| /* |
| * Copyright 2010 INRIA Saclay |
| * |
| * Use of this software is governed by the GNU LGPLv2.1 license |
| * |
| * Written by Sven Verdoolaege, INRIA Saclay - Ile-de-France, |
| * Parc Club Orsay Universite, ZAC des vignes, 4 rue Jacques Monod, |
| * 91893 Orsay, France |
| */ |
| |
| #include <isl_ctx_private.h> |
| #include <isl_map_private.h> |
| #include <isl/map.h> |
| #include <isl/seq.h> |
| #include <isl_space_private.h> |
| #include <isl/lp.h> |
| #include <isl/union_map.h> |
| #include <isl_mat_private.h> |
| #include <isl_options_private.h> |
| |
| int isl_map_is_transitively_closed(__isl_keep isl_map *map) |
| { |
| isl_map *map2; |
| int closed; |
| |
| map2 = isl_map_apply_range(isl_map_copy(map), isl_map_copy(map)); |
| closed = isl_map_is_subset(map2, map); |
| isl_map_free(map2); |
| |
| return closed; |
| } |
| |
| int isl_union_map_is_transitively_closed(__isl_keep isl_union_map *umap) |
| { |
| isl_union_map *umap2; |
| int closed; |
| |
| umap2 = isl_union_map_apply_range(isl_union_map_copy(umap), |
| isl_union_map_copy(umap)); |
| closed = isl_union_map_is_subset(umap2, umap); |
| isl_union_map_free(umap2); |
| |
| return closed; |
| } |
| |
| /* Given a map that represents a path with the length of the path |
| * encoded as the difference between the last output coordindate |
| * and the last input coordinate, set this length to either |
| * exactly "length" (if "exactly" is set) or at least "length" |
| * (if "exactly" is not set). |
| */ |
| static __isl_give isl_map *set_path_length(__isl_take isl_map *map, |
| int exactly, int length) |
| { |
| isl_space *dim; |
| struct isl_basic_map *bmap; |
| unsigned d; |
| unsigned nparam; |
| int k; |
| isl_int *c; |
| |
| if (!map) |
| return NULL; |
| |
| dim = isl_map_get_space(map); |
| d = isl_space_dim(dim, isl_dim_in); |
| nparam = isl_space_dim(dim, isl_dim_param); |
| bmap = isl_basic_map_alloc_space(dim, 0, 1, 1); |
| if (exactly) { |
| k = isl_basic_map_alloc_equality(bmap); |
| c = bmap->eq[k]; |
| } else { |
| k = isl_basic_map_alloc_inequality(bmap); |
| c = bmap->ineq[k]; |
| } |
| if (k < 0) |
| goto error; |
| isl_seq_clr(c, 1 + isl_basic_map_total_dim(bmap)); |
| isl_int_set_si(c[0], -length); |
| isl_int_set_si(c[1 + nparam + d - 1], -1); |
| isl_int_set_si(c[1 + nparam + d + d - 1], 1); |
| |
| bmap = isl_basic_map_finalize(bmap); |
| map = isl_map_intersect(map, isl_map_from_basic_map(bmap)); |
| |
| return map; |
| error: |
| isl_basic_map_free(bmap); |
| isl_map_free(map); |
| return NULL; |
| } |
| |
| /* Check whether the overapproximation of the power of "map" is exactly |
| * the power of "map". Let R be "map" and A_k the overapproximation. |
| * The approximation is exact if |
| * |
| * A_1 = R |
| * A_k = A_{k-1} \circ R k >= 2 |
| * |
| * Since A_k is known to be an overapproximation, we only need to check |
| * |
| * A_1 \subset R |
| * A_k \subset A_{k-1} \circ R k >= 2 |
| * |
| * In practice, "app" has an extra input and output coordinate |
| * to encode the length of the path. So, we first need to add |
| * this coordinate to "map" and set the length of the path to |
| * one. |
| */ |
| static int check_power_exactness(__isl_take isl_map *map, |
| __isl_take isl_map *app) |
| { |
| int exact; |
| isl_map *app_1; |
| isl_map *app_2; |
| |
| map = isl_map_add_dims(map, isl_dim_in, 1); |
| map = isl_map_add_dims(map, isl_dim_out, 1); |
| map = set_path_length(map, 1, 1); |
| |
| app_1 = set_path_length(isl_map_copy(app), 1, 1); |
| |
| exact = isl_map_is_subset(app_1, map); |
| isl_map_free(app_1); |
| |
| if (!exact || exact < 0) { |
| isl_map_free(app); |
| isl_map_free(map); |
| return exact; |
| } |
| |
| app_1 = set_path_length(isl_map_copy(app), 0, 1); |
| app_2 = set_path_length(app, 0, 2); |
| app_1 = isl_map_apply_range(map, app_1); |
| |
| exact = isl_map_is_subset(app_2, app_1); |
| |
| isl_map_free(app_1); |
| isl_map_free(app_2); |
| |
| return exact; |
| } |
| |
| /* Check whether the overapproximation of the power of "map" is exactly |
| * the power of "map", possibly after projecting out the power (if "project" |
| * is set). |
| * |
| * If "project" is set and if "steps" can only result in acyclic paths, |
| * then we check |
| * |
| * A = R \cup (A \circ R) |
| * |
| * where A is the overapproximation with the power projected out, i.e., |
| * an overapproximation of the transitive closure. |
| * More specifically, since A is known to be an overapproximation, we check |
| * |
| * A \subset R \cup (A \circ R) |
| * |
| * Otherwise, we check if the power is exact. |
| * |
| * Note that "app" has an extra input and output coordinate to encode |
| * the length of the part. If we are only interested in the transitive |
| * closure, then we can simply project out these coordinates first. |
| */ |
| static int check_exactness(__isl_take isl_map *map, __isl_take isl_map *app, |
| int project) |
| { |
| isl_map *test; |
| int exact; |
| unsigned d; |
| |
| if (!project) |
| return check_power_exactness(map, app); |
| |
| d = isl_map_dim(map, isl_dim_in); |
| app = set_path_length(app, 0, 1); |
| app = isl_map_project_out(app, isl_dim_in, d, 1); |
| app = isl_map_project_out(app, isl_dim_out, d, 1); |
| |
| app = isl_map_reset_space(app, isl_map_get_space(map)); |
| |
| test = isl_map_apply_range(isl_map_copy(map), isl_map_copy(app)); |
| test = isl_map_union(test, isl_map_copy(map)); |
| |
| exact = isl_map_is_subset(app, test); |
| |
| isl_map_free(app); |
| isl_map_free(test); |
| |
| isl_map_free(map); |
| |
| return exact; |
| } |
| |
| /* |
| * The transitive closure implementation is based on the paper |
| * "Computing the Transitive Closure of a Union of Affine Integer |
| * Tuple Relations" by Anna Beletska, Denis Barthou, Wlodzimierz Bielecki and |
| * Albert Cohen. |
| */ |
| |
| /* Given a set of n offsets v_i (the rows of "steps"), construct a relation |
| * of the given dimension specification (Z^{n+1} -> Z^{n+1}) |
| * that maps an element x to any element that can be reached |
| * by taking a non-negative number of steps along any of |
| * the extended offsets v'_i = [v_i 1]. |
| * That is, construct |
| * |
| * { [x] -> [y] : exists k_i >= 0, y = x + \sum_i k_i v'_i } |
| * |
| * For any element in this relation, the number of steps taken |
| * is equal to the difference in the final coordinates. |
| */ |
| static __isl_give isl_map *path_along_steps(__isl_take isl_space *dim, |
| __isl_keep isl_mat *steps) |
| { |
| int i, j, k; |
| struct isl_basic_map *path = NULL; |
| unsigned d; |
| unsigned n; |
| unsigned nparam; |
| |
| if (!dim || !steps) |
| goto error; |
| |
| d = isl_space_dim(dim, isl_dim_in); |
| n = steps->n_row; |
| nparam = isl_space_dim(dim, isl_dim_param); |
| |
| path = isl_basic_map_alloc_space(isl_space_copy(dim), n, d, n); |
| |
| for (i = 0; i < n; ++i) { |
| k = isl_basic_map_alloc_div(path); |
| if (k < 0) |
| goto error; |
| isl_assert(steps->ctx, i == k, goto error); |
| isl_int_set_si(path->div[k][0], 0); |
| } |
| |
| for (i = 0; i < d; ++i) { |
| k = isl_basic_map_alloc_equality(path); |
| if (k < 0) |
| goto error; |
| isl_seq_clr(path->eq[k], 1 + isl_basic_map_total_dim(path)); |
| isl_int_set_si(path->eq[k][1 + nparam + i], 1); |
| isl_int_set_si(path->eq[k][1 + nparam + d + i], -1); |
| if (i == d - 1) |
| for (j = 0; j < n; ++j) |
| isl_int_set_si(path->eq[k][1 + nparam + 2 * d + j], 1); |
| else |
| for (j = 0; j < n; ++j) |
| isl_int_set(path->eq[k][1 + nparam + 2 * d + j], |
| steps->row[j][i]); |
| } |
| |
| for (i = 0; i < n; ++i) { |
| k = isl_basic_map_alloc_inequality(path); |
| if (k < 0) |
| goto error; |
| isl_seq_clr(path->ineq[k], 1 + isl_basic_map_total_dim(path)); |
| isl_int_set_si(path->ineq[k][1 + nparam + 2 * d + i], 1); |
| } |
| |
| isl_space_free(dim); |
| |
| path = isl_basic_map_simplify(path); |
| path = isl_basic_map_finalize(path); |
| return isl_map_from_basic_map(path); |
| error: |
| isl_space_free(dim); |
| isl_basic_map_free(path); |
| return NULL; |
| } |
| |
| #define IMPURE 0 |
| #define PURE_PARAM 1 |
| #define PURE_VAR 2 |
| #define MIXED 3 |
| |
| /* Check whether the parametric constant term of constraint c is never |
| * positive in "bset". |
| */ |
| static int parametric_constant_never_positive(__isl_keep isl_basic_set *bset, |
| isl_int *c, int *div_purity) |
| { |
| unsigned d; |
| unsigned n_div; |
| unsigned nparam; |
| int i; |
| int k; |
| int empty; |
| |
| n_div = isl_basic_set_dim(bset, isl_dim_div); |
| d = isl_basic_set_dim(bset, isl_dim_set); |
| nparam = isl_basic_set_dim(bset, isl_dim_param); |
| |
| bset = isl_basic_set_copy(bset); |
| bset = isl_basic_set_cow(bset); |
| bset = isl_basic_set_extend_constraints(bset, 0, 1); |
| k = isl_basic_set_alloc_inequality(bset); |
| if (k < 0) |
| goto error; |
| isl_seq_clr(bset->ineq[k], 1 + isl_basic_set_total_dim(bset)); |
| isl_seq_cpy(bset->ineq[k], c, 1 + nparam); |
| for (i = 0; i < n_div; ++i) { |
| if (div_purity[i] != PURE_PARAM) |
| continue; |
| isl_int_set(bset->ineq[k][1 + nparam + d + i], |
| c[1 + nparam + d + i]); |
| } |
| isl_int_sub_ui(bset->ineq[k][0], bset->ineq[k][0], 1); |
| empty = isl_basic_set_is_empty(bset); |
| isl_basic_set_free(bset); |
| |
| return empty; |
| error: |
| isl_basic_set_free(bset); |
| return -1; |
| } |
| |
| /* Return PURE_PARAM if only the coefficients of the parameters are non-zero. |
| * Return PURE_VAR if only the coefficients of the set variables are non-zero. |
| * Return MIXED if only the coefficients of the parameters and the set |
| * variables are non-zero and if moreover the parametric constant |
| * can never attain positive values. |
| * Return IMPURE otherwise. |
| * |
| * If div_purity is NULL then we are dealing with a non-parametric set |
| * and so the constraint is obviously PURE_VAR. |
| */ |
| static int purity(__isl_keep isl_basic_set *bset, isl_int *c, int *div_purity, |
| int eq) |
| { |
| unsigned d; |
| unsigned n_div; |
| unsigned nparam; |
| int empty; |
| int i; |
| int p = 0, v = 0; |
| |
| if (!div_purity) |
| return PURE_VAR; |
| |
| n_div = isl_basic_set_dim(bset, isl_dim_div); |
| d = isl_basic_set_dim(bset, isl_dim_set); |
| nparam = isl_basic_set_dim(bset, isl_dim_param); |
| |
| for (i = 0; i < n_div; ++i) { |
| if (isl_int_is_zero(c[1 + nparam + d + i])) |
| continue; |
| switch (div_purity[i]) { |
| case PURE_PARAM: p = 1; break; |
| case PURE_VAR: v = 1; break; |
| default: return IMPURE; |
| } |
| } |
| if (!p && isl_seq_first_non_zero(c + 1, nparam) == -1) |
| return PURE_VAR; |
| if (!v && isl_seq_first_non_zero(c + 1 + nparam, d) == -1) |
| return PURE_PARAM; |
| |
| empty = parametric_constant_never_positive(bset, c, div_purity); |
| if (eq && empty >= 0 && !empty) { |
| isl_seq_neg(c, c, 1 + nparam + d + n_div); |
| empty = parametric_constant_never_positive(bset, c, div_purity); |
| } |
| |
| return empty < 0 ? -1 : empty ? MIXED : IMPURE; |
| } |
| |
| /* Return an array of integers indicating the type of each div in bset. |
| * If the div is (recursively) defined in terms of only the parameters, |
