| blob | b238aa5e8379b3ac3c0d5e2786bcd28320a9ebcf |
1 /*
2 * Copyright 2008-2009 Katholieke Universiteit Leuven
3 * Copyright 2012-2013 Ecole Normale Superieure
4 * Copyright 2014-2015 INRIA Rocquencourt
5 * Copyright 2016 Sven Verdoolaege
6 *
7 * Use of this software is governed by the MIT license
8 *
9 * Written by Sven Verdoolaege, K.U.Leuven, Departement
10 * Computerwetenschappen, Celestijnenlaan 200A, B-3001 Leuven, Belgium
11 * and Ecole Normale Superieure, 45 rue d’Ulm, 75230 Paris, France
12 * and Inria Paris - Rocquencourt, Domaine de Voluceau - Rocquencourt,
13 * B.P. 105 - 78153 Le Chesnay, France
14 */
16 #include <isl_ctx_private.h>
17 #include <isl_map_private.h>
19 #include <isl/map.h>
20 #include <isl_seq.h>
22 #include <isl_space_private.h>
23 #include <isl_mat_private.h>
24 #include <isl_vec_private.h>
26 #include <bset_to_bmap.c>
27 #include <bset_from_bmap.c>
28 #include <set_to_map.c>
29 #include <set_from_map.c>
32 {
36 }
39 {
44 }
45 }
48 {
51 }
53 /* Drop n dimensions starting at first.
54 *
55 * In principle, this frees up some extra variables as the number
56 * of columns remains constant, but we would have to extend
57 * the div array too as the number of rows in this array is assumed
58 * to be equal to extra.
59 */
62 {
96 error:
99 }
103 {
124 }
128 error:
131 }
133 /* Move "n" divs starting at "first" to the end of the list of divs.
134 */
137 {
155 error:
158 }
160 /* Drop "n" dimensions of type "type" starting at "first".
161 *
162 * In principle, this frees up some extra variables as the number
163 * of columns remains constant, but we would have to extend
164 * the div array too as the number of rows in this array is assumed
165 * to be equal to extra.
166 */
169 {
213 error:
216 }
220 {
223 }
227 {
229 }
233 {
254 }
258 error:
261 }
265 {
267 }
271 {
273 }
275 /*
276 * We don't cow, as the div is assumed to be redundant.
277 */
280 {
299 }
301 }
314 }
320 error:
323 }
327 {
329 isl_int gcd;
342 }
345 }
353 }
355 }
363 }
366 }
373 }
377 }
381 {
384 }
386 /* Reduce the coefficient of the variable at position "pos"
387 * in integer division "div", such that it lies in the half-open
388 * interval (1/2,1/2], extracting any excess value from this integer division.
389 * "pos" is as determined by isl_basic_map_offset, i.e., pos == 0
390 * corresponds to the constant term.
391 *
392 * That is, the integer division is of the form
393 *
394 * floor((... + (c * d + r) * x_pos + ...)/d)
395 *
396 * with -d < 2 * r <= d.
397 * Replace it by
398 *
399 * floor((... + r * x_pos + ...)/d) + c * x_pos
400 *
401 * If 2 * ((c * d + r) % d) <= d, then c = floor((c * d + r)/d).
402 * Otherwise, c = floor((c * d + r)/d) + 1.
403 *
404 * This is the same normalization that is performed by isl_aff_floor.
405 */
408 {
409 isl_int shift;
424 }
426 /* Does the coefficient of the variable at position "pos"
427 * in integer division "div" need to be reduced?
428 * That is, does it lie outside the half-open interval (1/2,1/2]?
429 * The coefficient c/d lies outside this interval if abs(2 * c) >= d and
430 * 2 * c != d.
431 */
434 {
435 isl_bool r;
447 }
449 /* Reduce the coefficients (including the constant term) of
450 * integer division "div", if needed.
451 * In particular, make sure all coefficients lie in
452 * the half-open interval (1/2,1/2].
453 */
456 {
461 isl_bool reduce;
471 }
474 }
476 /* Reduce the coefficients (including the constant term) of
477 * the known integer divisions, if needed
478 * In particular, make sure all coefficients lie in
479 * the half-open interval (1/2,1/2].
480 */
483 {
497 }
500 }
502 /* Remove any common factor in numerator and denominator of the div expression,
503 * not taking into account the constant term.
504 * That is, if the div is of the form
505 *
506 * floor((a + m f(x))/(m d))
507 *
508 * then replace it by
509 *
510 * floor((floor(a/m) + f(x))/d)
511 *
512 * The difference {a/m}/d in the argument satisfies 0 <= {a/m}/d < 1/d
513 * and can therefore not influence the result of the floor.
514 */
516 {
532 }
534 /* Remove any common factor in numerator and denominator of a div expression,
535 * not taking into account the constant term.
536 * That is, look for any div of the form
537 *
538 * floor((a + m f(x))/(m d))
539 *
540 * and replace it by
541 *
542 * floor((floor(a/m) + f(x))/d)
543 *
544 * The difference {a/m}/d in the argument satisfies 0 <= {a/m}/d < 1/d
545 * and can therefore not influence the result of the floor.
546 */
549 {
561 }
563 /* Assumes divs have been ordered if keep_divs is set.
564 */
567 {
585 }
595 }
604 /* We need to be careful about circular definitions,
605 * so for now we just remove the definition of div k
606 * if the equality contains any divs.
607 * If keep_divs is set, then the divs have been ordered
608 * and we can keep the definition as long as the result
609 * is still ordered.
610 */
618 }
619 }
621 /* Assumes divs have been ordered if keep_divs is set.
622 */
625 {
633 }
635 /* Check if elimination of div "div" using equality "eq" would not
636 * result in a div depending on a later div.
637 */
640 {
655 }
658 }
660 /* Eliminate divs based on equalities
661 */
664 {
679 isl_bool ok;
695 }
696 }
700 }
702 /* Elimininate divs based on inequalities
703 */
706 {
736 }
738 }
740 /* Does the equality constraint at position "eq" in "bmap" involve
741 * any local variables in the range [first, first + n)
742 * that are not marked as having an explicit representation?
743 */
746 {
755 isl_bool unknown;
764 }
767 }
769 /* The last local variable involved in the equality constraint
770 * at position "eq" in "bmap" is the local variable at position "div".
771 * It can therefore be used to extract an explicit representation
772 * for that variable.
773 * Do so unless the local variable already has an explicit representation or
774 * the explicit representation would involve any other local variables
775 * that in turn do not have an explicit representation.
776 * An equality constraint involving local variables without an explicit
777 * representation can be used in isl_basic_map_drop_redundant_divs
778 * to separate out an independent local variable. Introducing
779 * an explicit representation here would block this transformation,
780 * while the partial explicit representation in itself is not very useful.
781 * Set *progress if anything is changed.
782 *
783 * The equality constraint is of the form
784 *
785 * f(x) + n e >= 0
786 *
787 * with n a positive number. The explicit representation derived from
788 * this constraint is
789 *
790 * floor((-f(x))/n)
791 */
794 {
796 isl_bool involves;
820 }
824 {
847 }
856 progress);
863 }
870 }
873 }
877 {
879 progress));
880 }
884 {
890 }
892 }
894 /* Hash table of inequalities in a basic map.
895 * "index" is an array of addresses of inequalities in the basic map, some
896 * of which are NULL. The inequalities are hashed on the coefficients
897 * except the constant term.
898 * "size" is the number of elements in the array and is always a power of two
899 * "bits" is the number of bits need to represent an index into the array.
900 * "total" is the total dimension of the basic map.
