isl_int_set_si(bmap->div[div][1+1+last_var], 0);
isl_int_set(bmap->div[div][0],
bmap->eq[done][1+last_var]);
+ if (progress)
+ *progress = 1;
ISL_F_CLR(bmap, ISL_BASIC_MAP_NORMALIZED);
}
}
unsigned total;
struct isl_ctx *ctx;
+ bmap = isl_basic_map_order_divs(bmap);
if (!bmap || bmap->n_div <= 1)
return bmap;
k = elim_for[l] - 1;
isl_int_set_si(eq.data[1+total_var+k], -1);
isl_int_set_si(eq.data[1+total_var+l], 1);
- eliminate_div(bmap, eq.data, l, 0);
+ eliminate_div(bmap, eq.data, l, 1);
isl_int_set_si(eq.data[1+total_var+k], 0);
isl_int_set_si(eq.data[1+total_var+l], 0);
}
return 1;
}
+/* Would an expression for div "div" based on inequality "ineq" of "bmap"
+ * be a better expression than the current one?
+ *
+ * If we do not have any expression yet, then any expression would be better.
+ * Otherwise we check if the last variable involved in the inequality
+ * (disregarding the div that it would define) is in an earlier position
+ * than the last variable involved in the current div expression.
+ */
+static int better_div_constraint(__isl_keep isl_basic_map *bmap,
+ int div, int ineq)
+{
+ unsigned total = 1 + isl_space_dim(bmap->dim, isl_dim_all);
+ int last_div;
+ int last_ineq;
+
+ if (isl_int_is_zero(bmap->div[div][0]))
+ return 1;
+
+ if (isl_seq_last_non_zero(bmap->ineq[ineq] + total + div + 1,
+ bmap->n_div - (div + 1)) >= 0)
+ return 0;
+
+ last_ineq = isl_seq_last_non_zero(bmap->ineq[ineq], total + div);
+ last_div = isl_seq_last_non_zero(bmap->div[div] + 1,
+ total + bmap->n_div);
+
+ return last_ineq < last_div;
+}
+
/* Given two constraints "k" and "l" that are opposite to each other,
* except for the constant term, check if we can use them
- * to obtain an expression for one of the hitherto unknown divs.
+ * to obtain an expression for one of the hitherto unknown divs or
+ * a "better" expression for a div for which we already have an expression.
* "sum" is the sum of the constant terms of the constraints.
* If this sum is strictly smaller than the coefficient of one
* of the divs, then this pair can be used define the div.
unsigned total = 1 + isl_space_dim(bmap->dim, isl_dim_all);
for (i = 0; i < bmap->n_div; ++i) {
- if (!isl_int_is_zero(bmap->div[i][0]))
- continue;
if (isl_int_is_zero(bmap->ineq[k][total + i]))
continue;
if (isl_int_abs_ge(sum, bmap->ineq[k][total + i]))
continue;
+ if (!better_div_constraint(bmap, i, k))
+ continue;
if (!ok_to_set_div_from_bound(bmap, i, k))
break;
if (isl_int_is_pos(bmap->ineq[k][total + i]))
return NULL;
while (progress) {
progress = 0;
+ if (!bmap)
+ break;
+ if (isl_basic_map_plain_is_empty(bmap))
+ break;
bmap = isl_basic_map_normalize_constraints(bmap);
bmap = normalize_div_expressions(bmap);
bmap = remove_duplicate_divs(bmap, &progress);
{
int i;
+ if (!bmap)
+ return NULL;
+
for (i = 0; i < bmap->n_div; ++i) {
if (isl_int_is_zero(bmap->div[i][0]))
continue;
bmap = isl_basic_map_cow(bmap);
for (d = pos + n - 1; d >= 0 && d >= pos; --d)
bmap = remove_dependent_vars(bmap, d);
+ if (!bmap)
+ return NULL;
for (d = pos + n - 1;
d >= 0 && d >= total - bmap->n_div && d >= pos; --d)
return bset;
}
+/* Does the (linear part of a) constraint "c" involve any of the "len"
+ * "relevant" dimensions?