| * then the type is PURE_PARAM. |
| * If the div is (recursively) defined in terms of only the set variables, |
| * then the type is PURE_VAR. |
| * Otherwise, the type is IMPURE. |
| */ |
| static __isl_give int *get_div_purity(__isl_keep isl_basic_set *bset) |
| { |
| int i, j; |
| int *div_purity; |
| unsigned d; |
| unsigned n_div; |
| unsigned nparam; |
| |
| if (!bset) |
| return NULL; |
| |
| n_div = isl_basic_set_dim(bset, isl_dim_div); |
| d = isl_basic_set_dim(bset, isl_dim_set); |
| nparam = isl_basic_set_dim(bset, isl_dim_param); |
| |
| div_purity = isl_alloc_array(bset->ctx, int, n_div); |
| if (!div_purity) |
| return NULL; |
| |
| for (i = 0; i < bset->n_div; ++i) { |
| int p = 0, v = 0; |
| if (isl_int_is_zero(bset->div[i][0])) { |
| div_purity[i] = IMPURE; |
| continue; |
| } |
| if (isl_seq_first_non_zero(bset->div[i] + 2, nparam) != -1) |
| p = 1; |
| if (isl_seq_first_non_zero(bset->div[i] + 2 + nparam, d) != -1) |
| v = 1; |
| for (j = 0; j < i; ++j) { |
| if (isl_int_is_zero(bset->div[i][2 + nparam + d + j])) |
| continue; |
| switch (div_purity[j]) { |
| case PURE_PARAM: p = 1; break; |
| case PURE_VAR: v = 1; break; |
| default: p = v = 1; break; |
| } |
| } |
| div_purity[i] = v ? p ? IMPURE : PURE_VAR : PURE_PARAM; |
| } |
| |
| return div_purity; |
| } |
| |
| /* Given a path with the as yet unconstrained length at position "pos", |
| * check if setting the length to zero results in only the identity |
| * mapping. |
| */ |
| static int empty_path_is_identity(__isl_keep isl_basic_map *path, unsigned pos) |
| { |
| isl_basic_map *test = NULL; |
| isl_basic_map *id = NULL; |
| int k; |
| int is_id; |
| |
| test = isl_basic_map_copy(path); |
| test = isl_basic_map_extend_constraints(test, 1, 0); |
| k = isl_basic_map_alloc_equality(test); |
| if (k < 0) |
| goto error; |
| isl_seq_clr(test->eq[k], 1 + isl_basic_map_total_dim(test)); |
| isl_int_set_si(test->eq[k][pos], 1); |
| id = isl_basic_map_identity(isl_basic_map_get_space(path)); |
| is_id = isl_basic_map_is_equal(test, id); |
| isl_basic_map_free(test); |
| isl_basic_map_free(id); |
| return is_id; |
| error: |
| isl_basic_map_free(test); |
| return -1; |
| } |
| |
| /* If any of the constraints is found to be impure then this function |
| * sets *impurity to 1. |
| */ |
| static __isl_give isl_basic_map *add_delta_constraints( |
| __isl_take isl_basic_map *path, |
| __isl_keep isl_basic_set *delta, unsigned off, unsigned nparam, |
| unsigned d, int *div_purity, int eq, int *impurity) |
| { |
| int i, k; |
| int n = eq ? delta->n_eq : delta->n_ineq; |
| isl_int **delta_c = eq ? delta->eq : delta->ineq; |
| unsigned n_div; |
| |
| n_div = isl_basic_set_dim(delta, isl_dim_div); |
| |
| for (i = 0; i < n; ++i) { |
| isl_int *path_c; |
| int p = purity(delta, delta_c[i], div_purity, eq); |
| if (p < 0) |
| goto error; |
| if (p != PURE_VAR && p != PURE_PARAM && !*impurity) |
| *impurity = 1; |
| if (p == IMPURE) |
| continue; |
| if (eq && p != MIXED) { |
| k = isl_basic_map_alloc_equality(path); |
| path_c = path->eq[k]; |
| } else { |
| k = isl_basic_map_alloc_inequality(path); |
| path_c = path->ineq[k]; |
| } |
| if (k < 0) |
| goto error; |
| isl_seq_clr(path_c, 1 + isl_basic_map_total_dim(path)); |
| if (p == PURE_VAR) { |
| isl_seq_cpy(path_c + off, |
| delta_c[i] + 1 + nparam, d); |
| isl_int_set(path_c[off + d], delta_c[i][0]); |
| } else if (p == PURE_PARAM) { |
| isl_seq_cpy(path_c, delta_c[i], 1 + nparam); |
| } else { |
| isl_seq_cpy(path_c + off, |
| delta_c[i] + 1 + nparam, d); |
| isl_seq_cpy(path_c, delta_c[i], 1 + nparam); |
| } |
| isl_seq_cpy(path_c + off - n_div, |
| delta_c[i] + 1 + nparam + d, n_div); |
| } |
| |
| return path; |
| error: |
| isl_basic_map_free(path); |
| return NULL; |
| } |
| |
| /* Given a set of offsets "delta", construct a relation of the |
| * given dimension specification (Z^{n+1} -> Z^{n+1}) that |
| * is an overapproximation of the relations that |
| * maps an element x to any element that can be reached |
| * by taking a non-negative number of steps along any of |
| * the elements in "delta". |
| * That is, construct an approximation of |
| * |
| * { [x] -> [y] : exists f \in \delta, k \in Z : |
| * y = x + k [f, 1] and k >= 0 } |
| * |
| * For any element in this relation, the number of steps taken |
| * is equal to the difference in the final coordinates. |
| * |
| * In particular, let delta be defined as |
| * |
| * \delta = [p] -> { [x] : A x + a >= 0 and B p + b >= 0 and |
| * C x + C'p + c >= 0 and |
| * D x + D'p + d >= 0 } |
| * |
| * where the constraints C x + C'p + c >= 0 are such that the parametric |
| * constant term of each constraint j, "C_j x + C'_j p + c_j", |
| * can never attain positive values, then the relation is constructed as |
| * |
| * { [x] -> [y] : exists [f, k] \in Z^{n+1} : y = x + f and |
| * A f + k a >= 0 and B p + b >= 0 and |
| * C f + C'p + c >= 0 and k >= 1 } |
| * union { [x] -> [x] } |
| * |
| * If the zero-length paths happen to correspond exactly to the identity |
| * mapping, then we return |
| * |
| * { [x] -> [y] : exists [f, k] \in Z^{n+1} : y = x + f and |
| * A f + k a >= 0 and B p + b >= 0 and |
| * C f + C'p + c >= 0 and k >= 0 } |
| * |
| * instead. |
| * |
| * Existentially quantified variables in \delta are handled by |
| * classifying them as independent of the parameters, purely |
| * parameter dependent and others. Constraints containing |
| * any of the other existentially quantified variables are removed. |
| * This is safe, but leads to an additional overapproximation. |
| * |
| * If there are any impure constraints, then we also eliminate |
| * the parameters from \delta, resulting in a set |
| * |
| * \delta' = { [x] : E x + e >= 0 } |
| * |
| * and add the constraints |
| * |
| * E f + k e >= 0 |
| * |
| * to the constructed relation. |
| */ |
| static __isl_give isl_map *path_along_delta(__isl_take isl_space *dim, |
| __isl_take isl_basic_set *delta) |
| { |
| isl_basic_map *path = NULL; |
| unsigned d; |
| unsigned n_div; |
| unsigned nparam; |
| unsigned off; |
| int i, k; |
| int is_id; |
| int *div_purity = NULL; |
| int impurity = 0; |
| |
| if (!delta) |
| goto error; |
| n_div = isl_basic_set_dim(delta, isl_dim_div); |
| d = isl_basic_set_dim(delta, isl_dim_set); |
| nparam = isl_basic_set_dim(delta, isl_dim_param); |
| path = isl_basic_map_alloc_space(isl_space_copy(dim), n_div + d + 1, |
| d + 1 + delta->n_eq, delta->n_eq + delta->n_ineq + 1); |
| off = 1 + nparam + 2 * (d + 1) + n_div; |
| |
| for (i = 0; i < n_div + d + 1; ++i) { |
| k = isl_basic_map_alloc_div(path); |
| if (k < 0) |
| goto error; |
| isl_int_set_si(path->div[k][0], 0); |
| } |
| |
| for (i = 0; i < d + 1; ++i) { |
| k = isl_basic_map_alloc_equality(path); |
| if (k < 0) |
| goto error; |
| isl_seq_clr(path->eq[k], 1 + isl_basic_map_total_dim(path)); |
| isl_int_set_si(path->eq[k][1 + nparam + i], 1); |
| isl_int_set_si(path->eq[k][1 + nparam + d + 1 + i], -1); |
| isl_int_set_si(path->eq[k][off + i], 1); |
| } |
| |
| div_purity = get_div_purity(delta); |
| if (!div_purity) |
| goto error; |
| |
| path = add_delta_constraints(path, delta, off, nparam, d, |
| div_purity, 1, &impurity); |
| path = add_delta_constraints(path, delta, off, nparam, d, |
| div_purity, 0, &impurity); |
| if (impurity) { |
| isl_space *dim = isl_basic_set_get_space(delta); |
| delta = isl_basic_set_project_out(delta, |
| isl_dim_param, 0, nparam); |
| delta = isl_basic_set_add(delta, isl_dim_param, nparam); |
| delta = isl_basic_set_reset_space(delta, dim); |
| if (!delta) |
| goto error; |
| path = isl_basic_map_extend_constraints(path, delta->n_eq, |
| delta->n_ineq + 1); |
| path = add_delta_constraints(path, delta, off, nparam, d, |
| NULL, 1, &impurity); |
| path = add_delta_constraints(path, delta, off, nparam, d, |
| NULL, 0, &impurity); |
| path = isl_basic_map_gauss(path, NULL); |
| } |
| |
| is_id = empty_path_is_identity(path, off + d); |
| if (is_id < 0) |
| goto error; |
| |
| k = isl_basic_map_alloc_inequality(path); |
| if (k < 0) |
| goto error; |
| isl_seq_clr(path->ineq[k], 1 + isl_basic_map_total_dim(path)); |
| if (!is_id) |
| isl_int_set_si(path->ineq[k][0], -1); |
| isl_int_set_si(path->ineq[k][off + d], 1); |
| |
| free(div_purity); |
| isl_basic_set_free(delta); |
| path = isl_basic_map_finalize(path); |
| if (is_id) { |
| isl_space_free(dim); |
| return isl_map_from_basic_map(path); |
| } |
| return isl_basic_map_union(path, isl_basic_map_identity(dim)); |
| error: |
| free(div_purity); |
| isl_space_free(dim); |
| isl_basic_set_free(delta); |
| isl_basic_map_free(path); |
| return NULL; |
| } |
| |
| /* Given a dimension specification Z^{n+1} -> Z^{n+1} and a parameter "param", |
| * construct a map that equates the parameter to the difference |
| * in the final coordinates and imposes that this difference is positive. |
| * That is, construct |
| * |
| * { [x,x_s] -> [y,y_s] : k = y_s - x_s > 0 } |
| */ |
| static __isl_give isl_map *equate_parameter_to_length(__isl_take isl_space *dim, |
| unsigned param) |
| { |
| struct isl_basic_map *bmap; |
| unsigned d; |
| unsigned nparam; |
| int k; |
| |
| d = isl_space_dim(dim, isl_dim_in); |
| nparam = isl_space_dim(dim, isl_dim_param); |
| bmap = isl_basic_map_alloc_space(dim, 0, 1, 1); |
| k = isl_basic_map_alloc_equality(bmap); |
| if (k < 0) |
| goto error; |
| isl_seq_clr(bmap->eq[k], 1 + isl_basic_map_total_dim(bmap)); |
| isl_int_set_si(bmap->eq[k][1 + param], -1); |
| isl_int_set_si(bmap->eq[k][1 + nparam + d - 1], -1); |
| isl_int_set_si(bmap->eq[k][1 + nparam + d + d - 1], 1); |
| |
| k = isl_basic_map_alloc_inequality(bmap); |
| if (k < 0) |
| goto error; |
| isl_seq_clr(bmap->ineq[k], 1 + isl_basic_map_total_dim(bmap)); |
| isl_int_set_si(bmap->ineq[k][1 + param], 1); |
| isl_int_set_si(bmap->ineq[k][0], -1); |
| |
| bmap = isl_basic_map_finalize(bmap); |
| return isl_map_from_basic_map(bmap); |
| error: |
| isl_basic_map_free(bmap); |
| return NULL; |
| } |
| |
| /* Check whether "path" is acyclic, where the last coordinates of domain |
| * and range of path encode the number of steps taken. |
| * That is, check whether |
| * |
| * { d | d = y - x and (x,y) in path } |
| * |
| * does not contain any element with positive last coordinate (positive length) |
| * and zero remaining coordinates (cycle). |
| */ |
| static int is_acyclic(__isl_take isl_map *path) |
| { |
| int i; |
| int acyclic; |
| unsigned dim; |
| struct isl_set *delta; |
| |
| delta = isl_map_deltas(path); |
| dim = isl_set_dim(delta, isl_dim_set); |
| for (i = 0; i < dim; ++i) { |
| if (i == dim -1) |
| delta = isl_set_lower_bound_si(delta, isl_dim_set, i, 1); |
| else |
| delta = isl_set_fix_si(delta, isl_dim_set, i, 0); |
| } |
| |
| acyclic = isl_set_is_empty(delta); |
| isl_set_free(delta); |
| |
| return acyclic; |
| } |
| |
| /* Given a union of basic maps R = \cup_i R_i \subseteq D \times D |
| * and a dimension specification (Z^{n+1} -> Z^{n+1}), |
| * construct a map that is an overapproximation of the map |