901 */
907 };
909 /* Fill in the "ci" data structure for holding the inequalities of "bmap".
910 */
913 {
930 }
932 /* Free the memory allocated by create_constraint_index.
933 */
935 {
937 }
939 /* Return the position in ci->index that contains the address of
940 * an inequality that is equal to *ineq up to the constant term,
941 * provided this address is not identical to "ineq".
942 * If there is no such inequality, then return the position where
943 * such an inequality should be inserted.
944 */
946 {
954 }
956 /* Return the position in ci->index that contains the address of
957 * an inequality that is equal to the k'th inequality of "bmap"
958 * up to the constant term, provided it does not point to the very
959 * same inequality.
960 * If there is no such inequality, then return the position where
961 * such an inequality should be inserted.
962 */
965 {
967 }
971 {
973 }
975 /* Fill in the "ci" data structure with the inequalities of "bset".
976 */
979 {
988 }
991 }
993 /* Is the inequality ineq (obviously) redundant with respect
994 * to the constraints in "ci"?
995 *
996 * Look for an inequality in "ci" with the same coefficients and then
997 * check if the contant term of "ineq" is greater than or equal
998 * to the constant term of that inequality. If so, "ineq" is clearly
999 * redundant.
1000 *
1001 * Note that hash_index_ineq ignores a stored constraint if it has
1002 * the same address as the passed inequality. It is ok to pass
1003 * the address of a local variable here since it will never be
1004 * the same as the address of a constraint in "ci".
1005 */
1008 {
1015 }
1017 /* If we can eliminate more than one div, then we need to make
1018 * sure we do it from last div to first div, in order not to
1019 * change the position of the other divs that still need to
1020 * be removed.
1021 */
1024 {
1078 }
1080 }
1092 }
1095 out:
1099 }
1102 {
1114 }
1116 }
1118 /* Normalize divs that appear in equalities.
1119 *
1120 * In particular, we assume that bmap contains some equalities
1121 * of the form
1122 *
1123 * a x = m * e_i
1124 *
1125 * and we want to replace the set of e_i by a minimal set and
1126 * such that the new e_i have a canonical representation in terms
1127 * of the vector x.
1128 * If any of the equalities involves more than one divs, then
1129 * we currently simply bail out.
1130 *
1131 * Let us first additionally assume that all equalities involve
1132 * a div. The equalities then express modulo constraints on the
1133 * remaining variables and we can use "parameter compression"
1134 * to find a minimal set of constraints. The result is a transformation
1135 *
1136 * x = T(x') = x_0 + G x'
1137 *
1138 * with G a lower-triangular matrix with all elements below the diagonal
1139 * non-negative and smaller than the diagonal element on the same row.
1140 * We first normalize x_0 by making the same property hold in the affine
1141 * T matrix.
1142 * The rows i of G with a 1 on the diagonal do not impose any modulo
1143 * constraint and simply express x_i = x'_i.
1144 * For each of the remaining rows i, we introduce a div and a corresponding
1145 * equality. In particular
1146 *
1147 * g_ii e_j = x_i - g_i(x')
1148 *
1149 * where each x'_k is replaced either by x_k (if g_kk = 1) or the
1150 * corresponding div (if g_kk != 1).
1151 *
1152 * If there are any equalities not involving any div, then we
1153 * first apply a variable compression on the variables x:
1154 *
1155 * x = C x'' x'' = C_2 x
1156 *
1157 * and perform the above parameter compression on A C instead of on A.
1158 * The resulting compression is then of the form
1159 *
1160 * x'' = T(x') = x_0 + G x'
1161 *
1162 * and in constructing the new divs and the corresponding equalities,
1163 * we have to replace each x'', i.e., the x'_k with (g_kk = 1),
1164 * by the corresponding row from C_2.
1165 */
1168 {
1177 isl_int v;
1209 }
1210 }
1219 }
1225 }
1235 }
1242 }
1247 /* We have to be careful because dropping equalities may reorder them */
1257 }
1258 }
1264 else
1265 needed++;
1266 }
1272 }
1282 else
1290 else
1293 }
1297 }
1304 done:
1308 error:
1314 }
1318 {
1328 }
1330 /* Check whether it is ok to define a div based on an inequality.
1331 * To avoid the introduction of circular definitions of divs, we
1332 * do not allow such a definition if the resulting expression would refer to
1333 * any other undefined divs or if any known div is defined in
1334 * terms of the unknown div.
1335 */
1338 {
1342 /* Not defined in terms of unknown divs */
1350 }
1352 /* No other div defined in terms of this one => avoid loops */
1360 }
1363 }
1365 /* Would an expression for div "div" based on inequality "ineq" of "bmap"
1366 * be a better expression than the current one?
1367 *
1368 * If we do not have any expression yet, then any expression would be better.
1369 * Otherwise we check if the last variable involved in the inequality
1370 * (disregarding the div that it would define) is in an earlier position
1371 * than the last variable involved in the current div expression.
1372 */
1375 {
1392 }
1394 /* Given two constraints "k" and "l" that are opposite to each other,
1395 * except for the constant term, check if we can use them
1396 * to obtain an expression for one of the hitherto unknown divs or
1397 * a "better" expression for a div for which we already have an expression.
1398 * "sum" is the sum of the constant terms of the constraints.
1399 * If this sum is strictly smaller than the coefficient of one
1400 * of the divs, then this pair can be used define the div.
1401 * To avoid the introduction of circular definitions of divs, we
1402 * do not use the pair if the resulting expression would refer to
1403 * any other undefined divs or if any known div is defined in
1404 * terms of the unknown div.
1405 */
1408 {
1413 isl_bool set_div;
1428 else
1433 }
1435 }
1439 {
1443 isl_int sum;
1458 }
1466 }
1481 }
1483 /* We need to break out of the loop after these
1484 * changes since the contents of the hash
1485 * will no longer be valid.
1486 * Plus, we probably we want to regauss first.
1487 */
1495 }
1500 }
1502 /* Detect all pairs of inequalities that form an equality.
1503 *
1504 * isl_basic_map_remove_duplicate_constraints detects at most one such pair.
1505 * Call it repeatedly while it is making progress.
1506 */
1509 {
1521 }
1523 /* Eliminate knowns divs from constraints where they appear with
1524 * a (positive or negative) unit coefficient.
1525 *
1526 * That is, replace
1527 *
1528 * floor(e/m) + f >= 0
1529 *
1530 * by
1531 *
1532 * e + m f >= 0
1533 *
1534 * and
1535 *
1536 * -floor(e/m) + f >= 0
1537 *
1538 * by
1539 *
1540 * -e + m f + m - 1 >= 0
1541 *
1542 * The first conversion is valid because floor(e/m) >= -f is equivalent
1543 * to e/m >= -f because -f is an integral expression.
1544 * The second conversion follows from the fact that
1545 *
1546 * -floor(e/m) = ceil(-e/m) = floor((-e + m - 1)/m)
1547 *
1548 *
1549 * Note that one of the div constraints may have been eliminated
1550 * due to being redundant with respect to the constraint that is
1551 * being modified by this function. The modified constraint may
1552 * no longer imply this div constraint, so we add it back to make
1553 * sure we do not lose any information.
1554 *
1555 * We skip integral divs, i.e., those with denominator 1, as we would
1556 * risk eliminating the div from the div constraints. We do not need
1557 * to handle those divs here anyway since the div constraints will turn
1558 * out to form an equality and this equality can then be used to eliminate
1559 * the div from all constraints.
