| blob | 7dcd53fc22873347dc47f580f270274ae218bc54 |
1 /*
2 * Copyright 2008-2009 Katholieke Universiteit Leuven
3 *
4 * Use of this software is governed by the MIT license
5 *
6 * Written by Sven Verdoolaege, K.U.Leuven, Departement
7 * Computerwetenschappen, Celestijnenlaan 200A, B-3001 Leuven, Belgium
8 */
10 #include <isl_ctx_private.h>
11 #include <isl_map_private.h>
13 #include <isl/vec.h>
14 #include <isl/mat.h>
15 #include <isl_seq.h>
19 #include <isl_factorization.h>
20 #include <isl_point_private.h>
21 #include <isl_options_private.h>
22 #include <isl_vec_private.h>
25 {
31 }
33 /* Construct a zero sample of the same dimension as bset.
34 * As a special case, if bset is zero-dimensional, this
35 * function creates a zero-dimensional sample point.
36 */
38 {
47 }
50 }
53 {
55 isl_int t;
82 }
85 }
90 else
97 }
102 }
106 error:
110 }
112 /* Find a sample integer point, if any, in bset, which is known
113 * to have equalities. If bset contains no integer points, then
114 * return a zero-length vector.
115 * We simply remove the known equalities, compute a sample
116 * in the resulting bset, using the specified recurse function,
117 * and then transform the sample back to the original space.
118 */
121 {
132 else
135 }
137 /* Return a matrix containing the equalities of the tableau
138 * in constraint form. The tableau is assumed to have
139 * an associated bset that has been kept up-to-date.
140 */
142 {
170 else
174 }
177 error:
180 }
182 /* Compute and return an initial basis for the bounded tableau "tab".
183 *
184 * If the tableau is either full-dimensional or zero-dimensional,
185 * the we simply return an identity matrix.
186 * Otherwise, we construct a basis whose first directions correspond
187 * to equalities.
188 */
190 {
208 }
210 /* Compute the minimum of the current ("level") basis row over "tab"
211 * and store the result in position "level" of "min".
212 */
215 {
218 }
220 /* Compute the maximum of the current ("level") basis row over "tab"
221 * and store the result in position "level" of "max".
222 */
225 {
238 }
240 /* Perform a greedy search for an integer point in the set represented
241 * by "tab", given that the minimal rational value (rounded up to the
242 * nearest integer) at "level" is smaller than the maximal rational
243 * value (rounded down to the nearest integer).
244 *
245 * Return 1 if we have found an integer point (if tab->n_unbounded > 0
246 * then we may have only found integer values for the bounded dimensions
247 * and it is the responsibility of the caller to extend this solution
248 * to the unbounded dimensions).
249 * Return 0 if greedy search did not result in a solution.
250 * Return -1 if some error occurred.
251 *
252 * We assign a value half-way between the minimum and the maximum
253 * to the current dimension and check if the minimal value of the
254 * next dimension is still smaller than (or equal) to the maximal value.
255 * We continue this process until either
256 * - the minimal value (rounded up) is greater than the maximal value
257 * (rounded down). In this case, greedy search has failed.
258 * - we have exhausted all bounded dimensions, meaning that we have
259 * found a solution.
260 * - the sample value of the tableau is integral.
261 * - some error has occurred.
262 */
265 {
307 }
309 /* Given a tableau representing a set, find and return
310 * an integer point in the set, if there is any.
311 *
312 * We perform a depth first search
313 * for an integer point, by scanning all possible values in the range
314 * attained by a basis vector, where an initial basis may have been set
315 * by the calling function. Otherwise an initial basis that exploits
316 * the equalities in the tableau is created.
317 * tab->n_zero is currently ignored and is clobbered by this function.
318 *
319 * The tableau is allowed to have unbounded direction, but then
320 * the calling function needs to set an initial basis, with the
321 * unbounded directions last and with tab->n_unbounded set
322 * to the number of unbounded directions.
323 * Furthermore, the calling functions needs to add shifted copies
324 * of all constraints involving unbounded directions to ensure
325 * that any feasible rational value in these directions can be rounded
326 * up to yield a feasible integer value.
327 * In particular, let B define the given basis x' = B x
328 * and let T be the inverse of B, i.e., X = T x'.