| * that takes an element from the space D \times Z to another |
| * element from the same space, such that the first n coordinates of the |
| * difference between them is a sum of differences between images |
| * and pre-images in one of the R_i and such that the last coordinate |
| * is equal to the number of steps taken. |
| * That is, let |
| * |
| * \Delta_i = { y - x | (x, y) in R_i } |
| * |
| * then the constructed map is an overapproximation of |
| * |
| * { (x) -> (x + d) | \exists k_i >= 0, \delta_i \in \Delta_i : |
| * d = (\sum_i k_i \delta_i, \sum_i k_i) } |
| * |
| * The elements of the singleton \Delta_i's are collected as the |
| * rows of the steps matrix. For all these \Delta_i's together, |
| * a single path is constructed. |
| * For each of the other \Delta_i's, we compute an overapproximation |
| * of the paths along elements of \Delta_i. |
| * Since each of these paths performs an addition, composition is |
| * symmetric and we can simply compose all resulting paths in any order. |
| */ |
| static __isl_give isl_map *construct_extended_path(__isl_take isl_space *dim, |
| __isl_keep isl_map *map, int *project) |
| { |
| struct isl_mat *steps = NULL; |
| struct isl_map *path = NULL; |
| unsigned d; |
| int i, j, n; |
| |
| d = isl_map_dim(map, isl_dim_in); |
| |
| path = isl_map_identity(isl_space_copy(dim)); |
| |
| steps = isl_mat_alloc(map->ctx, map->n, d); |
| if (!steps) |
| goto error; |
| |
| n = 0; |
| for (i = 0; i < map->n; ++i) { |
| struct isl_basic_set *delta; |
| |
| delta = isl_basic_map_deltas(isl_basic_map_copy(map->p[i])); |
| |
| for (j = 0; j < d; ++j) { |
| int fixed; |
| |
| fixed = isl_basic_set_plain_dim_is_fixed(delta, j, |
| &steps->row[n][j]); |
| if (fixed < 0) { |
| isl_basic_set_free(delta); |
| goto error; |
| } |
| if (!fixed) |
| break; |
| } |
| |
| |
| if (j < d) { |
| path = isl_map_apply_range(path, |
| path_along_delta(isl_space_copy(dim), delta)); |
| path = isl_map_coalesce(path); |
| } else { |
| isl_basic_set_free(delta); |
| ++n; |
| } |
| } |
| |
| if (n > 0) { |
| steps->n_row = n; |
| path = isl_map_apply_range(path, |
| path_along_steps(isl_space_copy(dim), steps)); |
| } |
| |
| if (project && *project) { |
| *project = is_acyclic(isl_map_copy(path)); |
| if (*project < 0) |
| goto error; |
| } |
| |
| isl_space_free(dim); |
| isl_mat_free(steps); |
| return path; |
| error: |
| isl_space_free(dim); |
| isl_mat_free(steps); |
| isl_map_free(path); |
| return NULL; |
| } |
| |
| static int isl_set_overlaps(__isl_keep isl_set *set1, __isl_keep isl_set *set2) |
| { |
| isl_set *i; |
| int no_overlap; |
| |
| if (!isl_space_tuple_match(set1->dim, isl_dim_set, set2->dim, isl_dim_set)) |
| return 0; |
| |
| i = isl_set_intersect(isl_set_copy(set1), isl_set_copy(set2)); |
| no_overlap = isl_set_is_empty(i); |
| isl_set_free(i); |
| |
| return no_overlap < 0 ? -1 : !no_overlap; |
| } |
| |
| /* Given a union of basic maps R = \cup_i R_i \subseteq D \times D |
| * and a dimension specification (Z^{n+1} -> Z^{n+1}), |
| * construct a map that is an overapproximation of the map |
| * that takes an element from the dom R \times Z to an |
| * element from ran R \times Z, such that the first n coordinates of the |
| * difference between them is a sum of differences between images |
| * and pre-images in one of the R_i and such that the last coordinate |
| * is equal to the number of steps taken. |
| * That is, let |
| * |
| * \Delta_i = { y - x | (x, y) in R_i } |
| * |
| * then the constructed map is an overapproximation of |
| * |
| * { (x) -> (x + d) | \exists k_i >= 0, \delta_i \in \Delta_i : |
| * d = (\sum_i k_i \delta_i, \sum_i k_i) and |
| * x in dom R and x + d in ran R and |
| * \sum_i k_i >= 1 } |
| */ |
| static __isl_give isl_map *construct_component(__isl_take isl_space *dim, |
| __isl_keep isl_map *map, int *exact, int project) |
| { |
| struct isl_set *domain = NULL; |
| struct isl_set *range = NULL; |
| struct isl_map *app = NULL; |
| struct isl_map *path = NULL; |
| |
| domain = isl_map_domain(isl_map_copy(map)); |
| domain = isl_set_coalesce(domain); |
| range = isl_map_range(isl_map_copy(map)); |
| range = isl_set_coalesce(range); |
| if (!isl_set_overlaps(domain, range)) { |
| isl_set_free(domain); |
| isl_set_free(range); |
| isl_space_free(dim); |
| |
| map = isl_map_copy(map); |
| map = isl_map_add_dims(map, isl_dim_in, 1); |
| map = isl_map_add_dims(map, isl_dim_out, 1); |
| map = set_path_length(map, 1, 1); |
| return map; |
| } |
| app = isl_map_from_domain_and_range(domain, range); |
| app = isl_map_add_dims(app, isl_dim_in, 1); |
| app = isl_map_add_dims(app, isl_dim_out, 1); |
| |
| path = construct_extended_path(isl_space_copy(dim), map, |
| exact && *exact ? &project : NULL); |
| app = isl_map_intersect(app, path); |
| |
| if (exact && *exact && |
| (*exact = check_exactness(isl_map_copy(map), isl_map_copy(app), |
| project)) < 0) |
| goto error; |
| |
| isl_space_free(dim); |
| app = set_path_length(app, 0, 1); |
| return app; |
| error: |
| isl_space_free(dim); |
| isl_map_free(app); |
| return NULL; |
| } |
| |
| /* Call construct_component and, if "project" is set, project out |
| * the final coordinates. |
| */ |
| static __isl_give isl_map *construct_projected_component( |
| __isl_take isl_space *dim, |
| __isl_keep isl_map *map, int *exact, int project) |
| { |
| isl_map *app; |
| unsigned d; |
| |
| if (!dim) |
| return NULL; |
| d = isl_space_dim(dim, isl_dim_in); |
| |
| app = construct_component(dim, map, exact, project); |
| if (project) { |
| app = isl_map_project_out(app, isl_dim_in, d - 1, 1); |
| app = isl_map_project_out(app, isl_dim_out, d - 1, 1); |
| } |
| return app; |
| } |
| |
| /* Compute an extended version, i.e., with path lengths, of |
| * an overapproximation of the transitive closure of "bmap" |
| * with path lengths greater than or equal to zero and with |
| * domain and range equal to "dom". |
| */ |
| static __isl_give isl_map *q_closure(__isl_take isl_space *dim, |
| __isl_take isl_set *dom, __isl_keep isl_basic_map *bmap, int *exact) |
| { |
| int project = 1; |
| isl_map *path; |
| isl_map *map; |
| isl_map *app; |
| |
| dom = isl_set_add_dims(dom, isl_dim_set, 1); |
| app = isl_map_from_domain_and_range(dom, isl_set_copy(dom)); |
| map = isl_map_from_basic_map(isl_basic_map_copy(bmap)); |
| path = construct_extended_path(dim, map, &project); |
| app = isl_map_intersect(app, path); |
| |
| if ((*exact = check_exactness(map, isl_map_copy(app), project)) < 0) |
| goto error; |
| |
| return app; |
| error: |
| isl_map_free(app); |
| return NULL; |
| } |
| |
| /* Check whether qc has any elements of length at least one |
| * with domain and/or range outside of dom and ran. |
| */ |
| static int has_spurious_elements(__isl_keep isl_map *qc, |
| __isl_keep isl_set *dom, __isl_keep isl_set *ran) |
| { |
| isl_set *s; |
| int subset; |
| unsigned d; |
| |
| if (!qc || !dom || !ran) |
| return -1; |
| |
| d = isl_map_dim(qc, isl_dim_in); |
| |
| qc = isl_map_copy(qc); |
| qc = set_path_length(qc, 0, 1); |
| qc = isl_map_project_out(qc, isl_dim_in, d - 1, 1); |
| qc = isl_map_project_out(qc, isl_dim_out, d - 1, 1); |
| |
| s = isl_map_domain(isl_map_copy(qc)); |
| subset = isl_set_is_subset(s, dom); |
| isl_set_free(s); |
| if (subset < 0) |
| goto error; |
| if (!subset) { |
| isl_map_free(qc); |
| return 1; |
| } |
| |
| s = isl_map_range(qc); |
| subset = isl_set_is_subset(s, ran); |
| isl_set_free(s); |
| |
| return subset < 0 ? -1 : !subset; |
| error: |
| isl_map_free(qc); |
| return -1; |
| } |
| |
| #define LEFT 2 |
| #define RIGHT 1 |
| |
| /* For each basic map in "map", except i, check whether it combines |
| * with the transitive closure that is reflexive on C combines |
| * to the left and to the right. |
| * |
| * In particular, if |
| * |
| * dom map_j \subseteq C |
| * |
| * then right[j] is set to 1. Otherwise, if |
| * |
| * ran map_i \cap dom map_j = \emptyset |
| * |
| * then right[j] is set to 0. Otherwise, composing to the right |
| * is impossible. |
| * |
| * Similar, for composing to the left, we have if |
| * |
| * ran map_j \subseteq C |
| * |
| * then left[j] is set to 1. Otherwise, if |
| * |
| * dom map_i \cap ran map_j = \emptyset |
| * |
| * then left[j] is set to 0. Otherwise, composing to the left |
| * is impossible. |
| * |
| * The return value is or'd with LEFT if composing to the left |
| * is possible and with RIGHT if composing to the right is possible. |
| */ |
| static int composability(__isl_keep isl_set *C, int i, |
| isl_set **dom, isl_set **ran, int *left, int *right, |
| __isl_keep isl_map *map) |
| { |
| int j; |
| int ok; |
| |
| ok = LEFT | RIGHT; |
| for (j = 0; j < map->n && ok; ++j) { |
| int overlaps, subset; |
| if (j == i) |
| continue; |
| |
| if (ok & RIGHT) { |
| if (!dom[j]) |
| dom[j] = isl_set_from_basic_set( |
| isl_basic_map_domain( |
| isl_basic_map_copy(map->p[j]))); |
| if (!dom[j]) |
| return -1; |
| overlaps = isl_set_overlaps(ran[i], dom[j]); |
| if (overlaps < 0) |
| return -1; |
| if (!overlaps) |
| right[j] = 0; |
| else { |
| subset = isl_set_is_subset(dom[j], C); |
| if (subset < 0) |
| return -1; |
| if (subset) |
| right[j] = 1; |
| else |
| ok &= ~RIGHT; |
| } |
| } |
| |
| if (ok & LEFT) { |
| if (!ran[j]) |
| ran[j] = isl_set_from_basic_set( |
| isl_basic_map_range( |
| isl_basic_map_copy(map->p[j]))); |
| if (!ran[j]) |
| return -1; |
| overlaps = isl_set_overlaps(dom[i], ran[j]); |
| if (overlaps < 0) |
| return -1; |
| if (!overlaps) |
| left[j] = 0; |
| else { |
| subset = isl_set_is_subset(ran[j], C); |
| if (subset < 0) |
| return -1; |
| if (subset) |
| left[j] = 1; |
| else |
| ok &= ~LEFT; |
| } |
| } |
| } |
| |
| return ok; |
| } |
| |
| static __isl_give isl_map *anonymize(__isl_take isl_map *map) |
| { |
| map = isl_map_reset(map, isl_dim_in); |
| map = isl_map_reset(map, isl_dim_out); |
| return map; |
| } |
| |
| /* Return a map that is a union of the basic maps in "map", except i, |
| * composed to left and right with qc based on the entries of "left" |
| * and "right". |
| */ |
| static __isl_give isl_map *compose(__isl_keep isl_map *map, int i, |
| __isl_take isl_map *qc, int *left, int *right) |
| { |
| int j; |
| isl_map *comp; |
| |
| comp = isl_map_empty(isl_map_get_space(map)); |
| for (j = 0; j < map->n; ++j) { |
| isl_map *map_j; |
| |
| if (j == i) |
| continue; |
| |
| map_j = isl_map_from_basic_map(isl_basic_map_copy(map->p[j])); |
| map_j = anonymize(map_j); |
| if (left && left[j]) |
| map_j = isl_map_apply_range(map_j, isl_map_copy(qc)); |
| if (right && right[j]) |
| map_j = isl_map_apply_range(isl_map_copy(qc), map_j); |
| comp = isl_map_union(comp, map_j); |
| } |
| |
| comp = isl_map_compute_divs(comp); |
| comp = isl_map_coalesce(comp); |
| |
| isl_map_free(qc); |
| |
| return comp; |
| } |
| |
| /* Compute the transitive closure of "map" incrementally by |
| * computing |
| * |
| * map_i^+ \cup qc^+ |
| * |
| * or |
| * |
| * map_i^+ \cup ((id \cup map_i^) \circ qc^+) |
| * |
| * or |
| * |
| * map_i^+ \cup (qc^+ \circ (id \cup map_i^)) |