1560 */
1563 {
1595 else
1605 }
1610 }
1611 }
1614 }
1617 {
1622 isl_bool empty;
1638 /* requires equalities in normal form */
1644 }
1646 }
1649 {
1651 }
1656 {
1688 }
1692 {
1694 }
1697 /* If the only constraints a div d=floor(f/m)
1698 * appears in are its two defining constraints
1699 *
1700 * f - m d >=0
1701 * -(f - (m - 1)) + m d >= 0
1702 *
1703 * then it can safely be removed.
1704 */
1706 {
1715 isl_bool red;
1722 }
1729 }
1732 }
1734 /*
1735 * Remove divs that don't occur in any of the constraints or other divs.
1736 * These can arise when dropping constraints from a basic map or
1737 * when the divs of a basic map have been temporarily aligned
1738 * with the divs of another basic map.
1739 */
1741 {
1748 isl_bool redundant;
1756 }
1758 }
1760 /* Mark "bmap" as final, without checking for obviously redundant
1761 * integer divisions. This function should be used when "bmap"
1762 * is known not to involve any such integer divisions.
1763 */
1766 {
1771 }
1773 /* Mark "bmap" as final, after removing obviously redundant integer divisions.
1774 */
1776 {
1780 }
1783 {
1785 }
1788 {
1797 }
1799 error:
1802 }
1805 {
1814 }
1817 error:
1820 }
1823 /* Remove definition of any div that is defined in terms of the given variable.
1824 * The div itself is not removed. Functions such as
1825 * eliminate_divs_ineq depend on the other divs remaining in place.
1826 */
1829 {
1843 }
1845 }
1847 /* Eliminate the specified variables from the constraints using
1848 * Fourier-Motzkin. The variables themselves are not removed.
1849 */
1852 {
1884 }
1891 n_lower++;
1893 n_upper++;
1894 }
1918 }
1921 }
1933 }
1934 }
1939 error:
1942 }
1946 {
1949 }
1951 /* Eliminate the specified n dimensions starting at first from the
1952 * constraints, without removing the dimensions from the space.
1953 * If the set is rational, the dimensions are eliminated using Fourier-Motzkin.
1954 * Otherwise, they are projected out and the original space is restored.
1955 */
1959 {
1975 }
1982 error:
1985 }
1990 {
1992 }
1994 /* Remove all constraints from "bmap" that reference any unknown local
1995 * variables (directly or indirectly).
1996 *
1997 * Dropping all constraints on a local variable will make it redundant,
1998 * so it will get removed implicitly by
1999 * isl_basic_map_drop_constraints_involving_dims. Some other local
2000 * variables may also end up becoming redundant if they only appear
2001 * in constraints together with the unknown local variable.
2002 * Therefore, start over after calling
2003 * isl_basic_map_drop_constraints_involving_dims.
2004 */
2007 {
2008 isl_bool known;
2033 }
2036 }
2038 /* Remove all constraints from "map" that reference any unknown local
2039 * variables (directly or indirectly).
2040 *
2041 * Since constraints may get dropped from the basic maps,
2042 * they may no longer be disjoint from each other.
2043 */
2046 {
2048 isl_bool known;
2066 }
2072 }
2074 /* Don't assume equalities are in order, because align_divs
2075 * may have changed the order of the divs.
2076 */
2078 {
2091 }
2092 }
2093 }
2096 {
2098 }
2102 {
2116 }
2118 }
2120 }
2124 {
2127 }
2131 {
2141 }
2162 error:
2166 }
2168 /* For each inequality in "ineq" that is a shifted (more relaxed)
2169 * copy of an inequality in "context", mark the corresponding entry
2170 * in "row" with -1.
2171 * If an inequality only has a non-negative constant term, then
2172 * mark it as well.
2173 */
2176 {
2193 isl_bool redundant;
2199 }
2206 }
2209 error:
2212 }
2216 {
2229 isl_bool redundant;
2241 }
2244 error:
2247 }
2249 /* Remove constraints from "bmap" that are identical to constraints
2250 * in "context" or that are more relaxed (greater constant term).
2251 *
2252 * We perform the test for shifted copies on the pure constraints
2253 * in remove_shifted_constraints.
2254 */
2257 {
2266 }
2279 error:
2283 }
2285 /* Does the (linear part of a) constraint "c" involve any of the "len"
2286 * "relevant" dimensions?
2287 */
2289 {
2297 }
2300 }
2302 /* Drop constraints from "bmap" that do not involve any of
2303 * the dimensions marked "relevant".
2304 */
2307 {
2322 }
2329 }
2332 }
2334 /* Update the groups in "group" based on the (linear part of a) constraint "c".
2335 *
2336 * In particular, for any variable involved in the constraint,
2337 * find the actual group id from before and replace the group
2338 * of the corresponding variable by the minimal group of all
2339 * the variables involved in the constraint considered so far
2340 * (if this minimum is smaller) or replace the minimum by this group
2341 * (if the minimum is larger).
2342 *
2343 * At the end, all the variables in "c" will (indirectly) point
2344 * to the minimal of the groups that they referred to originally.
2345 */
2347 {
2364 }
2365 }
2367 /* Allocate an array of groups of variables, one for each variable
2368 * in "context", initialized to zero.
2369 */
2371 {
2378 }
2380 /* Drop constraints from "bmap" that only involve variables that are
2381 * not related to any of the variables marked with a "-1" in "group".
2382 *
2383 * We construct groups of variables that collect variables that
2384 * (indirectly) appear in some common constraint of "bmap".
2385 * Each group is identified by the first variable in the group,
2386 * except for the special group of variables that was already identified
2387 * in the input as -1 (or are related to those variables).
2388 * If group[i] is equal to i (or -1), then the group of i is i (or -1),
2389 * otherwise the group of i is the group of group[i].
2390 *
2391 * We first initialize groups for the remaining variables.
2392 * Then we iterate over the constraints of "bmap" and update the
2393 * group of the variables in the constraint by the smallest group.
2394 * Finally, we resolve indirect references to groups by running over
2395 * the variables.
2396 *
2397 * After computing the groups, we drop constraints that do not involve
2398 * any variables in the -1 group.
2399 */
2402 {
2419 }
2437 }
2439 /* Drop constraints from "context" that are irrelevant for computing
2440 * the gist of "bset".
2441 *
2442 * In particular, drop constraints in variables that are not related
2443 * to any of the variables involved in the constraints of "bset"
2444 * in the sense that there is no sequence of constraints that connects them.
2445 *
2446 * We first mark all variables that appear in "bset" as belonging
2447 * to a "-1" group and then continue with group_and_drop_irrelevant_constraints.
2448 */
2451 {
2472 }
2478 }
2481 }
2483 /* Drop constraints from "context" that are irrelevant for computing
2484 * the gist of the inequalities "ineq".
2485 * Inequalities in "ineq" for which the corresponding element of row
2486 * is set to -1 have already been marked for removal and should be ignored.
2487 *
2488 * In particular, drop constraints in variables that are not related
2489 * to any of the variables involved in "ineq"
2490 * in the sense that there is no sequence of constraints that connects them.
2491 *
2492 * We first mark all variables that appear in "bset" as belonging
2493 * to a "-1" group and then continue with group_and_drop_irrelevant_constraints.
2494 */
2497 {
2518 }
2521 }
2524 }
2526 /* Do all "n" entries of "row" contain a negative value?
2527 */
2529 {
2537 }
2539 /* Update the inequalities in "bset" based on the information in "row"
2540 * and "tab".
2541 *
2542 * In particular, the array "row" contains either -1, meaning that
2543 * the corresponding inequality of "bset" is redundant, or the index
2544 * of an inequality in "tab".
2545 *
2546 * If the row entry is -1, then drop the inequality.