+ */
+static int is_related(isl_int *c, int len, int *relevant)
+{
+ int i;
+
+ for (i = 0; i < len; ++i) {
+ if (!relevant[i])
+ continue;
+ if (!isl_int_is_zero(c[i]))
+ return 1;
+ }
+
+ return 0;
+}
+
+/* Drop constraints from "bset" that do not involve any of
+ * the dimensions marked "relevant".
+ */
+static __isl_give isl_basic_set *drop_unrelated_constraints(
+ __isl_take isl_basic_set *bset, int *relevant)
+{
+ int i, dim;
+
+ dim = isl_basic_set_dim(bset, isl_dim_set);
+ for (i = 0; i < dim; ++i)
+ if (!relevant[i])
+ break;
+ if (i >= dim)
+ return bset;
+
+ for (i = bset->n_eq - 1; i >= 0; --i)
+ if (!is_related(bset->eq[i] + 1, dim, relevant))
+ isl_basic_set_drop_equality(bset, i);
+
+ for (i = bset->n_ineq - 1; i >= 0; --i)
+ if (!is_related(bset->ineq[i] + 1, dim, relevant))
+ isl_basic_set_drop_inequality(bset, i);
+
+ return bset;
+}
+
+/* Update the groups in "group" based on the (linear part of a) constraint "c".
+ *
+ * In particular, for any variable involved in the constraint,
+ * find the actual group id from before and replace the group
+ * of the corresponding variable by the minimal group of all
+ * the variables involved in the constraint considered so far
+ * (if this minimum is smaller) or replace the minimum by this group
+ * (if the minimum is larger).
+ *
+ * At the end, all the variables in "c" will (indirectly) point
+ * to the minimal of the groups that they referred to originally.
+ */
+static void update_groups(int dim, int *group, isl_int *c)
+{
+ int j;
+ int min = dim;
+
+ for (j = 0; j < dim; ++j) {
+ if (isl_int_is_zero(c[j]))
+ continue;
+ while (group[j] >= 0 && group[group[j]] != group[j])
+ group[j] = group[group[j]];
+ if (group[j] == min)
+ continue;
+ if (group[j] < min) {
+ if (min >= 0 && min < dim)
+ group[min] = group[j];
+ min = group[j];
+ } else
+ group[group[j]] = min;
+ }
+}
+
+/* Drop constraints from "context" that are irrelevant for computing
+ * the gist of "bset".
+ *
+ * In particular, drop constraints in variables that are not related
+ * to any of the variables involved in the constraints of "bset"
+ * in the sense that there is no sequence of constraints that connects them.
+ *
+ * We construct groups of variables that collect variables that
+ * (indirectly) appear in some common constraint of "context".
+ * Each group is identified by the first variable in the group,
+ * except for the special group of variables that appear in "bset"
+ * (or are related to those variables), which is identified by -1.
+ * If group[i] is equal to i (or -1), then the group of i is i (or -1),
+ * otherwise the group of i is the group of group[i].
+ *
+ * We first initialize the -1 group with the variables that appear in "bset".
+ * Then we initialize groups for the remaining variables.
+ * Then we iterate over the constraints of "context" and update the
+ * group of the variables in the constraint by the smallest group.
+ * Finally, we resolve indirect references to groups by running over
+ * the variables.
+ *
+ * After computing the groups, we drop constraints that do not involve
+ * any variables in the -1 group.