| * |
| * depending on whether left or right are NULL. |
| */ |
| static __isl_give isl_map *compute_incremental( |
| __isl_take isl_space *dim, __isl_keep isl_map *map, |
| int i, __isl_take isl_map *qc, int *left, int *right, int *exact) |
| { |
| isl_map *map_i; |
| isl_map *tc; |
| isl_map *rtc = NULL; |
| |
| if (!map) |
| goto error; |
| isl_assert(map->ctx, left || right, goto error); |
| |
| map_i = isl_map_from_basic_map(isl_basic_map_copy(map->p[i])); |
| tc = construct_projected_component(isl_space_copy(dim), map_i, |
| exact, 1); |
| isl_map_free(map_i); |
| |
| if (*exact) |
| qc = isl_map_transitive_closure(qc, exact); |
| |
| if (!*exact) { |
| isl_space_free(dim); |
| isl_map_free(tc); |
| isl_map_free(qc); |
| return isl_map_universe(isl_map_get_space(map)); |
| } |
| |
| if (!left || !right) |
| rtc = isl_map_union(isl_map_copy(tc), |
| isl_map_identity(isl_map_get_space(tc))); |
| if (!right) |
| qc = isl_map_apply_range(rtc, qc); |
| if (!left) |
| qc = isl_map_apply_range(qc, rtc); |
| qc = isl_map_union(tc, qc); |
| |
| isl_space_free(dim); |
| |
| return qc; |
| error: |
| isl_space_free(dim); |
| isl_map_free(qc); |
| return NULL; |
| } |
| |
| /* Given a map "map", try to find a basic map such that |
| * map^+ can be computed as |
| * |
| * map^+ = map_i^+ \cup |
| * \bigcup_j ((map_i^+ \cup Id_C)^+ \circ map_j \circ (map_i^+ \cup Id_C))^+ |
| * |
| * with C the simple hull of the domain and range of the input map. |
| * map_i^ \cup Id_C is computed by allowing the path lengths to be zero |
| * and by intersecting domain and range with C. |
| * Of course, we need to check that this is actually equal to map_i^ \cup Id_C. |
| * Also, we only use the incremental computation if all the transitive |
| * closures are exact and if the number of basic maps in the union, |
| * after computing the integer divisions, is smaller than the number |
| * of basic maps in the input map. |
| */ |
| static int incemental_on_entire_domain(__isl_keep isl_space *dim, |
| __isl_keep isl_map *map, |
| isl_set **dom, isl_set **ran, int *left, int *right, |
| __isl_give isl_map **res) |
| { |
| int i; |
| isl_set *C; |
| unsigned d; |
| |
| *res = NULL; |
| |
| C = isl_set_union(isl_map_domain(isl_map_copy(map)), |
| isl_map_range(isl_map_copy(map))); |
| C = isl_set_from_basic_set(isl_set_simple_hull(C)); |
| if (!C) |
| return -1; |
| if (C->n != 1) { |
| isl_set_free(C); |
| return 0; |
| } |
| |
| d = isl_map_dim(map, isl_dim_in); |
| |
| for (i = 0; i < map->n; ++i) { |
| isl_map *qc; |
| int exact_i, spurious; |
| int j; |
| dom[i] = isl_set_from_basic_set(isl_basic_map_domain( |
| isl_basic_map_copy(map->p[i]))); |
| ran[i] = isl_set_from_basic_set(isl_basic_map_range( |
| isl_basic_map_copy(map->p[i]))); |
| qc = q_closure(isl_space_copy(dim), isl_set_copy(C), |
| map->p[i], &exact_i); |
| if (!qc) |
| goto error; |
| if (!exact_i) { |
| isl_map_free(qc); |
| continue; |
| } |
| spurious = has_spurious_elements(qc, dom[i], ran[i]); |
| if (spurious) { |
| isl_map_free(qc); |
| if (spurious < 0) |
| goto error; |
| continue; |
| } |
| qc = isl_map_project_out(qc, isl_dim_in, d, 1); |
| qc = isl_map_project_out(qc, isl_dim_out, d, 1); |
| qc = isl_map_compute_divs(qc); |
| for (j = 0; j < map->n; ++j) |
| left[j] = right[j] = 1; |
| qc = compose(map, i, qc, left, right); |
| if (!qc) |
| goto error; |
| if (qc->n >= map->n) { |
| isl_map_free(qc); |
| continue; |
| } |
| *res = compute_incremental(isl_space_copy(dim), map, i, qc, |
| left, right, &exact_i); |
| if (!*res) |
| goto error; |
| if (exact_i) |
| break; |
| isl_map_free(*res); |
| *res = NULL; |
| } |
| |
| isl_set_free(C); |
| |
| return *res != NULL; |
| error: |
| isl_set_free(C); |
| return -1; |
| } |
| |
| /* Try and compute the transitive closure of "map" as |
| * |
| * map^+ = map_i^+ \cup |
| * \bigcup_j ((map_i^+ \cup Id_C)^+ \circ map_j \circ (map_i^+ \cup Id_C))^+ |
| * |
| * with C either the simple hull of the domain and range of the entire |
| * map or the simple hull of domain and range of map_i. |
| */ |
| static __isl_give isl_map *incremental_closure(__isl_take isl_space *dim, |
| __isl_keep isl_map *map, int *exact, int project) |
| { |
| int i; |
| isl_set **dom = NULL; |
| isl_set **ran = NULL; |
| int *left = NULL; |
| int *right = NULL; |
| isl_set *C; |
| unsigned d; |
| isl_map *res = NULL; |
| |
| if (!project) |
| return construct_projected_component(dim, map, exact, project); |
| |
| if (!map) |
| goto error; |
| if (map->n <= 1) |
| return construct_projected_component(dim, map, exact, project); |
| |
| d = isl_map_dim(map, isl_dim_in); |
| |
| dom = isl_calloc_array(map->ctx, isl_set *, map->n); |
| ran = isl_calloc_array(map->ctx, isl_set *, map->n); |
| left = isl_calloc_array(map->ctx, int, map->n); |
| right = isl_calloc_array(map->ctx, int, map->n); |
| if (!ran || !dom || !left || !right) |
| goto error; |
| |
| if (incemental_on_entire_domain(dim, map, dom, ran, left, right, &res) < 0) |
| goto error; |
| |
| for (i = 0; !res && i < map->n; ++i) { |
| isl_map *qc; |
| int exact_i, spurious, comp; |
| if (!dom[i]) |
| dom[i] = isl_set_from_basic_set( |
| isl_basic_map_domain( |
| isl_basic_map_copy(map->p[i]))); |
| if (!dom[i]) |
| goto error; |
| if (!ran[i]) |
| ran[i] = isl_set_from_basic_set( |
| isl_basic_map_range( |
| isl_basic_map_copy(map->p[i]))); |
| if (!ran[i]) |
| goto error; |
| C = isl_set_union(isl_set_copy(dom[i]), |
| isl_set_copy(ran[i])); |
| C = isl_set_from_basic_set(isl_set_simple_hull(C)); |
| if (!C) |
| goto error; |
| if (C->n != 1) { |
| isl_set_free(C); |
| continue; |
| } |
| comp = composability(C, i, dom, ran, left, right, map); |
| if (!comp || comp < 0) { |
| isl_set_free(C); |
| if (comp < 0) |
| goto error; |
| continue; |
| } |
| qc = q_closure(isl_space_copy(dim), C, map->p[i], &exact_i); |
| if (!qc) |
| goto error; |
| if (!exact_i) { |
| isl_map_free(qc); |
| continue; |
| } |
| spurious = has_spurious_elements(qc, dom[i], ran[i]); |
| if (spurious) { |
| isl_map_free(qc); |
| if (spurious < 0) |
| goto error; |
| continue; |
| } |
| qc = isl_map_project_out(qc, isl_dim_in, d, 1); |
| qc = isl_map_project_out(qc, isl_dim_out, d, 1); |
| qc = isl_map_compute_divs(qc); |
| qc = compose(map, i, qc, (comp & LEFT) ? left : NULL, |
| (comp & RIGHT) ? right : NULL); |
| if (!qc) |
| goto error; |
| if (qc->n >= map->n) { |
| isl_map_free(qc); |
| continue; |
| } |
| res = compute_incremental(isl_space_copy(dim), map, i, qc, |
| (comp & LEFT) ? left : NULL, |
| (comp & RIGHT) ? right : NULL, &exact_i); |
| if (!res) |
| goto error; |
| if (exact_i) |
| break; |
| isl_map_free(res); |
| res = NULL; |
| } |
| |
| for (i = 0; i < map->n; ++i) { |
| isl_set_free(dom[i]); |
| isl_set_free(ran[i]); |
| } |
| free(dom); |
| free(ran); |
| free(left); |
| free(right); |
| |
| if (res) { |
| isl_space_free(dim); |
| return res; |
| } |
| |
| return construct_projected_component(dim, map, exact, project); |
| error: |
| if (dom) |
| for (i = 0; i < map->n; ++i) |
| isl_set_free(dom[i]); |
| free(dom); |
| if (ran) |
| for (i = 0; i < map->n; ++i) |
| isl_set_free(ran[i]); |
| free(ran); |
| free(left); |
| free(right); |
| isl_space_free(dim); |
| return NULL; |
| } |
| |
| /* Given an array of sets "set", add "dom" at position "pos" |
| * and search for elements at earlier positions that overlap with "dom". |
| * If any can be found, then merge all of them, together with "dom", into |
| * a single set and assign the union to the first in the array, |
| * which becomes the new group leader for all groups involved in the merge. |
| * During the search, we only consider group leaders, i.e., those with |
| * group[i] = i, as the other sets have already been combined |
| * with one of the group leaders. |
| */ |
| static int merge(isl_set **set, int *group, __isl_take isl_set *dom, int pos) |
| { |
| int i; |
| |
| group[pos] = pos; |
| set[pos] = isl_set_copy(dom); |
| |
| for (i = pos - 1; i >= 0; --i) { |
| int o; |
| |
| if (group[i] != i) |
| continue; |
| |
| o = isl_set_overlaps(set[i], dom); |
| if (o < 0) |
| goto error; |
| if (!o) |
| continue; |
| |
| set[i] = isl_set_union(set[i], set[group[pos]]); |
| set[group[pos]] = NULL; |
| if (!set[i]) |
| goto error; |
| group[group[pos]] = i; |
| group[pos] = i; |
| } |
| |
| isl_set_free(dom); |
| return 0; |
| error: |
| isl_set_free(dom); |
| return -1; |
| } |
| |
| /* Replace each entry in the n by n grid of maps by the cross product |
| * with the relation { [i] -> [i + 1] }. |
| */ |
| static int add_length(__isl_keep isl_map *map, isl_map ***grid, int n) |
| { |
| int i, j, k; |
| isl_space *dim; |
| isl_basic_map *bstep; |
| isl_map *step; |
| unsigned nparam; |
| |
| if (!map) |
| return -1; |
| |
| dim = isl_map_get_space(map); |
| nparam = isl_space_dim(dim, isl_dim_param); |
| dim = isl_space_drop_dims(dim, isl_dim_in, 0, isl_space_dim(dim, isl_dim_in)); |
| dim = isl_space_drop_dims(dim, isl_dim_out, 0, isl_space_dim(dim, isl_dim_out)); |
| dim = isl_space_add_dims(dim, isl_dim_in, 1); |
| dim = isl_space_add_dims(dim, isl_dim_out, 1); |
| bstep = isl_basic_map_alloc_space(dim, 0, 1, 0); |
| k = isl_basic_map_alloc_equality(bstep); |
| if (k < 0) { |
| isl_basic_map_free(bstep); |
| return -1; |
| } |
| isl_seq_clr(bstep->eq[k], 1 + isl_basic_map_total_dim(bstep)); |
| isl_int_set_si(bstep->eq[k][0], 1); |
| isl_int_set_si(bstep->eq[k][1 + nparam], 1); |
| isl_int_set_si(bstep->eq[k][1 + nparam + 1], -1); |
| bstep = isl_basic_map_finalize(bstep); |
| step = isl_map_from_basic_map(bstep); |
| |
| for (i = 0; i < n; ++i) |
| for (j = 0; j < n; ++j) |
| grid[i][j] = isl_map_product(grid[i][j], |
| isl_map_copy(step)); |
| |
| isl_map_free(step); |
| |
| return 0; |
| } |
| |
| /* The core of the Floyd-Warshall algorithm. |
| * Updates the given n x x matrix of relations in place. |
| * |
| * The algorithm iterates over all vertices. In each step, the whole |
| * matrix is updated to include all paths that go to the current vertex, |
| * possibly stay there a while (including passing through earlier vertices) |
| * and then come back. At the start of each iteration, the diagonal |
| * element corresponding to the current vertex is replaced by its |
| * transitive closure to account for all indirect paths that stay |
| * in the current vertex. |
| */ |
| static void floyd_warshall_iterate(isl_map ***grid, int n, int *exact) |
| { |
| int r, p, q; |
| |
| for (r = 0; r < n; ++r) { |
| int r_exact; |
| grid[r][r] = isl_map_transitive_closure(grid[r][r], |
| (exact && *exact) ? &r_exact : NULL); |
| if (exact && *exact && !r_exact) |
| *exact = 0; |
| |
| for (p = 0; p < n; ++p) |
| for (q = 0; q < n; ++q) { |
| isl_map *loop; |
| if (p == r && q == r) |
| continue; |
| loop = isl_map_apply_range( |
| isl_map_copy(grid[p][r]), |
| isl_map_copy(grid[r][q])); |
| grid[p][q] = isl_map_union(grid[p][q], loop); |
| loop = isl_map_apply_range( |
| isl_map_copy(grid[p][r]), |
| isl_map_apply_range( |
| isl_map_copy(grid[r][r]), |
| isl_map_copy(grid[r][q]))); |