2547 * Otherwise, if the constraint is marked redundant in the tableau,
2548 * then drop the inequality. Similarly, if it is marked as an equality
2549 * in the tableau, then turn the inequality into an equality and
2550 * perform Gaussian elimination.
2551 */
2554 {
2571 }
2581 }
2582 }
2588 }
2590 /* Update the inequalities in "bset" based on the information in "row"
2591 * and "tab" and free all arguments (other than "bset").
2592 */
2597 {
2606 }
2608 /* Remove all information from bset that is redundant in the context
2609 * of context.
2610 * "ineq" contains the (possibly transformed) inequalities of "bset",
2611 * in the same order.
2612 * The (explicit) equalities of "bset" are assumed to have been taken
2613 * into account by the transformation such that only the inequalities
2614 * are relevant.
2615 * "context" is assumed not to be empty.
2616 *
2617 * "row" keeps track of the constraint index of a "bset" inequality in "tab".
2618 * A value of -1 means that the inequality is obviously redundant and may
2619 * not even appear in "tab".
2620 *
2621 * We first mark the inequalities of "bset"
2622 * that are obviously redundant with respect to some inequality in "context".
2623 * Then we remove those constraints from "context" that have become
2624 * irrelevant for computing the gist of "bset".
2625 * Note that this removal of constraints cannot be replaced by
2626 * a factorization because factors in "bset" may still be connected
2627 * to each other through constraints in "context".
2628 *
2629 * If there are any inequalities left, we construct a tableau for
2630 * the context and then add the inequalities of "bset".
2631 * Before adding these inequalities, we freeze all constraints such that
2632 * they won't be considered redundant in terms of the constraints of "bset".
2633 * Then we detect all redundant constraints (among the
2634 * constraints that weren't frozen), first by checking for redundancy in the
2635 * the tableau and then by checking if replacing a constraint by its negation
2636 * would lead to an empty set. This last step is fairly expensive
2637 * and could be optimized by more reuse of the tableau.
2638 * Finally, we update bset according to the results.
2639 */
2642 {
2657 }
2693 }
2717 }
2722 }
2726 error:
2734 }
2736 /* Extract the inequalities of "bset" as an isl_mat.
2737 */
2739 {
2753 }
2755 /* Remove all information from "bset" that is redundant in the context
2756 * of "context", for the case where both "bset" and "context" are
2757 * full-dimensional.
2758 */
2761 {
2766 }
2768 /* Remove all information from "bset" that is redundant in the context
2769 * of "context", for the case where the combined equalities of
2770 * "bset" and "context" allow for a compression that can be obtained
2771 * by preapplication of "T".
2772 *
2773 * "bset" itself is not transformed by "T". Instead, the inequalities
2774 * are extracted from "bset" and those are transformed by "T".
2775 * uset_gist_full then determines which of the transformed inequalities
2776 * are redundant with respect to the transformed "context" and removes
2777 * the corresponding inequalities from "bset".
2778 *
2779 * After preapplying "T" to the inequalities, any common factor is
2780 * removed from the coefficients. If this results in a tightening
2781 * of the constant term, then the same tightening is applied to
2782 * the corresponding untransformed inequality in "bset".
2783 * That is, if after plugging in T, a constraint f(x) >= 0 is of the form
2784 *
2785 * g f'(x) + r >= 0
2786 *
2787 * with 0 <= r < g, then it is equivalent to
2788 *
2789 * f'(x) >= 0
2790 *
2791 * This means that f(x) >= 0 is equivalent to f(x) - r >= 0 in the affine
2792 * subspace compressed by T since the latter would be transformed to
2793 *
2794 * g f'(x) >= 0
2795 */
2799 {
2803 isl_int rem;
2815 }
2838 }
2842 error:
2847 }
2849 /* Project "bset" onto the variables that are involved in "template".
2850 */
2853 {
2862 isl_bool involved;
2871 }
2874 }
2876 /* Remove all information from bset that is redundant in the context
2877 * of context. In particular, equalities that are linear combinations
2878 * of those in context are removed. Then the inequalities that are
2879 * redundant in the context of the equalities and inequalities of
2880 * context are removed.
2881 *
2882 * First of all, we drop those constraints from "context"
2883 * that are irrelevant for computing the gist of "bset".
2884 * Alternatively, we could factorize the intersection of "context" and "bset".
2885 *
2886 * We first compute the intersection of the integer affine hulls
2887 * of "bset" and "context",
2888 * compute the gist inside this intersection and then reduce
2889 * the constraints with respect to the equalities of the context
2890 * that only involve variables already involved in the input.
2891 *
2892 * If two constraints are mutually redundant, then uset_gist_full
2893 * will remove the second of those constraints. We therefore first
2894 * sort the constraints so that constraints not involving existentially
2895 * quantified variables are given precedence over those that do.
2896 * We have to perform this sorting before the variable compression,
2897 * because that may effect the order of the variables.
2898 */
2901 {
2926 }
2931 }
2941 }
2952 }
2955 error:
2959 }
2961 /* Return the number of equality constraints in "bmap" that involve
2962 * local variables. This function assumes that Gaussian elimination
2963 * has been applied to the equality constraints.
2964 */
2966 {
2986 }
2988 /* Construct a basic map in "space" defined by the equality constraints in "eq".
2989 * The constraints are assumed not to involve any local variables.
2990 */
2993 {
3011 }
3016 error:
3021 }
3023 /* Construct and return a variable compression based on the equality
3024 * constraints in "bmap1" and "bmap2" that do not involve the local variables.
3025 * "n1" is the number of (initial) equality constraints in "bmap1"
3026 * that do involve local variables.
3027 * "n2" is the number of (initial) equality constraints in "bmap2"
3028 * that do involve local variables.
3029 * "total" is the total number of other variables.
3030 * This function assumes that Gaussian elimination
3031 * has been applied to the equality constraints in both "bmap1" and "bmap2"
3032 * such that the equality constraints not involving local variables
3033 * are those that start at "n1" or "n2".
3034 *
3035 * If either of "bmap1" and "bmap2" does not have such equality constraints,
3036 * then simply compute the compression based on the equality constraints
3037 * in the other basic map.
3038 * Otherwise, combine the equality constraints from both into a new
3039 * basic map such that Gaussian elimination can be applied to this combination
3040 * and then construct a variable compression from the resulting
3041 * equality constraints.
3042 */
3046 {
3056 }
3061 }
3076 }
3078 /* Extract the stride constraints from "bmap", compressed
3079 * with respect to both the stride constraints in "context" and
3080 * the remaining equality constraints in both "bmap" and "context".
3081 * "bmap_n_eq" is the number of (initial) stride constraints in "bmap".
3082 * "context_n_eq" is the number of (initial) stride constraints in "context".
3083 *
3084 * Let x be all variables in "bmap" (and "context") other than the local
3085 * variables. First compute a variable compression
3086 *
3087 * x = V x'
3088 *
3089 * based on the non-stride equality constraints in "bmap" and "context".
3090 * Consider the stride constraints of "context",
3091 *
3092 * A(x) + B(y) = 0
3093 *
3094 * with y the local variables and plug in the variable compression,
3095 * resulting in
3096 *
3097 * A(V x') + B(y) = 0
3098 *
3099 * Use these constraints to compute a parameter compression on x'
3100 *
3101 * x' = T x''
3102 *
3103 * Now consider the stride constraints of "bmap"
3104 *
3105 * C(x) + D(y) = 0
3106 *
3107 * and plug in x = V*T x''.
3108 * That is, return A = [C*V*T D].