+ */
+static __isl_give isl_basic_set *drop_irrelevant_constraints(
+ __isl_take isl_basic_set *context, __isl_keep isl_basic_set *bset)
+{
+ isl_ctx *ctx;
+ int *group;
+ int dim;
+ int i, j;
+ int last;
+
+ if (!context || !bset)
+ return isl_basic_set_free(context);
+
+ dim = isl_basic_set_dim(bset, isl_dim_set);
+ ctx = isl_basic_set_get_ctx(bset);
+ group = isl_calloc_array(ctx, int, dim);
+
+ if (!group)
+ goto error;
+
+ for (i = 0; i < dim; ++i) {
+ for (j = 0; j < bset->n_eq; ++j)
+ if (!isl_int_is_zero(bset->eq[j][1 + i]))
+ break;
+ if (j < bset->n_eq) {
+ group[i] = -1;
+ continue;
+ }
+ for (j = 0; j < bset->n_ineq; ++j)
+ if (!isl_int_is_zero(bset->ineq[j][1 + i]))
+ break;
+ if (j < bset->n_ineq)
+ group[i] = -1;
+ }
+
+ last = -1;
+ for (i = 0; i < dim; ++i)
+ if (group[i] >= 0)
+ last = group[i] = i;
+ if (last < 0) {
+ free(group);
+ return context;
+ }
+
+ for (i = 0; i < context->n_eq; ++i)
+ update_groups(dim, group, context->eq[i] + 1);
+ for (i = 0; i < context->n_ineq; ++i)
+ update_groups(dim, group, context->ineq[i] + 1);
+
+ for (i = 0; i < dim; ++i)
+ if (group[i] >= 0)
+ group[i] = group[group[i]];
+
+ for (i = 0; i < dim; ++i)
+ group[i] = group[i] == -1;
+
+ context = drop_unrelated_constraints(context, group);
+
+ free(group);
+ return context;
+error:
+ free(group);
+ return isl_basic_set_free(context);
+}
+
/* Remove all information from bset that is redundant in the context
* of context. Both bset and context are assumed to be full-dimensional.
*
- * We first * remove the inequalities from "bset"
+ * We first remove the inequalities from "bset"
* that are obviously redundant with respect to some inequality in "context".
+ * Then we remove those constraints from "context" that have become
+ * irrelevant for computing the gist of "bset".
+ * Note that this removal of constraints cannot be replaced by
+ * a factorization because factors in "bset" may still be connected
+ * to each other through constraints in "context".
*
* If there are any inequalities left, we construct a tableau for
* the context and then add the inequalities of "bset".
if (bset->n_ineq == 0)
goto done;
+ context = drop_irrelevant_constraints(context, bset);
+ if (!context)
+ goto error;
+ if (isl_basic_set_is_universe(context)) {
+ isl_basic_set_free(context);
+ return bset;
+ }
+
context_ineq = context->n_ineq;
combined = isl_basic_set_cow(isl_basic_set_copy(context));
combined = isl_basic_set_extend_constraints(combined, 0, bset->n_ineq);
* redundant in the context of the equalities and inequalities of
* context are removed.
*
+ * First of all, we drop those constraints from "context"
+ * that are irrelevant for computing the gist of "bset".
+ * Alternatively, we could factorize the intersection of "context" and "bset".
+ *
* We first compute the integer affine hull of the intersection,
* compute the gist inside this affine hull and then add back
* those equalities that are not implied by the context.
if (!bset || !context)
goto error;
+ context = drop_irrelevant_constraints(context, bset);
+
bset = isl_basic_set_intersect(bset, isl_basic_set_copy(context));
if (isl_basic_set_plain_is_empty(bset)) {
isl_basic_set_free(context);
goto error;;
isl_assert(map->ctx, isl_space_is_equal(map->dim, context->dim), goto error);
map = isl_map_compute_divs(map);
+ if (!map)
+ goto error;
for (i = 0; i < map->n; ++i)
context = isl_basic_map_align_divs(context, map->p[i]);
for (i = map->n - 1; i >= 0; --i) {
return NULL;
}
+/* Return a map that has the same intersection with "context" as "map"
+ * and that as "simple" as possible.
+ *
+ * If "map" is already the universe, then we cannot make it any simpler.
+ * Similarly, if "context" is the universe, then we cannot exploit it
+ * to simplify "map"
+ * If "map" and "context" are identical to each other, then we can
+ * return the corresponding universe.
+ *
+ * If none of these cases apply, we have to work a bit harder.
+ */
static __isl_give isl_map *map_gist(__isl_take isl_map *map,
__isl_take isl_map *context)
{
+ int equal;
+ int is_universe;
+
+ is_universe = isl_map_plain_is_universe(map);
+ if (is_universe >= 0 && !is_universe)
+ is_universe = isl_map_plain_is_universe(context);
+ if (is_universe < 0)
+ goto error;
+ if (is_universe) {
+ isl_map_free(context);
+ return map;
+ }
+
+ equal = isl_map_plain_is_equal(map, context);
+ if (equal < 0)
+ goto error;
+ if (equal) {
+ isl_map *res = isl_map_universe(isl_map_get_space(map));
+ isl_map_free(map);
+ isl_map_free(context);
+ return res;
+ }
+
context = isl_map_compute_divs(context);
return isl_map_gist_basic_map(map, isl_map_simple_hull(context));
+error:
+ isl_map_free(map);
+ isl_map_free(context);
+ return NULL;
}
__isl_give isl_map *isl_map_gist(__isl_take isl_map *map,
(struct isl_basic_map *)bset2);
}
+/* Are "map1" and "map2" obviously disjoint?