| grid[p][q] = isl_map_union(grid[p][q], loop); |
| grid[p][q] = isl_map_coalesce(grid[p][q]); |
| } |
| } |
| } |
| |
| /* Given a partition of the domains and ranges of the basic maps in "map", |
| * apply the Floyd-Warshall algorithm with the elements in the partition |
| * as vertices. |
| * |
| * In particular, there are "n" elements in the partition and "group" is |
| * an array of length 2 * map->n with entries in [0,n-1]. |
| * |
| * We first construct a matrix of relations based on the partition information, |
| * apply Floyd-Warshall on this matrix of relations and then take the |
| * union of all entries in the matrix as the final result. |
| * |
| * If we are actually computing the power instead of the transitive closure, |
| * i.e., when "project" is not set, then the result should have the |
| * path lengths encoded as the difference between an extra pair of |
| * coordinates. We therefore apply the nested transitive closures |
| * to relations that include these lengths. In particular, we replace |
| * the input relation by the cross product with the unit length relation |
| * { [i] -> [i + 1] }. |
| */ |
| static __isl_give isl_map *floyd_warshall_with_groups(__isl_take isl_space *dim, |
| __isl_keep isl_map *map, int *exact, int project, int *group, int n) |
| { |
| int i, j, k; |
| isl_map ***grid = NULL; |
| isl_map *app; |
| |
| if (!map) |
| goto error; |
| |
| if (n == 1) { |
| free(group); |
| return incremental_closure(dim, map, exact, project); |
| } |
| |
| grid = isl_calloc_array(map->ctx, isl_map **, n); |
| if (!grid) |
| goto error; |
| for (i = 0; i < n; ++i) { |
| grid[i] = isl_calloc_array(map->ctx, isl_map *, n); |
| if (!grid[i]) |
| goto error; |
| for (j = 0; j < n; ++j) |
| grid[i][j] = isl_map_empty(isl_map_get_space(map)); |
| } |
| |
| for (k = 0; k < map->n; ++k) { |
| i = group[2 * k]; |
| j = group[2 * k + 1]; |
| grid[i][j] = isl_map_union(grid[i][j], |
| isl_map_from_basic_map( |
| isl_basic_map_copy(map->p[k]))); |
| } |
| |
| if (!project && add_length(map, grid, n) < 0) |
| goto error; |
| |
| floyd_warshall_iterate(grid, n, exact); |
| |
| app = isl_map_empty(isl_map_get_space(map)); |
| |
| for (i = 0; i < n; ++i) { |
| for (j = 0; j < n; ++j) |
| app = isl_map_union(app, grid[i][j]); |
| free(grid[i]); |
| } |
| free(grid); |
| |
| free(group); |
| isl_space_free(dim); |
| |
| return app; |
| error: |
| if (grid) |
| for (i = 0; i < n; ++i) { |
| if (!grid[i]) |
| continue; |
| for (j = 0; j < n; ++j) |
| isl_map_free(grid[i][j]); |
| free(grid[i]); |
| } |
| free(grid); |
| free(group); |
| isl_space_free(dim); |
| return NULL; |
| } |
| |
| /* Partition the domains and ranges of the n basic relations in list |
| * into disjoint cells. |
| * |
| * To find the partition, we simply consider all of the domains |
| * and ranges in turn and combine those that overlap. |
| * "set" contains the partition elements and "group" indicates |
| * to which partition element a given domain or range belongs. |
| * The domain of basic map i corresponds to element 2 * i in these arrays, |
| * while the domain corresponds to element 2 * i + 1. |
| * During the construction group[k] is either equal to k, |
| * in which case set[k] contains the union of all the domains and |
| * ranges in the corresponding group, or is equal to some l < k, |
| * with l another domain or range in the same group. |
| */ |
| static int *setup_groups(isl_ctx *ctx, __isl_keep isl_basic_map **list, int n, |
| isl_set ***set, int *n_group) |
| { |
| int i; |
| int *group = NULL; |
| int g; |
| |
| *set = isl_calloc_array(ctx, isl_set *, 2 * n); |
| group = isl_alloc_array(ctx, int, 2 * n); |
| |
| if (!*set || !group) |
| goto error; |
| |
| for (i = 0; i < n; ++i) { |
| isl_set *dom; |
| dom = isl_set_from_basic_set(isl_basic_map_domain( |
| isl_basic_map_copy(list[i]))); |
| if (merge(*set, group, dom, 2 * i) < 0) |
| goto error; |
| dom = isl_set_from_basic_set(isl_basic_map_range( |
| isl_basic_map_copy(list[i]))); |
| if (merge(*set, group, dom, 2 * i + 1) < 0) |
| goto error; |
| } |
| |
| g = 0; |
| for (i = 0; i < 2 * n; ++i) |
| if (group[i] == i) { |
| if (g != i) { |
| (*set)[g] = (*set)[i]; |
| (*set)[i] = NULL; |
| } |
| group[i] = g++; |
| } else |
| group[i] = group[group[i]]; |
| |
| *n_group = g; |
| |
| return group; |
| error: |
| if (*set) { |
| for (i = 0; i < 2 * n; ++i) |
| isl_set_free((*set)[i]); |
| free(*set); |
| *set = NULL; |
| } |
| free(group); |
| return NULL; |
| } |
| |
| /* Check if the domains and ranges of the basic maps in "map" can |
| * be partitioned, and if so, apply Floyd-Warshall on the elements |
| * of the partition. Note that we also apply this algorithm |
| * if we want to compute the power, i.e., when "project" is not set. |
| * However, the results are unlikely to be exact since the recursive |
| * calls inside the Floyd-Warshall algorithm typically result in |
| * non-linear path lengths quite quickly. |
| */ |
| static __isl_give isl_map *floyd_warshall(__isl_take isl_space *dim, |
| __isl_keep isl_map *map, int *exact, int project) |
| { |
| int i; |
| isl_set **set = NULL; |
| int *group = NULL; |
| int n; |
| |
| if (!map) |
| goto error; |
| if (map->n <= 1) |
| return incremental_closure(dim, map, exact, project); |
| |
| group = setup_groups(map->ctx, map->p, map->n, &set, &n); |
| if (!group) |
| goto error; |
| |
| for (i = 0; i < 2 * map->n; ++i) |
| isl_set_free(set[i]); |
| |
| free(set); |
| |
| return floyd_warshall_with_groups(dim, map, exact, project, group, n); |
| error: |
| isl_space_free(dim); |
| return NULL; |
| } |
| |
| /* Structure for representing the nodes in the graph being traversed |
| * using Tarjan's algorithm. |
| * index represents the order in which nodes are visited. |
| * min_index is the index of the root of a (sub)component. |
| * on_stack indicates whether the node is currently on the stack. |
| */ |
| struct basic_map_sort_node { |
| int index; |
| int min_index; |
| int on_stack; |
| }; |
| /* Structure for representing the graph being traversed |
| * using Tarjan's algorithm. |
| * len is the number of nodes |
| * node is an array of nodes |
| * stack contains the nodes on the path from the root to the current node |
| * sp is the stack pointer |
| * index is the index of the last node visited |
| * order contains the elements of the components separated by -1 |
| * op represents the current position in order |
| * |
| * check_closed is set if we may have used the fact that |
| * a pair of basic maps can be interchanged |
| */ |
| struct basic_map_sort { |
| int len; |
| struct basic_map_sort_node *node; |
| int *stack; |
| int sp; |
| int index; |
| int *order; |
| int op; |
| int check_closed; |
| }; |
| |
| static void basic_map_sort_free(struct basic_map_sort *s) |
| { |
| if (!s) |
| return; |
| free(s->node); |
| free(s->stack); |
| free(s->order); |
| free(s); |
| } |
| |
| static struct basic_map_sort *basic_map_sort_alloc(struct isl_ctx *ctx, int len) |
| { |
| struct basic_map_sort *s; |
| int i; |
| |
| s = isl_calloc_type(ctx, struct basic_map_sort); |
| if (!s) |
| return NULL; |
| s->len = len; |
| s->node = isl_alloc_array(ctx, struct basic_map_sort_node, len); |
| if (!s->node) |
| goto error; |
| for (i = 0; i < len; ++i) |
| s->node[i].index = -1; |
| s->stack = isl_alloc_array(ctx, int, len); |
| if (!s->stack) |
| goto error; |
| s->order = isl_alloc_array(ctx, int, 2 * len); |
| if (!s->order) |
| goto error; |
| |
| s->sp = 0; |
| s->index = 0; |
| s->op = 0; |
| |
| s->check_closed = 0; |
| |
| return s; |
| error: |
| basic_map_sort_free(s); |
| return NULL; |
| } |
| |
| /* Check whether in the computation of the transitive closure |
| * "bmap1" (R_1) should follow (or be part of the same component as) |
| * "bmap2" (R_2). |
| * |
| * That is check whether |
| * |
| * R_1 \circ R_2 |
| * |
| * is a subset of |
| * |
| * R_2 \circ R_1 |
| * |
| * If so, then there is no reason for R_1 to immediately follow R_2 |
| * in any path. |
| * |
| * *check_closed is set if the subset relation holds while |
| * R_1 \circ R_2 is not empty. |
| */ |
| static int basic_map_follows(__isl_keep isl_basic_map *bmap1, |
| __isl_keep isl_basic_map *bmap2, int *check_closed) |
| { |
| struct isl_map *map12 = NULL; |
| struct isl_map *map21 = NULL; |
| int subset; |
| |
| if (!isl_space_tuple_match(bmap1->dim, isl_dim_in, bmap2->dim, isl_dim_out)) |
| return 0; |
| |
| map21 = isl_map_from_basic_map( |
| isl_basic_map_apply_range( |
| isl_basic_map_copy(bmap2), |
| isl_basic_map_copy(bmap1))); |
| subset = isl_map_is_empty(map21); |
| if (subset < 0) |
| goto error; |
| if (subset) { |
| isl_map_free(map21); |
| return 0; |
| } |
| |
| if (!isl_space_tuple_match(bmap1->dim, isl_dim_in, bmap1->dim, isl_dim_out) || |
| !isl_space_tuple_match(bmap2->dim, isl_dim_in, bmap2->dim, isl_dim_out)) { |
| isl_map_free(map21); |
| return 1; |
| } |
| |
| map12 = isl_map_from_basic_map( |
| isl_basic_map_apply_range( |
| isl_basic_map_copy(bmap1), |
| isl_basic_map_copy(bmap2))); |
| |
| subset = isl_map_is_subset(map21, map12); |
| |
| isl_map_free(map12); |
| isl_map_free(map21); |
| |
| if (subset) |
| *check_closed = 1; |
| |
| return subset < 0 ? -1 : !subset; |
| error: |
| isl_map_free(map21); |
| return -1; |
| } |
| |
| /* Perform Tarjan's algorithm for computing the strongly connected components |
| * in the graph with the disjuncts of "map" as vertices and with an |
| * edge between any pair of disjuncts such that the first has |
| * to be applied after the second. |
| */ |
| static int power_components_tarjan(struct basic_map_sort *s, |
| __isl_keep isl_basic_map **list, int i) |
| { |
| int j; |
| |
| s->node[i].index = s->index; |
| s->node[i].min_index = s->index; |
| s->node[i].on_stack = 1; |
| s->index++; |
| s->stack[s->sp++] = i; |
| |
| for (j = s->len - 1; j >= 0; --j) { |
| int f; |
| |
| if (j == i) |
| continue; |
| if (s->node[j].index >= 0 && |
| (!s->node[j].on_stack || |
| s->node[j].index > s->node[i].min_index)) |
| continue; |
| |
| f = basic_map_follows(list[i], list[j], &s->check_closed); |
| if (f < 0) |
| return -1; |
| if (!f) |
| continue; |
| |
| if (s->node[j].index < 0) { |
| power_components_tarjan(s, list, j); |
| if (s->node[j].min_index < s->node[i].min_index) |
| s->node[i].min_index = s->node[j].min_index; |
| } else if (s->node[j].index < s->node[i].min_index) |
| s->node[i].min_index = s->node[j].index; |
| } |
| |
| if (s->node[i].index != s->node[i].min_index) |
| return 0; |
| |
| do { |
| j = s->stack[--s->sp]; |
| s->node[j].on_stack = 0; |
| s->order[s->op++] = j; |
| } while (j != i); |
| s->order[s->op++] = -1; |
| |
| return 0; |
| } |
| |
| /* Decompose the "len" basic relations in "list" into strongly connected |
| * components. |
| */ |
| static struct basic_map_sort *basic_map_sort_init(isl_ctx *ctx, int len, |
| __isl_keep isl_basic_map **list) |
| { |
| int i; |
| struct basic_map_sort *s = NULL; |
| |
| s = basic_map_sort_alloc(ctx, len); |
| if (!s) |
| return NULL; |