3109 */
3113 {
3142 }
3144 /* Remove the prime factors from *g that have an exponent that
3145 * is strictly smaller than the exponent in "c".
3146 * All exponents in *g are known to be smaller than or equal
3147 * to those in "c".
3148 *
3149 * That is, if *g is equal to
3150 *
3151 * p_1^{e_1} p_2^{e_2} ... p_n^{e_n}
3152 *
3153 * and "c" is equal to
3154 *
3155 * p_1^{f_1} p_2^{f_2} ... p_n^{f_n}
3156 *
3157 * then update *g to
3158 *
3159 * p_1^{e_1 * (e_1 = f_1)} p_2^{e_2 * (e_2 = f_2)} ...
3160 * p_n^{e_n * (e_n = f_n)}
3161 *
3162 * If e_i = f_i, then c / *g does not have any p_i factors and therefore
3163 * neither does the gcd of *g and c / *g.
3164 * If e_i < f_i, then the gcd of *g and c / *g has a positive
3165 * power min(e_i, s_i) of p_i with s_i = f_i - e_i among its factors.
3166 * Dividing *g by this gcd therefore strictly reduces the exponent
3167 * of the prime factors that need to be removed, while leaving the
3168 * other prime factors untouched.
3169 * Repeating this process until gcd(*g, c / *g) = 1 therefore
3170 * removes all undesired factors, without removing any others.
3171 */
3173 {
3174 isl_int t;
3183 }
3185 }
3187 /* Reduce the "n" stride constraints in "bmap" based on a copy "A"
3188 * of the same stride constraints in a compressed space that exploits
3189 * all equalities in the context and the other equalities in "bmap".
3190 *
3191 * If the stride constraints of "bmap" are of the form
3192 *
3193 * C(x) + D(y) = 0
3194 *
3195 * then A is of the form
3196 *
3197 * B(x') + D(y) = 0
3198 *
3199 * If any of these constraints involves only a single local variable y,
3200 * then the constraint appears as
3201 *
3202 * f(x) + m y_i = 0
3203 *
3204 * in "bmap" and as
3205 *
3206 * h(x') + m y_i = 0
3207 *
3208 * in "A".
3209 *
3210 * Let g be the gcd of m and the coefficients of h.
3211 * Then, in particular, g is a divisor of the coefficients of h and
3212 *
3213 * f(x) = h(x')
3214 *
3215 * is known to be a multiple of g.
3216 * If some prime factor in m appears with the same exponent in g,
3217 * then it can be removed from m because f(x) is already known
3218 * to be a multiple of g and therefore in particular of this power
3219 * of the prime factors.
3220 * Prime factors that appear with a smaller exponent in g cannot
3221 * be removed from m.
3222 * Let g' be the divisor of g containing all prime factors that
3223 * appear with the same exponent in m and g, then
3224 *
3225 * f(x) + m y_i = 0
3226 *
3227 * can be replaced by
3228 *
3229 * f(x) + m/g' y_i' = 0
3230 *
3231 * Note that (if g' != 1) this changes the explicit representation
3232 * of y_i to that of y_i', so the integer division at position i
3233 * is marked unknown and later recomputed by a call to
3234 * isl_basic_map_gauss.
3235 */
3238 {
3242 isl_int gcd;
3276 }
3283 error:
3287 }
3289 /* Simplify the stride constraints in "bmap" based on
3290 * the remaining equality constraints in "bmap" and all equality
3291 * constraints in "context".
3292 * Only do this if both "bmap" and "context" have stride constraints.
3293 *
3294 * First extract a copy of the stride constraints in "bmap" in a compressed
3295 * space exploiting all the other equality constraints and then
3296 * use this compressed copy to simplify the original stride constraints.
3297 */
3300 {
3322 }
3324 /* Return a basic map that has the same intersection with "context" as "bmap"
3325 * and that is as "simple" as possible.
3326 *
3327 * The core computation is performed on the pure constraints.
3328 * When we add back the meaning of the integer divisions, we need
3329 * to (re)introduce the div constraints. If we happen to have
3330 * discovered that some of these integer divisions are equal to
3331 * some affine combination of other variables, then these div
3332 * constraints may end up getting simplified in terms of the equalities,
3333 * resulting in extra inequalities on the other variables that
3334 * may have been removed already or that may not even have been
3335 * part of the input. We try and remove those constraints of
3336 * this form that are most obviously redundant with respect to
3337 * the context. We also remove those div constraints that are
3338 * redundant with respect to the other constraints in the result.
3339 *
3340 * The stride constraints among the equality constraints in "bmap" are
3341 * also simplified with respecting to the other equality constraints
3342 * in "bmap" and with respect to all equality constraints in "context".
3343 */
3346 {
3357 }
3363 }
3367 }
3389 }
3408 error:
3412 }
3414 /*
3415 * Assumes context has no implicit divs.
3416 */
3419 {
3430 }
3450 }
3451 }
3455 error:
3459 }
3461 /* Drop all inequalities from "bmap" that also appear in "context".
3462 * "context" is assumed to have only known local variables and
3463 * the initial local variables of "bmap" are assumed to be the same
3464 * as those of "context".
3465 * The constraints of both "bmap" and "context" are assumed
3466 * to have been sorted using isl_basic_map_sort_constraints.
3467 *
3468 * Run through the inequality constraints of "bmap" and "context"
3469 * in sorted order.
3470 * If a constraint of "bmap" involves variables not in "context",
3471 * then it cannot appear in "context".
3472 * If a matching constraint is found, it is removed from "bmap".
3473 */
3476 {
3495 }
3501 }
3505 }
3510 }
3513 }
3516 }
3518 /* Drop all equalities from "bmap" that also appear in "context".
3519 * "context" is assumed to have only known local variables and
3520 * the initial local variables of "bmap" are assumed to be the same
3521 * as those of "context".
3522 *
3523 * Run through the equality constraints of "bmap" and "context"
3524 * in sorted order.
3525 * If a constraint of "bmap" involves variables not in "context",
3526 * then it cannot appear in "context".
3527 * If a matching constraint is found, it is removed from "bmap".
3528 */
3531 {
3555 }
3559 }
3564 }
3567 }
3570 }
3572 /* Remove the constraints in "context" from "bmap".
3573 * "context" is assumed to have explicit representations
3574 * for all local variables.
3575 *
3576 * First align the divs of "bmap" to those of "context" and
3577 * sort the constraints. Then drop all constraints from "bmap"
3578 * that appear in "context".
3579 */
3582 {
3597 }
3616 error:
3620 }
3622 /* Replace "map" by the disjunct at position "pos" and free "context".
3623 */
3626 {
3633 }
3635 /* Remove the constraints in "context" from "map".
3636 * If any of the disjuncts in the result turns out to be the universe,
3637 * then return this universe.
3638 * "context" is assumed to have explicit representations
3639 * for all local variables.
3640 */
3643 {
3653 }
3672 }
3679 error:
3683 }
3685 /* Replace "map" by a universe map in the same space and free "drop".
3686 */
3689 {
3696 }
3698 /* Return a map that has the same intersection with "context" as "map"
3699 * and that is as "simple" as possible.
3700 *
3701 * If "map" is already the universe, then we cannot make it any simpler.
3702 * Similarly, if "context" is the universe, then we cannot exploit it
3703 * to simplify "map"
3704 * If "map" and "context" are identical to each other, then we can
3705 * return the corresponding universe.
3706 *
3707 * If either "map" or "context" consists of multiple disjuncts,
3708 * then check if "context" happens to be a subset of "map",
3709 * in which case all constraints can be removed.
3710 * In case of multiple disjuncts, the standard procedure
3711 * may not be able to detect that all constraints can be removed.