+ *
+ * If one of them is empty or if they live in different spaces (ignoring
+ * parameters), then they are clearly disjoint.
+ *
+ * If they have different parameters, then we skip any further tests.
+ *
+ * If they are obviously equal, but not obviously empty, then we will
+ * not be able to detect if they are disjoint.
+ *
+ * Otherwise we check if each basic map in "map1" is obviously disjoint
+ * from each basic map in "map2".
+ */
int isl_map_plain_is_disjoint(__isl_keep isl_map *map1,
__isl_keep isl_map *map2)
{
int i, j;
+ int disjoint;
+ int intersect;
+ int match;
if (!map1 || !map2)
return -1;
- if (isl_map_plain_is_equal(map1, map2))
- return 0;
+ disjoint = isl_map_plain_is_empty(map1);
+ if (disjoint < 0 || disjoint)
+ return disjoint;
+
+ disjoint = isl_map_plain_is_empty(map2);
+ if (disjoint < 0 || disjoint)
+ return disjoint;
+
+ match = isl_space_tuple_match(map1->dim, isl_dim_in,
+ map2->dim, isl_dim_in);
+ if (match < 0 || !match)
+ return match < 0 ? -1 : 1;
+
+ match = isl_space_tuple_match(map1->dim, isl_dim_out,
+ map2->dim, isl_dim_out);
+ if (match < 0 || !match)
+ return match < 0 ? -1 : 1;
+
+ match = isl_space_match(map1->dim, isl_dim_param,
+ map2->dim, isl_dim_param);
+ if (match < 0 || !match)
+ return match < 0 ? -1 : 0;
+
+ intersect = isl_map_plain_is_equal(map1, map2);
+ if (intersect < 0 || intersect)
+ return intersect < 0 ? -1 : 0;
for (i = 0; i < map1->n; ++i) {
for (j = 0; j < map2->n; ++j) {
return 1;
}
+/* Are "map1" and "map2" disjoint?
+ *
+ * They are disjoint if they are "obviously disjoint" or if one of them
+ * is empty. Otherwise, they are not disjoint if one of them is universal.
+ * If none of these cases apply, we compute the intersection and see if
+ * the result is empty.
+ */
+int isl_map_is_disjoint(__isl_keep isl_map *map1, __isl_keep isl_map *map2)
+{
+ int disjoint;
+ int intersect;
+ isl_map *test;
+
+ disjoint = isl_map_plain_is_disjoint(map1, map2);
+ if (disjoint < 0 || disjoint)
+ return disjoint;
+
+ disjoint = isl_map_is_empty(map1);
+ if (disjoint < 0 || disjoint)
+ return disjoint;
+
+ disjoint = isl_map_is_empty(map2);
+ if (disjoint < 0 || disjoint)
+ return disjoint;
+
+ intersect = isl_map_plain_is_universe(map1);
+ if (intersect < 0 || intersect)
+ return intersect < 0 ? -1 : 0;
+
+ intersect = isl_map_plain_is_universe(map2);
+ if (intersect < 0 || intersect)
+ return intersect < 0 ? -1 : 0;
+
+ test = isl_map_intersect(isl_map_copy(map1), isl_map_copy(map2));
+ disjoint = isl_map_is_empty(test);
+ isl_map_free(test);
+
+ return disjoint;
+}
+
int isl_set_plain_is_disjoint(__isl_keep isl_set *set1,
__isl_keep isl_set *set2)
{
(struct isl_map *)set2);
}
+/* Are "set1" and "set2" disjoint?
+ */
+int isl_set_is_disjoint(__isl_keep isl_set *set1, __isl_keep isl_set *set2)
+{
+ return isl_map_is_disjoint(set1, set2);
+}
+
int isl_set_fast_is_disjoint(__isl_keep isl_set *set1, __isl_keep isl_set *set2)
{
return isl_set_plain_is_disjoint(set1, set2);