| for (i = len - 1; i >= 0; --i) { |
| if (s->node[i].index >= 0) |
| continue; |
| if (power_components_tarjan(s, list, i) < 0) |
| goto error; |
| } |
| |
| return s; |
| error: |
| basic_map_sort_free(s); |
| return NULL; |
| } |
| |
| /* Given a union of basic maps R = \cup_i R_i \subseteq D \times D |
| * and a dimension specification (Z^{n+1} -> Z^{n+1}), |
| * construct a map that is an overapproximation of the map |
| * that takes an element from the dom R \times Z to an |
| * element from ran R \times Z, such that the first n coordinates of the |
| * difference between them is a sum of differences between images |
| * and pre-images in one of the R_i and such that the last coordinate |
| * is equal to the number of steps taken. |
| * If "project" is set, then these final coordinates are not included, |
| * i.e., a relation of type Z^n -> Z^n is returned. |
| * That is, let |
| * |
| * \Delta_i = { y - x | (x, y) in R_i } |
| * |
| * then the constructed map is an overapproximation of |
| * |
| * { (x) -> (x + d) | \exists k_i >= 0, \delta_i \in \Delta_i : |
| * d = (\sum_i k_i \delta_i, \sum_i k_i) and |
| * x in dom R and x + d in ran R } |
| * |
| * or |
| * |
| * { (x) -> (x + d) | \exists k_i >= 0, \delta_i \in \Delta_i : |
| * d = (\sum_i k_i \delta_i) and |
| * x in dom R and x + d in ran R } |
| * |
| * if "project" is set. |
| * |
| * We first split the map into strongly connected components, perform |
| * the above on each component and then join the results in the correct |
| * order, at each join also taking in the union of both arguments |
| * to allow for paths that do not go through one of the two arguments. |
| */ |
| static __isl_give isl_map *construct_power_components(__isl_take isl_space *dim, |
| __isl_keep isl_map *map, int *exact, int project) |
| { |
| int i, n, c; |
| struct isl_map *path = NULL; |
| struct basic_map_sort *s = NULL; |
| int *orig_exact; |
| int local_exact; |
| |
| if (!map) |
| goto error; |
| if (map->n <= 1) |
| return floyd_warshall(dim, map, exact, project); |
| |
| s = basic_map_sort_init(map->ctx, map->n, map->p); |
| if (!s) |
| goto error; |
| |
| orig_exact = exact; |
| if (s->check_closed && !exact) |
| exact = &local_exact; |
| |
| c = 0; |
| i = 0; |
| n = map->n; |
| if (project) |
| path = isl_map_empty(isl_map_get_space(map)); |
| else |
| path = isl_map_empty(isl_space_copy(dim)); |
| path = anonymize(path); |
| while (n) { |
| struct isl_map *comp; |
| isl_map *path_comp, *path_comb; |
| comp = isl_map_alloc_space(isl_map_get_space(map), n, 0); |
| while (s->order[i] != -1) { |
| comp = isl_map_add_basic_map(comp, |
| isl_basic_map_copy(map->p[s->order[i]])); |
| --n; |
| ++i; |
| } |
| path_comp = floyd_warshall(isl_space_copy(dim), |
| comp, exact, project); |
| path_comp = anonymize(path_comp); |
| path_comb = isl_map_apply_range(isl_map_copy(path), |
| isl_map_copy(path_comp)); |
| path = isl_map_union(path, path_comp); |
| path = isl_map_union(path, path_comb); |
| isl_map_free(comp); |
| ++i; |
| ++c; |
| } |
| |
| if (c > 1 && s->check_closed && !*exact) { |
| int closed; |
| |
| closed = isl_map_is_transitively_closed(path); |
| if (closed < 0) |
| goto error; |
| if (!closed) { |
| basic_map_sort_free(s); |
| isl_map_free(path); |
| return floyd_warshall(dim, map, orig_exact, project); |
| } |
| } |
| |
| basic_map_sort_free(s); |
| isl_space_free(dim); |
| |
| return path; |
| error: |
| basic_map_sort_free(s); |
| isl_space_free(dim); |
| isl_map_free(path); |
| return NULL; |
| } |
| |
| /* Given a union of basic maps R = \cup_i R_i \subseteq D \times D, |
| * construct a map that is an overapproximation of the map |
| * that takes an element from the space D to another |
| * element from the same space, such that the difference between |
| * them is a strictly positive sum of differences between images |
| * and pre-images in one of the R_i. |
| * The number of differences in the sum is equated to parameter "param". |
| * That is, let |
| * |
| * \Delta_i = { y - x | (x, y) in R_i } |
| * |
| * then the constructed map is an overapproximation of |
| * |
| * { (x) -> (x + d) | \exists k_i >= 0, \delta_i \in \Delta_i : |
| * d = \sum_i k_i \delta_i and k = \sum_i k_i > 0 } |
| * or |
| * |
| * { (x) -> (x + d) | \exists k_i >= 0, \delta_i \in \Delta_i : |
| * d = \sum_i k_i \delta_i and \sum_i k_i > 0 } |
| * |
| * if "project" is set. |
| * |
| * If "project" is not set, then |
| * we construct an extended mapping with an extra coordinate |
| * that indicates the number of steps taken. In particular, |
| * the difference in the last coordinate is equal to the number |
| * of steps taken to move from a domain element to the corresponding |
| * image element(s). |
| */ |
| static __isl_give isl_map *construct_power(__isl_keep isl_map *map, |
| int *exact, int project) |
| { |
| struct isl_map *app = NULL; |
| isl_space *dim = NULL; |
| unsigned d; |
| |
| if (!map) |
| return NULL; |
| |
| dim = isl_map_get_space(map); |
| |
| d = isl_space_dim(dim, isl_dim_in); |
| dim = isl_space_add_dims(dim, isl_dim_in, 1); |
| dim = isl_space_add_dims(dim, isl_dim_out, 1); |
| |
| app = construct_power_components(isl_space_copy(dim), map, |
| exact, project); |
| |
| isl_space_free(dim); |
| |
| return app; |
| } |
| |
| /* Compute the positive powers of "map", or an overapproximation. |
| * If the result is exact, then *exact is set to 1. |
| * |
| * If project is set, then we are actually interested in the transitive |
| * closure, so we can use a more relaxed exactness check. |
| * The lengths of the paths are also projected out instead of being |
| * encoded as the difference between an extra pair of final coordinates. |
| */ |
| static __isl_give isl_map *map_power(__isl_take isl_map *map, |
| int *exact, int project) |
| { |
| struct isl_map *app = NULL; |
| |
| if (exact) |
| *exact = 1; |
| |
| if (!map) |
| return NULL; |
| |
| isl_assert(map->ctx, |
| isl_map_dim(map, isl_dim_in) == isl_map_dim(map, isl_dim_out), |
| goto error); |
| |
| app = construct_power(map, exact, project); |
| |
| isl_map_free(map); |
| return app; |
| error: |
| isl_map_free(map); |
| isl_map_free(app); |
| return NULL; |
| } |
| |
| /* Compute the positive powers of "map", or an overapproximation. |
| * The result maps the exponent to a nested copy of the corresponding power. |
| * If the result is exact, then *exact is set to 1. |
| * map_power constructs an extended relation with the path lengths |
| * encoded as the difference between the final coordinates. |
| * In the final step, this difference is equated to an extra parameter |
| * and made positive. The extra coordinates are subsequently projected out |
| * and the parameter is turned into the domain of the result. |
| */ |
| __isl_give isl_map *isl_map_power(__isl_take isl_map *map, int *exact) |
| { |
| isl_space *target_dim; |
| isl_space *dim; |
| isl_map *diff; |
| unsigned d; |
| unsigned param; |
| |
| if (!map) |
| return NULL; |
| |
| d = isl_map_dim(map, isl_dim_in); |
| param = isl_map_dim(map, isl_dim_param); |
| |
| map = isl_map_compute_divs(map); |
| map = isl_map_coalesce(map); |
| |
| if (isl_map_plain_is_empty(map)) { |
| map = isl_map_from_range(isl_map_wrap(map)); |
| map = isl_map_add_dims(map, isl_dim_in, 1); |
| map = isl_map_set_dim_name(map, isl_dim_in, 0, "k"); |
| return map; |
| } |
| |
| target_dim = isl_map_get_space(map); |
| target_dim = isl_space_from_range(isl_space_wrap(target_dim)); |
| target_dim = isl_space_add_dims(target_dim, isl_dim_in, 1); |
| target_dim = isl_space_set_dim_name(target_dim, isl_dim_in, 0, "k"); |
| |
| map = map_power(map, exact, 0); |
| |
| map = isl_map_add_dims(map, isl_dim_param, 1); |
| dim = isl_map_get_space(map); |
| diff = equate_parameter_to_length(dim, param); |
| map = isl_map_intersect(map, diff); |
| map = isl_map_project_out(map, isl_dim_in, d, 1); |
| map = isl_map_project_out(map, isl_dim_out, d, 1); |
| map = isl_map_from_range(isl_map_wrap(map)); |
| map = isl_map_move_dims(map, isl_dim_in, 0, isl_dim_param, param, 1); |
| |
| map = isl_map_reset_space(map, target_dim); |
| |
| return map; |
| } |
| |
| /* Compute a relation that maps each element in the range of the input |
| * relation to the lengths of all paths composed of edges in the input |
| * relation that end up in the given range element. |
| * The result may be an overapproximation, in which case *exact is set to 0. |
| * The resulting relation is very similar to the power relation. |
| * The difference are that the domain has been projected out, the |
| * range has become the domain and the exponent is the range instead |
| * of a parameter. |
| */ |
| __isl_give isl_map *isl_map_reaching_path_lengths(__isl_take isl_map *map, |
| int *exact) |
| { |
| isl_space *dim; |
| isl_map *diff; |
| unsigned d; |
| unsigned param; |
| |
| if (!map) |
| return NULL; |
| |
| d = isl_map_dim(map, isl_dim_in); |
| param = isl_map_dim(map, isl_dim_param); |
| |
| map = isl_map_compute_divs(map); |
| map = isl_map_coalesce(map); |
| |
| if (isl_map_plain_is_empty(map)) { |
| if (exact) |
| *exact = 1; |
| map = isl_map_project_out(map, isl_dim_out, 0, d); |
| map = isl_map_add_dims(map, isl_dim_out, 1); |
| return map; |
| } |
| |
| map = map_power(map, exact, 0); |
| |
| map = isl_map_add_dims(map, isl_dim_param, 1); |
| dim = isl_map_get_space(map); |
| diff = equate_parameter_to_length(dim, param); |
| map = isl_map_intersect(map, diff); |
| map = isl_map_project_out(map, isl_dim_in, 0, d + 1); |
| map = isl_map_project_out(map, isl_dim_out, d, 1); |
| map = isl_map_reverse(map); |
| map = isl_map_move_dims(map, isl_dim_out, 0, isl_dim_param, param, 1); |
| |
| return map; |
| } |
| |
| /* Check whether equality i of bset is a pure stride constraint |
| * on a single dimensions, i.e., of the form |
| * |
| * v = k e |
| * |
| * with k a constant and e an existentially quantified variable. |
| */ |
| static int is_eq_stride(__isl_keep isl_basic_set *bset, int i) |
| { |
| unsigned nparam; |
| unsigned d; |
| unsigned n_div; |
| int pos1; |
| int pos2; |
| |
| if (!bset) |
| return -1; |
| |
| if (!isl_int_is_zero(bset->eq[i][0])) |
| return 0; |
| |
| nparam = isl_basic_set_dim(bset, isl_dim_param); |
| d = isl_basic_set_dim(bset, isl_dim_set); |
| n_div = isl_basic_set_dim(bset, isl_dim_div); |
| |
| if (isl_seq_first_non_zero(bset->eq[i] + 1, nparam) != -1) |
| return 0; |
| pos1 = isl_seq_first_non_zero(bset->eq[i] + 1 + nparam, d); |
| if (pos1 == -1) |
| return 0; |
| if (isl_seq_first_non_zero(bset->eq[i] + 1 + nparam + pos1 + 1, |
| d - pos1 - 1) != -1) |
| return 0; |
| |
| pos2 = isl_seq_first_non_zero(bset->eq[i] + 1 + nparam + d, n_div); |
| if (pos2 == -1) |
| return 0; |
| if (isl_seq_first_non_zero(bset->eq[i] + 1 + nparam + d + pos2 + 1, |
| n_div - pos2 - 1) != -1) |
| return 0; |
| if (!isl_int_is_one(bset->eq[i][1 + nparam + pos1]) && |
| !isl_int_is_negone(bset->eq[i][1 + nparam + pos1])) |
| return 0; |
| |
| return 1; |
| } |
| |
| /* Given a map, compute the smallest superset of this map that is of the form |