3712 *
3713 * If none of these cases apply, we have to work a bit harder.
3714 * During this computation, we make use of a single disjunct context,
3715 * so if the original context consists of more than one disjunct
3716 * then we need to approximate the context by a single disjunct set.
3717 * Simply taking the simple hull may drop constraints that are
3718 * only implicitly available in each disjunct. We therefore also
3719 * look for constraints among those defining "map" that are valid
3720 * for the context. These can then be used to simplify away
3721 * the corresponding constraints in "map".
3722 */
3725 {
3729 isl_bool subset;
3740 }
3756 }
3772 list);
3773 }
3775 error:
3779 }
3783 {
3785 }
3789 {
3792 }
3796 {
3799 }
3803 {
3808 }
3812 {
3814 }
3816 /* Compute the gist of "bmap" with respect to the constraints "context"
3817 * on the domain.
3818 */
3821 {
3827 }
3831 {
3835 }
3839 {
3843 }
3847 {
3851 }
3855 {
3857 }
3859 /* Quick check to see if two basic maps are disjoint.
3860 * In particular, we reduce the equalities and inequalities of
3861 * one basic map in the context of the equalities of the other
3862 * basic map and check if we get a contradiction.
3863 */
3866 {
3898 }
3906 }
3915 }
3919 disjoint:
3923 error:
3927 }
3931 {
3934 }
3936 /* Does "test" hold for all pairs of basic maps in "map1" and "map2"?
3937 */
3941 {
3952 }
3953 }
3956 }
3958 /* Are "map1" and "map2" obviously disjoint, based on information
3959 * that can be derived without looking at the individual basic maps?
3960 *
3961 * In particular, if one of them is empty or if they live in different spaces
3962 * (ignoring parameters), then they are clearly disjoint.
3963 */
3966 {
3967 isl_bool disjoint;
3968 isl_bool match;
3992 }
3994 /* Are "map1" and "map2" obviously disjoint?
3995 *
3996 * If one of them is empty or if they live in different spaces (ignoring
3997 * parameters), then they are clearly disjoint.
3998 * This is checked by isl_map_plain_is_disjoint_global.
3999 *
4000 * If they have different parameters, then we skip any further tests.
4001 *
4002 * If they are obviously equal, but not obviously empty, then we will
4003 * not be able to detect if they are disjoint.
4004 *
4005 * Otherwise we check if each basic map in "map1" is obviously disjoint
4006 * from each basic map in "map2".
4007 */
4010 {
4011 isl_bool disjoint;
4012 isl_bool intersect;
4013 isl_bool match;
4029 }
4031 /* Are "map1" and "map2" disjoint?
4032 *
4033 * They are disjoint if they are "obviously disjoint" or if one of them
4034 * is empty. Otherwise, they are not disjoint if one of them is universal.
4035 * If the two inputs are (obviously) equal and not empty, then they are
4036 * not disjoint.
4037 * If none of these cases apply, then check if all pairs of basic maps
4038 * are disjoint.
4039 */
4041 {
4042 isl_bool disjoint;
4043 isl_bool intersect;
4070 }
4072 /* Are "bmap1" and "bmap2" disjoint?
4073 *
4074 * They are disjoint if they are "obviously disjoint" or if one of them
4075 * is empty. Otherwise, they are not disjoint if one of them is universal.
4076 * If none of these cases apply, we compute the intersection and see if
4077 * the result is empty.
4078 */
4081 {
4082 isl_bool disjoint;
4083 isl_bool intersect;
4112 }
4114 /* Are "bset1" and "bset2" disjoint?
4115 */
4118 {
4120 }
4124 {
4126 }
4128 /* Are "set1" and "set2" disjoint?
4129 */
4131 {
4133 }
4135 /* Is "v" equal to 0, 1 or -1?
4136 */
4138 {
4140 }
4142 /* Check if we can combine a given div with lower bound l and upper
4143 * bound u with some other div and if so return that other div.
4144 * Otherwise return -1.
4145 *
4146 * We first check that
4147 * - the bounds are opposites of each other (except for the constant
4148 * term)
4149 * - the bounds do not reference any other div
4150 * - no div is defined in terms of this div
4151 *
4152 * Let m be the size of the range allowed on the div by the bounds.
4153 * That is, the bounds are of the form
4154 *
4155 * e <= a <= e + m - 1
4156 *
4157 * with e some expression in the other variables.
4158 * We look for another div b such that no third div is defined in terms
4159 * of this second div b and such that in any constraint that contains
4160 * a (except for the given lower and upper bound), also contains b
4161 * with a coefficient that is m times that of b.
4162 * That is, all constraints (execpt for the lower and upper bound)
4163 * are of the form
4164 *
4165 * e + f (a + m b) >= 0
4166 *
4167 * Furthermore, in the constraints that only contain b, the coefficient
4168 * of b should be equal to 1 or -1.
4169 * If so, we return b so that "a + m b" can be replaced by
4170 * a single div "c = a + m b".
4171 */
4174 {
4196 }
4206 }
4218 }
4229 }
4242 }
4247 }
4251 }
4253 /* Internal data structure used during the construction and/or evaluation of
4254 * an inequality that ensures that a pair of bounds always allows
4255 * for an integer value.
4256 *
4257 * "tab" is the tableau in which the inequality is evaluated. It may
4258 * be NULL until it is actually needed.
4259 * "v" contains the inequality coefficients.
4260 * "g", "fl" and "fu" are temporary scalars used during the construction and
4261 * evaluation.
4262 */
4266 isl_int g;
4267 isl_int fl;
4268 isl_int fu;
4269 };
4271 /* Free all the memory allocated by the fields of "data".
4272 */
4274 {
4280 }
4282 /* Is the inequality stored in data->v satisfied by "bmap"?
4283 * That is, does it only attain non-negative values?
4284 * data->tab is a tableau corresponding to "bmap".
4285 */
4288 {
4299 }
4301 /* Given a lower and an upper bound on div i, do they always allow
4302 * for an integer value of the given div?
4303 * Determine this property by constructing an inequality
4304 * such that the property is guaranteed when the inequality is nonnegative.
4305 * The lower bound is inequality l, while the upper bound is inequality u.
4306 * The constructed inequality is stored in data->v.
4307 *
4308 * Let the upper bound be
4309 *
4310 * -n_u a + e_u >= 0
4311 *
4312 * and the lower bound
4313 *
4314 * n_l a + e_l >= 0
4315 *
4316 * Let n_u = f_u g and n_l = f_l g, with g = gcd(n_u, n_l).
4317 * We have
4318 *
4319 * - f_u e_l <= f_u f_l g a <= f_l e_u
4320 *
4321 * Since all variables are integer valued, this is equivalent to
4322 *
4323 * - f_u e_l - (f_u - 1) <= f_u f_l g a <= f_l e_u + (f_l - 1)
4324 *
4325 * If this interval is at least f_u f_l g, then it contains at least
4326 * one integer value for a.
4327 * That is, the test constraint is
4328 *
4329 * f_l e_u + f_u e_l + f_l - 1 + f_u - 1 + 1 >= f_u f_l g
4330 *
4331 * or
4332 *
4333 * f_l e_u + f_u e_l + f_l - 1 + f_u - 1 + 1 - f_u f_l g >= 0
4334 *
4335 * If the coefficients of f_l e_u + f_u e_l have a common divisor g',
4336 * then the constraint can be scaled down by a factor g',
4337 * with the constant term replaced by
4338 * floor((f_l e_{u,0} + f_u e_{l,0} + f_l - 1 + f_u - 1 + 1 - f_u f_l g)/g').
