tight = isl_pw_qpolynomial_fold_fold(bound->pwf_tight, pwf); else bound->pwf = isl_pw_qpolynomial_fold_fold(bound->pwf, pwf); return 0; error: isl_basic_set_free(bset); isl_qpolynomial_free(poly); return -1; }