| * |
| * { i -> j : L <= j - i <= U and exists a_p: j_p - i_p = M_p a_p } |
| * |
| * (where p ranges over the (non-parametric) dimensions), |
| * compute the transitive closure of this map, i.e., |
| * |
| * { i -> j : exists k > 0: |
| * k L <= j - i <= k U and exists a: j_p - i_p = M_p a_p } |
| * |
| * and intersect domain and range of this transitive closure with |
| * the given domain and range. |
| * |
| * If with_id is set, then try to include as much of the identity mapping |
| * as possible, by computing |
| * |
| * { i -> j : exists k >= 0: |
| * k L <= j - i <= k U and exists a: j_p - i_p = M_p a_p } |
| * |
| * instead (i.e., allow k = 0). |
| * |
| * In practice, we compute the difference set |
| * |
| * delta = { j - i | i -> j in map }, |
| * |
| * look for stride constraint on the individual dimensions and compute |
| * (constant) lower and upper bounds for each individual dimension, |
| * adding a constraint for each bound not equal to infinity. |
| */ |
| static __isl_give isl_map *box_closure_on_domain(__isl_take isl_map *map, |
| __isl_take isl_set *dom, __isl_take isl_set *ran, int with_id) |
| { |
| int i; |
| int k; |
| unsigned d; |
| unsigned nparam; |
| unsigned total; |
| isl_space *dim; |
| isl_set *delta; |
| isl_map *app = NULL; |
| isl_basic_set *aff = NULL; |
| isl_basic_map *bmap = NULL; |
| isl_vec *obj = NULL; |
| isl_int opt; |
| |
| isl_int_init(opt); |
| |
| delta = isl_map_deltas(isl_map_copy(map)); |
| |
| aff = isl_set_affine_hull(isl_set_copy(delta)); |
| if (!aff) |
| goto error; |
| dim = isl_map_get_space(map); |
| d = isl_space_dim(dim, isl_dim_in); |
| nparam = isl_space_dim(dim, isl_dim_param); |
| total = isl_space_dim(dim, isl_dim_all); |
| bmap = isl_basic_map_alloc_space(dim, |
| aff->n_div + 1, aff->n_div, 2 * d + 1); |
| for (i = 0; i < aff->n_div + 1; ++i) { |
| k = isl_basic_map_alloc_div(bmap); |
| if (k < 0) |
| goto error; |
| isl_int_set_si(bmap->div[k][0], 0); |
| } |
| for (i = 0; i < aff->n_eq; ++i) { |
| if (!is_eq_stride(aff, i)) |
| continue; |
| k = isl_basic_map_alloc_equality(bmap); |
| if (k < 0) |
| goto error; |
| isl_seq_clr(bmap->eq[k], 1 + nparam); |
| isl_seq_cpy(bmap->eq[k] + 1 + nparam + d, |
| aff->eq[i] + 1 + nparam, d); |
| isl_seq_neg(bmap->eq[k] + 1 + nparam, |
| aff->eq[i] + 1 + nparam, d); |
| isl_seq_cpy(bmap->eq[k] + 1 + nparam + 2 * d, |
| aff->eq[i] + 1 + nparam + d, aff->n_div); |
| isl_int_set_si(bmap->eq[k][1 + total + aff->n_div], 0); |
| } |
| obj = isl_vec_alloc(map->ctx, 1 + nparam + d); |
| if (!obj) |
| goto error; |
| isl_seq_clr(obj->el, 1 + nparam + d); |
| for (i = 0; i < d; ++ i) { |
| enum isl_lp_result res; |
| |
| isl_int_set_si(obj->el[1 + nparam + i], 1); |
| |
| res = isl_set_solve_lp(delta, 0, obj->el, map->ctx->one, &opt, |
| NULL, NULL); |
| if (res == isl_lp_error) |
| goto error; |
| if (res == isl_lp_ok) { |
| k = isl_basic_map_alloc_inequality(bmap); |
| if (k < 0) |
| goto error; |
| isl_seq_clr(bmap->ineq[k], |
| 1 + nparam + 2 * d + bmap->n_div); |
| isl_int_set_si(bmap->ineq[k][1 + nparam + i], -1); |
| isl_int_set_si(bmap->ineq[k][1 + nparam + d + i], 1); |
| isl_int_neg(bmap->ineq[k][1 + nparam + 2 * d + aff->n_div], opt); |
| } |
| |
| res = isl_set_solve_lp(delta, 1, obj->el, map->ctx->one, &opt, |
| NULL, NULL); |
| if (res == isl_lp_error) |
| goto error; |
| if (res == isl_lp_ok) { |
| k = isl_basic_map_alloc_inequality(bmap); |
| if (k < 0) |
| goto error; |
| isl_seq_clr(bmap->ineq[k], |
| 1 + nparam + 2 * d + bmap->n_div); |
| isl_int_set_si(bmap->ineq[k][1 + nparam + i], 1); |
| isl_int_set_si(bmap->ineq[k][1 + nparam + d + i], -1); |
| isl_int_set(bmap->ineq[k][1 + nparam + 2 * d + aff->n_div], opt); |
| } |
| |
| isl_int_set_si(obj->el[1 + nparam + i], 0); |
| } |
| k = isl_basic_map_alloc_inequality(bmap); |
| if (k < 0) |
| goto error; |
| isl_seq_clr(bmap->ineq[k], |
| 1 + nparam + 2 * d + bmap->n_div); |
| if (!with_id) |
| isl_int_set_si(bmap->ineq[k][0], -1); |
| isl_int_set_si(bmap->ineq[k][1 + nparam + 2 * d + aff->n_div], 1); |
| |
| app = isl_map_from_domain_and_range(dom, ran); |
| |
| isl_vec_free(obj); |
| isl_basic_set_free(aff); |
| isl_map_free(map); |
| bmap = isl_basic_map_finalize(bmap); |
| isl_set_free(delta); |
| isl_int_clear(opt); |
| |
| map = isl_map_from_basic_map(bmap); |
| map = isl_map_intersect(map, app); |
| |
| return map; |
| error: |
| isl_vec_free(obj); |
| isl_basic_map_free(bmap); |
| isl_basic_set_free(aff); |
| isl_set_free(dom); |
| isl_set_free(ran); |
| isl_map_free(map); |
| isl_set_free(delta); |
| isl_int_clear(opt); |
| return NULL; |
| } |
| |
| /* Given a map, compute the smallest superset of this map that is of the form |
| * |
| * { i -> j : L <= j - i <= U and exists a_p: j_p - i_p = M_p a_p } |
| * |
| * (where p ranges over the (non-parametric) dimensions), |
| * compute the transitive closure of this map, i.e., |
| * |
| * { i -> j : exists k > 0: |
| * k L <= j - i <= k U and exists a: j_p - i_p = M_p a_p } |
| * |
| * and intersect domain and range of this transitive closure with |
| * domain and range of the original map. |
| */ |
| static __isl_give isl_map *box_closure(__isl_take isl_map *map) |
| { |
| isl_set *domain; |
| isl_set *range; |
| |
| domain = isl_map_domain(isl_map_copy(map)); |
| domain = isl_set_coalesce(domain); |
| range = isl_map_range(isl_map_copy(map)); |
| range = isl_set_coalesce(range); |
| |
| return box_closure_on_domain(map, domain, range, 0); |
| } |
| |
| /* Given a map, compute the smallest superset of this map that is of the form |
| * |
| * { i -> j : L <= j - i <= U and exists a_p: j_p - i_p = M_p a_p } |
| * |
| * (where p ranges over the (non-parametric) dimensions), |
| * compute the transitive and partially reflexive closure of this map, i.e., |
| * |
| * { i -> j : exists k >= 0: |
| * k L <= j - i <= k U and exists a: j_p - i_p = M_p a_p } |
| * |
| * and intersect domain and range of this transitive closure with |
| * the given domain. |
| */ |
| static __isl_give isl_map *box_closure_with_identity(__isl_take isl_map *map, |
| __isl_take isl_set *dom) |
| { |
| return box_closure_on_domain(map, dom, isl_set_copy(dom), 1); |
| } |
| |
| /* Check whether app is the transitive closure of map. |
| * In particular, check that app is acyclic and, if so, |
| * check that |
| * |
| * app \subset (map \cup (map \circ app)) |
| */ |
| static int check_exactness_omega(__isl_keep isl_map *map, |
| __isl_keep isl_map *app) |
| { |
| isl_set *delta; |
| int i; |
| int is_empty, is_exact; |
| unsigned d; |
| isl_map *test; |
| |
| delta = isl_map_deltas(isl_map_copy(app)); |
| d = isl_set_dim(delta, isl_dim_set); |
| for (i = 0; i < d; ++i) |
| delta = isl_set_fix_si(delta, isl_dim_set, i, 0); |
| is_empty = isl_set_is_empty(delta); |
| isl_set_free(delta); |
| if (is_empty < 0) |
| return -1; |
| if (!is_empty) |
| return 0; |
| |
| test = isl_map_apply_range(isl_map_copy(app), isl_map_copy(map)); |
| test = isl_map_union(test, isl_map_copy(map)); |
| is_exact = isl_map_is_subset(app, test); |
| isl_map_free(test); |
| |
| return is_exact; |
| } |
| |
| /* Check if basic map M_i can be combined with all the other |
| * basic maps such that |
| * |
| * (\cup_j M_j)^+ |
| * |
| * can be computed as |
| * |
| * M_i \cup (\cup_{j \ne i} M_i^* \circ M_j \circ M_i^*)^+ |
| * |
| * In particular, check if we can compute a compact representation |
| * of |
| * |
| * M_i^* \circ M_j \circ M_i^* |
| * |
| * for each j != i. |
| * Let M_i^? be an extension of M_i^+ that allows paths |
| * of length zero, i.e., the result of box_closure(., 1). |
| * The criterion, as proposed by Kelly et al., is that |
| * id = M_i^? - M_i^+ can be represented as a basic map |
| * and that |
| * |
| * id \circ M_j \circ id = M_j |
| * |
| * for each j != i. |
| * |
| * If this function returns 1, then tc and qc are set to |
| * M_i^+ and M_i^?, respectively. |
| */ |
| static int can_be_split_off(__isl_keep isl_map *map, int i, |
| __isl_give isl_map **tc, __isl_give isl_map **qc) |
| { |
| isl_map *map_i, *id = NULL; |
| int j = -1; |
| isl_set *C; |
| |
| *tc = NULL; |
| *qc = NULL; |
| |
| C = isl_set_union(isl_map_domain(isl_map_copy(map)), |
| isl_map_range(isl_map_copy(map))); |
| C = isl_set_from_basic_set(isl_set_simple_hull(C)); |
| if (!C) |
| goto error; |
| |
| map_i = isl_map_from_basic_map(isl_basic_map_copy(map->p[i])); |
| *tc = box_closure(isl_map_copy(map_i)); |
| *qc = box_closure_with_identity(map_i, C); |
| id = isl_map_subtract(isl_map_copy(*qc), isl_map_copy(*tc)); |
| |
| if (!id || !*qc) |
| goto error; |
| if (id->n != 1 || (*qc)->n != 1) |
| goto done; |
| |
| for (j = 0; j < map->n; ++j) { |
| isl_map *map_j, *test; |
| int is_ok; |
| |
| if (i == j) |
| continue; |
| map_j = isl_map_from_basic_map( |
| isl_basic_map_copy(map->p[j])); |
| test = isl_map_apply_range(isl_map_copy(id), |
| isl_map_copy(map_j)); |
| test = isl_map_apply_range(test, isl_map_copy(id)); |
| is_ok = isl_map_is_equal(test, map_j); |
| isl_map_free(map_j); |
| isl_map_free(test); |
| if (is_ok < 0) |
| goto error; |
| if (!is_ok) |
| break; |
| } |
| |
| done: |
| isl_map_free(id); |
| if (j == map->n) |
| return 1; |
| |
| isl_map_free(*qc); |
| isl_map_free(*tc); |
| *qc = NULL; |
| *tc = NULL; |
| |
| return 0; |
| error: |
| isl_map_free(id); |
| isl_map_free(*qc); |
| isl_map_free(*tc); |
| *qc = NULL; |
| *tc = NULL; |
| return -1; |
| } |
| |
| static __isl_give isl_map *box_closure_with_check(__isl_take isl_map *map, |
| int *exact) |
| { |
| isl_map *app; |
| |
| app = box_closure(isl_map_copy(map)); |
| if (exact) |
| *exact = check_exactness_omega(map, app); |
| |
| isl_map_free(map); |
| return app; |
| } |
| |
| /* Compute an overapproximation of the transitive closure of "map" |
| * using a variation of the algorithm from |
| * "Transitive Closure of Infinite Graphs and its Applications" |
| * by Kelly et al. |
| * |
| * We first check whether we can can split of any basic map M_i and |
| * compute |
| * |
| * (\cup_j M_j)^+ |
| * |
| * as |
| * |
| * M_i \cup (\cup_{j \ne i} M_i^* \circ M_j \circ M_i^*)^+ |
| * |
| * using a recursive call on the remaining map. |
| * |
| * If not, we simply call box_closure on the whole map. |
| */ |
| static __isl_give isl_map *transitive_closure_omega(__isl_take isl_map *map, |
| int *exact) |
| { |
| int i, j; |
| int exact_i; |
| isl_map *app; |
| |
| if (!map) |
| return NULL; |
| if (map->n == 1) |
| return box_closure_with_check(map, exact); |
| |
| for (i = 0; i < map->n; ++i) { |
| int ok; |
| isl_map *qc, *tc; |
| ok = can_be_split_off(map, i, &tc, &qc); |
| if (ok < 0) |
| goto error; |
| if (!ok) |
| continue; |
| |
| app = isl_map_alloc_space(isl_map_get_space(map), map->n - 1, 0); |
| |
| for (j = 0; j < map->n; ++j) { |
| if (j == i) |
| continue; |
| app = isl_map_add_basic_map(app, |
| isl_basic_map_copy(map->p[j])); |
| } |
| |
| app = isl_map_apply_range(isl_map_copy(qc), app); |
| app = isl_map_apply_range(app, qc); |
| |
| app = isl_map_union(tc, transitive_closure_omega(app, NULL)); |