4339 * Note that the result of applying Fourier-Motzkin to this pair
4340 * of constraints is
4341 *
4342 * f_l e_u + f_u e_l >= 0
4343 *
4344 * If the constant term of the scaled down version of this constraint,
4345 * i.e., floor((f_l e_{u,0} + f_u e_{l,0})/g') is equal to the constant
4346 * term of the scaled down test constraint, then the test constraint
4347 * is known to hold and no explicit evaluation is required.
4348 * This is essentially the Omega test.
4349 *
4350 * If the test constraint consists of only a constant term, then
4351 * it is sufficient to look at the sign of this constant term.
4352 */
4355 {
4380 }
4390 }
4392 /* Remove more kinds of divs that are not strictly needed.
4393 * In particular, if all pairs of lower and upper bounds on a div
4394 * are such that they allow at least one integer value of the div,
4395 * then we can eliminate the div using Fourier-Motzkin without
4396 * introducing any spurious solutions.
4397 *
4398 * If at least one of the two constraints has a unit coefficient for the div,
4399 * then the presence of such a value is guaranteed so there is no need to check.
4400 * In particular, the value attained by the bound with unit coefficient
4401 * can serve as this intermediate value.
4402 */
4405 {
4428 isl_bool has_int;
4436 }
4457 }
4460 }
4464 }
4468 }
4471 }
4482 error:
4487 }
4489 /* Given a pair of divs div1 and div2 such that, except for the lower bound l
4490 * and the upper bound u, div1 always occurs together with div2 in the form
4491 * (div1 + m div2), where m is the constant range on the variable div1
4492 * allowed by l and u, replace the pair div1 and div2 by a single
4493 * div that is equal to div1 + m div2.
4494 *
4495 * The new div will appear in the location that contains div2.
4496 * We need to modify all constraints that contain
4497 * div2 = (div - div1) / m
4498 * The coefficient of div2 is known to be equal to 1 or -1.
4499 * (If a constraint does not contain div2, it will also not contain div1.)
4500 * If the constraint also contains div1, then we know they appear
4501 * as f (div1 + m div2) and we can simply replace (div1 + m div2) by div,
4502 * i.e., the coefficient of div is f.
4503 *
4504 * Otherwise, we first need to introduce div1 into the constraint.
4505 * Let the l be
4506 *
4507 * div1 + f >=0
4508 *
4509 * and u
4510 *
4511 * -div1 + f' >= 0
4512 *
4513 * A lower bound on div2
4514 *
4515 * div2 + t >= 0
4516 *
4517 * can be replaced by
4518 *
4519 * m div2 + div1 + m t + f >= 0
4520 *
4521 * An upper bound
4522 *
4523 * -div2 + t >= 0
4524 *
4525 * can be replaced by
4526 *
4527 * -(m div2 + div1) + m t + f' >= 0
4528 *
4529 * These constraint are those that we would obtain from eliminating
4530 * div1 using Fourier-Motzkin.
4531 *
4532 * After all constraints have been modified, we drop the lower and upper
4533 * bound and then drop div1.
4534 */
4537 {
4539 isl_int m;
4561 else
4564 }
4568 }
4577 }
4580 }
4582 /* First check if we can coalesce any pair of divs and
4583 * then continue with dropping more redundant divs.
4584 *
4585 * We loop over all pairs of lower and upper bounds on a div
4586 * with coefficient 1 and -1, respectively, check if there
4587 * is any other div "c" with which we can coalesce the div
4588 * and if so, perform the coalescing.
4589 */
4592 {
4615 }
4616 }
4617 }
4622 }
4625 }
4627 /* Are the "n" coefficients starting at "first" of inequality constraints
4628 * "i" and "j" of "bmap" equal to each other?
4629 */
4632 {
4634 }
4636 /* Are the "n" coefficients starting at "first" of inequality constraints
4637 * "i" and "j" of "bmap" opposite to each other?
4638 */
4641 {
4643 }
4645 /* Are inequality constraints "i" and "j" of "bmap" opposite to each other,
4646 * apart from the constant term?
4647 */
4649 {
4654 }
4656 /* Are inequality constraints "i" and "j" of "bmap" equal to each other,
4657 * apart from the constant term and the coefficient at position "pos"?
4658 */
4661 {
4667 }
4669 /* Are inequality constraints "i" and "j" of "bmap" opposite to each other,
4670 * apart from the constant term and the coefficient at position "pos"?
4671 */
4674 {
4680 }
4682 /* Restart isl_basic_map_drop_redundant_divs after "bmap" has
4683 * been modified, simplying it if "simplify" is set.
4684 * Free the temporary data structure "pairs" that was associated
4685 * to the old version of "bmap".
4686 */
4689 {
4694 }
4696 /* Is "div" the single unknown existentially quantified variable
4697 * in inequality constraint "ineq" of "bmap"?
4698 * "div" is known to have a non-zero coefficient in "ineq".
4699 */
4702 {
4705 isl_bool known;
4715 isl_bool known;
4724 }
4727 }
4729 /* Does integer division "div" have coefficient 1 in inequality constraint
4730 * "ineq" of "map"?
4731 */
4733 {
4741 }
4743 /* Turn inequality constraint "ineq" of "bmap" into an equality and
4744 * then try and drop redundant divs again,
4745 * freeing the temporary data structure "pairs" that was associated
4746 * to the old version of "bmap".
4747 */
4750 {
4754 }
4756 /* Drop the integer division at position "div", along with the two
4757 * inequality constraints "ineq1" and "ineq2" in which it appears
4758 * from "bmap" and then try and drop redundant divs again,
4759 * freeing the temporary data structure "pairs" that was associated
4760 * to the old version of "bmap".
4761 */
4765 {
4772 }
4775 }
4777 /* Given two inequality constraints
4778 *
4779 * f(x) + n d + c >= 0, (ineq)
4780 *
4781 * with d the variable at position "pos", and
4782 *
4783 * f(x) + c0 >= 0, (lower)
4784 *
4785 * compute the maximal value of the lower bound ceil((-f(x) - c)/n)
4786 * determined by the first constraint.
4787 * That is, store
4788 *
4789 * ceil((c0 - c)/n)
4790 *
4791 * in *l.
4792 */
4795 {
4799 }
4801 /* Given two inequality constraints
4802 *
4803 * f(x) + n d + c >= 0, (ineq)
4804 *
4805 * with d the variable at position "pos", and
4806 *
4807 * -f(x) - c0 >= 0, (upper)
4808 *
4809 * compute the minimal value of the lower bound ceil((-f(x) - c)/n)
4810 * determined by the first constraint.
4811 * That is, store
4812 *
4813 * ceil((-c1 - c)/n)
4814 *
4815 * in *u.
4816 */
4819 {
4823 }
4825 /* Given a lower bound constraint "ineq" on "div" in "bmap",
4826 * does the corresponding lower bound have a fixed value in "bmap"?
4827 *
4828 * In particular, "ineq" is of the form
4829 *
4830 * f(x) + n d + c >= 0
4831 *
4832 * with n > 0, c the constant term and
4833 * d the existentially quantified variable "div".
4834 * That is, the lower bound is
4835 *
4836 * ceil((-f(x) - c)/n)
4837 *
4838 * Look for a pair of constraints
4839 *
4840 * f(x) + c0 >= 0
4841 * -f(x) + c1 >= 0
4842 *
4843 * i.e., -c1 <= -f(x) <= c0, that fix ceil((-f(x) - c)/n) to a constant value.
4844 * That is, check that
4845 *
4846 * ceil((-c1 - c)/n) = ceil((c0 - c)/n)
4847 *
4848 * If so, return the index of inequality f(x) + c0 >= 0.
4849 * Otherwise, return -1.
4850 */
4852 {
4870 }
4874 }
4875 }
4892 }
4894 /* Given a lower bound constraint "ineq" on the existentially quantified
4895 * variable "div", such that the corresponding lower bound has
4896 * a fixed value in "bmap", assign this fixed value to the variable and
4897 * then try and drop redundant divs again,
4898 * freeing the temporary data structure "pairs" that was associated
4899 * to the old version of "bmap".
4900 * "lower" determines the constant value for the lower bound.
4901 *
4902 * In particular, "ineq" is of the form
4903 *
4904 * f(x) + n d + c >= 0,
4905 *
4906 * while "lower" is of the form
4907 *
4908 * f(x) + c0 >= 0
4909 *
4910 * The lower bound is ceil((-f(x) - c)/n) and its constant value
4911 * is ceil((c0 - c)/n).
4912 */
4915 {
4916 isl_int c;
4929 }
4931 /* Remove divs that are not strictly needed based on the inequality
4932 * constraints.
4933 * In particular, if a div only occurs positively (or negatively)
4934 * in constraints, then it can simply be dropped.
4935 * Also, if a div occurs in only two constraints and if moreover
4936 * those two constraints are opposite to each other, except for the constant
4937 * term and if the sum of the constant terms is such that for any value
4938 * of the other values, there is always at least one integer value of the
4939 * div, i.e., if one plus this sum is greater than or equal to
4940 * the (absolute value) of the coefficient of the div in the constraints,
4941 * then we can also simply drop the div.
4942 *
4943 * If an existentially quantified variable does not have an explicit
4944 * representation, appears in only a single lower bound that does not
4945 * involve any other such existentially quantified variables and appears
4946 * in this lower bound with coefficient 1,
4947 * then fix the variable to the value of the lower bound. That is,
4948 * turn the inequality into an equality.
4949 * If for any value of the other variables, there is any value
4950 * for the existentially quantified variable satisfying the constraints,
4951 * then this lower bound also satisfies the constraints.
4952 * It is therefore safe to pick this lower bound.
4953 *
4954 * The same reasoning holds even if the coefficient is not one.
4955 * However, fixing the variable to the value of the lower bound may
4956 * in general introduce an extra integer division, in which case
4957 * it may be better to pick another value.
4958 * If this integer division has a known constant value, then plugging
4959 * in this constant value removes the existentially quantified variable
4960 * completely. In particular, if the lower bound is of the form
4961 * ceil((-f(x) - c)/n) and there are two constraints, f(x) + c0 >= 0 and
4962 * -f(x) + c1 >= 0 such that ceil((-c1 - c)/n) = ceil((c0 - c)/n),
4963 * then the existentially quantified variable can be assigned this
4964 * shared value.
4965 *
4966 * We skip divs that appear in equalities or in the definition of other divs.
4967 * Divs that appear in the definition of other divs usually occur in at least
4968 * 4 constraints, but the constraints may have been simplified.
4969 *
4970 * If any divs are left after these simple checks then we move on
4971 * to more complicated cases in drop_more_redundant_divs.
4972 */
4975 {
5015 }
5019 }
5020 }
5028 }
5031 else
5051 pairs);
5055 pairs);
5057 }
5074 else
5081 }
5084 }
5091 error:
5095 }
5097 /* Consider the coefficients at "c" as a row vector and replace
5098 * them with their product with "T". "T" is assumed to be a square matrix.
5099 */
5101 {
5123 }
5125 /* Plug in T for the variables in "bmap" starting at "pos".
5126 * T is a linear unimodular matrix, i.e., without constant term.
5127 */
5130 {
5159 }
5163 error:
5167 }
5169 /* Remove divs that are not strictly needed.
5170 *
5171 * First look for an equality constraint involving two or more
5172 * existentially quantified variables without an explicit
5173 * representation. Replace the combination that appears
5174 * in the equality constraint by a single existentially quantified
5175 * variable such that the equality can be used to derive
5176 * an explicit representation for the variable.
5177 * If there are no more such equality constraints, then continue
5178 * with isl_basic_map_drop_redundant_divs_ineq.
5179 *
5180 * In particular, if the equality constraint is of the form
5181 *
5182 * f(x) + \sum_i c_i a_i = 0
5183 *
5184 * with a_i existentially quantified variable without explicit
5185 * representation, then apply a transformation on the existentially
5186 * quantified variables to turn the constraint into
5187 *
5188 * f(x) + g a_1' = 0
5189 *
5190 * with g the gcd of the c_i.
5191 * In order to easily identify which existentially quantified variables
5192 * have a complete explicit representation, i.e., without being defined
5193 * in terms of other existentially quantified variables without
5194 * an explicit representation, the existentially quantified variables
5195 * are first sorted.
5196 *
5197 * The variable transformation is computed by extending the row
5198 * [c_1/g ... c_n/g] to a unimodular matrix, obtaining the transformation
5199 *
5200 * [a_1'] [c_1/g ... c_n/g] [ a_1 ]
5201 * [a_2'] [ a_2 ]
5202 * ... = U ....
5203 * [a_n'] [ a_n ]
5204 *
5205 * with [c_1/g ... c_n/g] representing the first row of U.
5206 * The inverse of U is then plugged into the original constraints.
5207 * The call to isl_basic_map_simplify makes sure the explicit
5208 * representation for a_1' is extracted from the equality constraint.
5209 */
5212 {
5247 }
5266 }
5270 {
5273 }
5276 {
5285 }
5288 error:
5291 }
5294 {
5296 }
5298 /* Does "bmap" satisfy any equality that involves more than 2 variables
5299 * and/or has coefficients different from -1 and 1?
5300 */
5302 {
5331 }
5334 }
5336 /* Remove any common factor g from the constraint coefficients in "v".
5337 * The constant term is stored in the first position and is replaced
5338 * by floor(c/g). If any common factor is removed and if this results
5339 * in a tightening of the constraint, then set *tightened.
5340 */
5343 {
5363 }
5365 /* If "bmap" is an integer set that satisfies any equality involving
5366 * more than 2 variables and/or has coefficients different from -1 and 1,
5367 * then use variable compression to reduce the coefficients by removing
5368 * any (hidden) common factor.
5369 * In particular, apply the variable compression to each constraint,
5370 * factor out any common factor in the non-constant coefficients and
5371 * then apply the inverse of the compression.
5372 * At the end, we mark the basic map as having reduced constants.
5373 * If this flag is still set on the next invocation of this function,
5374 * then we skip the computation.
5375 *
5376 * Removing a common factor may result in a tightening of some of
5377 * the constraints. If this happens, then we may end up with two
5378 * opposite inequalities that can be replaced by an equality.
5379 * We therefore call isl_basic_map_detect_inequality_pairs,
5380 * which checks for such pairs of inequalities as well as eliminate_divs_eq
5381 * and isl_basic_map_gauss if such a pair was found.
5382 */
5385 {
5419 }
5430 }
5445 }
5446 }
5449 error:
5454 }
5456 /* Shift the integer division at position "div" of "bmap"
5457 * by "shift" times the variable at position "pos".
5458 * "pos" is as determined by isl_basic_map_offset, i.e., pos == 0
5459 * corresponds to the constant term.
5460 *
5461 * That is, if the integer division has the form
5462 *
5463 * floor(f(x)/d)
5464 *
5465 * then replace it by
5466 *
5467 * floor((f(x) + shift * d * x_pos)/d) - shift * x_pos
5468 */
5471 {
5490 }
5496 }
5504 }
5507 }