| exact_i = check_exactness_omega(map, app); |
| if (exact_i == 1) { |
| if (exact) |
| *exact = exact_i; |
| isl_map_free(map); |
| return app; |
| } |
| isl_map_free(app); |
| if (exact_i < 0) |
| goto error; |
| } |
| |
| return box_closure_with_check(map, exact); |
| error: |
| isl_map_free(map); |
| return NULL; |
| } |
| |
| /* Compute the transitive closure of "map", or an overapproximation. |
| * If the result is exact, then *exact is set to 1. |
| * Simply use map_power to compute the powers of map, but tell |
| * it to project out the lengths of the paths instead of equating |
| * the length to a parameter. |
| */ |
| __isl_give isl_map *isl_map_transitive_closure(__isl_take isl_map *map, |
| int *exact) |
| { |
| isl_space *target_dim; |
| int closed; |
| |
| if (!map) |
| goto error; |
| |
| if (map->ctx->opt->closure == ISL_CLOSURE_BOX) |
| return transitive_closure_omega(map, exact); |
| |
| map = isl_map_compute_divs(map); |
| map = isl_map_coalesce(map); |
| closed = isl_map_is_transitively_closed(map); |
| if (closed < 0) |
| goto error; |
| if (closed) { |
| if (exact) |
| *exact = 1; |
| return map; |
| } |
| |
| target_dim = isl_map_get_space(map); |
| map = map_power(map, exact, 1); |
| map = isl_map_reset_space(map, target_dim); |
| |
| return map; |
| error: |
| isl_map_free(map); |
| return NULL; |
| } |
| |
| static int inc_count(__isl_take isl_map *map, void *user) |
| { |
| int *n = user; |
| |
| *n += map->n; |
| |
| isl_map_free(map); |
| |
| return 0; |
| } |
| |
| static int collect_basic_map(__isl_take isl_map *map, void *user) |
| { |
| int i; |
| isl_basic_map ***next = user; |
| |
| for (i = 0; i < map->n; ++i) { |
| **next = isl_basic_map_copy(map->p[i]); |
| if (!**next) |
| goto error; |
| (*next)++; |
| } |
| |
| isl_map_free(map); |
| return 0; |
| error: |
| isl_map_free(map); |
| return -1; |
| } |
| |
| /* Perform Floyd-Warshall on the given list of basic relations. |
| * The basic relations may live in different dimensions, |
| * but basic relations that get assigned to the diagonal of the |
| * grid have domains and ranges of the same dimension and so |
| * the standard algorithm can be used because the nested transitive |
| * closures are only applied to diagonal elements and because all |
| * compositions are peformed on relations with compatible domains and ranges. |
| */ |
| static __isl_give isl_union_map *union_floyd_warshall_on_list(isl_ctx *ctx, |
| __isl_keep isl_basic_map **list, int n, int *exact) |
| { |
| int i, j, k; |
| int n_group; |
| int *group = NULL; |
| isl_set **set = NULL; |
| isl_map ***grid = NULL; |
| isl_union_map *app; |
| |
| group = setup_groups(ctx, list, n, &set, &n_group); |
| if (!group) |
| goto error; |
| |
| grid = isl_calloc_array(ctx, isl_map **, n_group); |
| if (!grid) |
| goto error; |
| for (i = 0; i < n_group; ++i) { |
| grid[i] = isl_calloc_array(ctx, isl_map *, n_group); |
| if (!grid[i]) |
| goto error; |
| for (j = 0; j < n_group; ++j) { |
| isl_space *dim1, *dim2, *dim; |
| dim1 = isl_space_reverse(isl_set_get_space(set[i])); |
| dim2 = isl_set_get_space(set[j]); |
| dim = isl_space_join(dim1, dim2); |
| grid[i][j] = isl_map_empty(dim); |
| } |
| } |
| |
| for (k = 0; k < n; ++k) { |
| i = group[2 * k]; |
| j = group[2 * k + 1]; |
| grid[i][j] = isl_map_union(grid[i][j], |
| isl_map_from_basic_map( |
| isl_basic_map_copy(list[k]))); |
| } |
| |
| floyd_warshall_iterate(grid, n_group, exact); |
| |
| app = isl_union_map_empty(isl_map_get_space(grid[0][0])); |
| |
| for (i = 0; i < n_group; ++i) { |
| for (j = 0; j < n_group; ++j) |
| app = isl_union_map_add_map(app, grid[i][j]); |
| free(grid[i]); |
| } |
| free(grid); |
| |
| for (i = 0; i < 2 * n; ++i) |
| isl_set_free(set[i]); |
| free(set); |
| |
| free(group); |
| return app; |
| error: |
| if (grid) |
| for (i = 0; i < n_group; ++i) { |
| if (!grid[i]) |
| continue; |
| for (j = 0; j < n_group; ++j) |
| isl_map_free(grid[i][j]); |
| free(grid[i]); |
| } |
| free(grid); |
| if (set) { |
| for (i = 0; i < 2 * n; ++i) |
| isl_set_free(set[i]); |
| free(set); |
| } |
| free(group); |
| return NULL; |
| } |
| |
| /* Perform Floyd-Warshall on the given union relation. |
| * The implementation is very similar to that for non-unions. |
| * The main difference is that it is applied unconditionally. |
| * We first extract a list of basic maps from the union map |
| * and then perform the algorithm on this list. |
| */ |
| static __isl_give isl_union_map *union_floyd_warshall( |
| __isl_take isl_union_map *umap, int *exact) |
| { |
| int i, n; |
| isl_ctx *ctx; |
| isl_basic_map **list = NULL; |
| isl_basic_map **next; |
| isl_union_map *res; |
| |
| n = 0; |
| if (isl_union_map_foreach_map(umap, inc_count, &n) < 0) |
| goto error; |
| |
| ctx = isl_union_map_get_ctx(umap); |
| list = isl_calloc_array(ctx, isl_basic_map *, n); |
| if (!list) |
| goto error; |
| |
| next = list; |
| if (isl_union_map_foreach_map(umap, collect_basic_map, &next) < 0) |
| goto error; |
| |
| res = union_floyd_warshall_on_list(ctx, list, n, exact); |
| |
| if (list) { |
| for (i = 0; i < n; ++i) |
| isl_basic_map_free(list[i]); |
| free(list); |
| } |
| |
| isl_union_map_free(umap); |
| return res; |
| error: |
| if (list) { |
| for (i = 0; i < n; ++i) |
| isl_basic_map_free(list[i]); |
| free(list); |
| } |
| isl_union_map_free(umap); |
| return NULL; |
| } |
| |
| /* Decompose the give union relation into strongly connected components. |
| * The implementation is essentially the same as that of |
| * construct_power_components with the major difference that all |
| * operations are performed on union maps. |
| */ |
| static __isl_give isl_union_map *union_components( |
| __isl_take isl_union_map *umap, int *exact) |
| { |
| int i; |
| int n; |
| isl_ctx *ctx; |
| isl_basic_map **list; |
| isl_basic_map **next; |
| isl_union_map *path = NULL; |
| struct basic_map_sort *s = NULL; |
| int c, l; |
| int recheck = 0; |
| |
| n = 0; |
| if (isl_union_map_foreach_map(umap, inc_count, &n) < 0) |
| goto error; |
| |
| if (n <= 1) |
| return union_floyd_warshall(umap, exact); |
| |
| ctx = isl_union_map_get_ctx(umap); |
| list = isl_calloc_array(ctx, isl_basic_map *, n); |
| if (!list) |
| goto error; |
| |
| next = list; |
| if (isl_union_map_foreach_map(umap, collect_basic_map, &next) < 0) |
| goto error; |
| |
| s = basic_map_sort_init(ctx, n, list); |
| if (!s) |
| goto error; |
| |
| c = 0; |
| i = 0; |
| l = n; |
| path = isl_union_map_empty(isl_union_map_get_space(umap)); |
| while (l) { |
| isl_union_map *comp; |
| isl_union_map *path_comp, *path_comb; |
| comp = isl_union_map_empty(isl_union_map_get_space(umap)); |
| while (s->order[i] != -1) { |
| comp = isl_union_map_add_map(comp, |
| isl_map_from_basic_map( |
| isl_basic_map_copy(list[s->order[i]]))); |
| --l; |
| ++i; |
| } |
| path_comp = union_floyd_warshall(comp, exact); |
| path_comb = isl_union_map_apply_range(isl_union_map_copy(path), |
| isl_union_map_copy(path_comp)); |
| path = isl_union_map_union(path, path_comp); |
| path = isl_union_map_union(path, path_comb); |
| ++i; |
| ++c; |
| } |
| |
| if (c > 1 && s->check_closed && !*exact) { |
| int closed; |
| |
| closed = isl_union_map_is_transitively_closed(path); |
| if (closed < 0) |
| goto error; |
| recheck = !closed; |
| } |
| |
| basic_map_sort_free(s); |
| |
| for (i = 0; i < n; ++i) |
| isl_basic_map_free(list[i]); |
| free(list); |
| |
| if (recheck) { |
| isl_union_map_free(path); |
| return union_floyd_warshall(umap, exact); |
| } |
| |
| isl_union_map_free(umap); |
| |
| return path; |
| error: |
| basic_map_sort_free(s); |
| if (list) { |
| for (i = 0; i < n; ++i) |
| isl_basic_map_free(list[i]); |
| free(list); |
| } |
| isl_union_map_free(umap); |
| isl_union_map_free(path); |
| return NULL; |
| } |
| |
| /* Compute the transitive closure of "umap", or an overapproximation. |
| * If the result is exact, then *exact is set to 1. |
| */ |
| __isl_give isl_union_map *isl_union_map_transitive_closure( |
| __isl_take isl_union_map *umap, int *exact) |
| { |
| int closed; |
| |
| if (!umap) |
| return NULL; |
| |
| if (exact) |
| *exact = 1; |
| |
| umap = isl_union_map_compute_divs(umap); |
| umap = isl_union_map_coalesce(umap); |
| closed = isl_union_map_is_transitively_closed(umap); |
| if (closed < 0) |
| goto error; |
| if (closed) |
| return umap; |
| umap = union_components(umap, exact); |
| return umap; |
| error: |
| isl_union_map_free(umap); |
| return NULL; |
| } |
| |
| struct isl_union_power { |
| isl_union_map *pow; |
| int *exact; |
| }; |
| |
| static int power(__isl_take isl_map *map, void *user) |
| { |
| struct isl_union_power *up = user; |
| |
| map = isl_map_power(map, up->exact); |
| up->pow = isl_union_map_from_map(map); |
| |
| return -1; |
| } |
| |
| /* Construct a map [x] -> [x+1], with parameters prescribed by "dim". |
| */ |
| static __isl_give isl_union_map *increment(__isl_take isl_space *dim) |
| { |
| int k; |
| isl_basic_map *bmap; |
| |
| dim = isl_space_add_dims(dim, isl_dim_in, 1); |
| dim = isl_space_add_dims(dim, isl_dim_out, 1); |
| bmap = isl_basic_map_alloc_space(dim, 0, 1, 0); |
| k = isl_basic_map_alloc_equality(bmap); |
| if (k < 0) |
| goto error; |
| isl_seq_clr(bmap->eq[k], isl_basic_map_total_dim(bmap)); |
| isl_int_set_si(bmap->eq[k][0], 1); |
| isl_int_set_si(bmap->eq[k][isl_basic_map_offset(bmap, isl_dim_in)], 1); |
| isl_int_set_si(bmap->eq[k][isl_basic_map_offset(bmap, isl_dim_out)], -1); |
| return isl_union_map_from_map(isl_map_from_basic_map(bmap)); |
| error: |
| isl_basic_map_free(bmap); |
| return NULL; |
| } |
| |
| /* Construct a map [[x]->[y]] -> [y-x], with parameters prescribed by "dim". |
| */ |
| static __isl_give isl_union_map *deltas_map(__isl_take isl_space *dim) |
| { |
| isl_basic_map *bmap; |
| |
| dim = isl_space_add_dims(dim, isl_dim_in, 1); |
| dim = isl_space_add_dims(dim, isl_dim_out, 1); |
| bmap = isl_basic_map_universe(dim); |
| bmap = isl_basic_map_deltas_map(bmap); |
| |
| return isl_union_map_from_map(isl_map_from_basic_map(bmap)); |
| } |
| |
| /* Compute the positive powers of "map", or an overapproximation. |
| * The result maps the exponent to a nested copy of the corresponding power. |
| * If the result is exact, then *exact is set to 1. |
| */ |
| __isl_give isl_union_map *isl_union_map_power(__isl_take isl_union_map *umap, |
| int *exact) |
| { |
| int n; |
| isl_union_map *inc; |
| isl_union_map *dm; |
| |
| if (!umap) |
| return NULL; |
| n = isl_union_map_n_map(umap); |
| if (n == 0) |
| return umap; |
| if (n == 1) { |
| struct isl_union_power up = { NULL, exact }; |
| isl_union_map_foreach_map(umap, &power, &up); |
| isl_union_map_free(umap); |
| return up.pow; |
| } |
| inc = increment(isl_union_map_get_space(umap)); |
| umap = isl_union_map_product(inc, umap); |
| umap = isl_union_map_transitive_closure(umap, exact); |
| umap = isl_union_map_zip(umap); |
| dm = deltas_map(isl_union_map_get_space(umap)); |
| umap = isl_union_map_apply_domain(umap, dm); |
| |
| return umap; |
| } |