329 * Let a x + c >= 0 be a constraint of the set represented by the tableau,
330 * or a T x' + c >= 0 in terms of the given basis. Assume that
331 * the bounded directions have an integer value, then we can safely
332 * round up the values for the unbounded directions if we make sure
333 * that x' not only satisfies the original constraint, but also
334 * the constraint "a T x' + c + s >= 0" with s the sum of all
335 * negative values in the last n_unbounded entries of "a T".
336 * The calling function therefore needs to add the constraint
337 * a x + c + s >= 0. The current function then scans the first
338 * directions for an integer value and once those have been found,
339 * it can compute "T ceil(B x)" to yield an integer point in the set.
340 * Note that during the search, the first rows of B may be changed
341 * by a basis reduction, but the last n_unbounded rows of B remain
342 * unaltered and are also not mixed into the first rows.
343 *
344 * The search is implemented iteratively. "level" identifies the current
345 * basis vector. "init" is true if we want the first value at the current
346 * level and false if we want the next value.
347 *
348 * At the start of each level, we first check if we can find a solution
349 * using greedy search. If not, we continue with the exhaustive search.
350 *
351 * The initial basis is the identity matrix. If the range in some direction
352 * contains more than one integer value, we perform basis reduction based
353 * on the value of ctx->opt->gbr
354 * - ISL_GBR_NEVER: never perform basis reduction
355 * - ISL_GBR_ONCE: only perform basis reduction the first
356 * time such a range is encountered
357 * - ISL_GBR_ALWAYS: always perform basis reduction when
358 * such a range is encountered
359 *
360 * When ctx->opt->gbr is set to ISL_GBR_ALWAYS, then we allow the basis
361 * reduction computation to return early. That is, as soon as it
362 * finds a reasonable first direction.
363 */
365 {
401 sample);
403 }
449 }
465 }
472 level--;
478 }
487 }
489 }
497 sample);
501 }
510 error:
516 }
520 /* Compute a sample point of the given basic set, based on the given,
521 * non-trivial factorization.
522 */
525 {
567 }
573 }
581 error:
586 }
588 /* Given a basic set that is known to be bounded, find and return
589 * an integer point in the basic set, if there is any.
590 *
591 * After handling some trivial cases, we construct a tableau
592 * and then use isl_tab_sample to find a sample, passing it
593 * the identity matrix as initial basis.
594 */
596 {
630 }
643 }
648 error:
652 }
654 /* Given a basic set "bset" and a value "sample" for the first coordinates
655 * of bset, plug in these values and drop the corresponding coordinates.
656 *
657 * We do this by computing the preimage of the transformation
658 *
659 * [ 1 0 ]
660 * x = [ s 0 ] x'
661 * [ 0 I ]
662 *
663 * where [1 s] is the sample value and I is the identity matrix of the
664 * appropriate dimension.
665 */
668 {
684 }
688 }
693 error:
697 }
699 /* Given a basic set "bset", return any (possibly non-integer) point
700 * in the basic set.
701 */
703 {
717 }
719 /* Given a linear cone "cone" and a rational point "vec",
720 * construct a polyhedron with shifted copies of the constraints in "cone",
721 * i.e., a polyhedron with "cone" as its recession cone, such that each
722 * point x in this polyhedron is such that the unit box positioned at x
723 * lies entirely inside the affine cone 'vec + cone'.
724 * Any rational point in this polyhedron may therefore be rounded up
725 * to yield an integer point that lies inside said affine cone.
726 *
727 * Denote the constraints of cone by "<a_i, x> >= 0" and the rational
728 * point "vec" by v/d.
729 * Let b_i = <a_i, v>. Then the affine cone 'vec + cone' is given
730 * by <a_i, x> - b/d >= 0.
731 * The polyhedron <a_i, x> - ceil{b/d} >= 0 is a subset of this affine cone.
732 * We prefer this polyhedron over the actual affine cone because it doesn't
733 * require a scaling of the constraints.
734 * If each of the vertices of the unit cube positioned at x lies inside
735 * this polyhedron, then the whole unit cube at x lies inside the affine cone.
736 * We therefore impose that x' = x + \sum e_i, for any selection of unit
737 * vectors lies inside the polyhedron, i.e.,
738 *
739 * <a_i, x'> - ceil{b/d} = <a_i, x> + sum a_i - ceil{b/d} >= 0
740 *
741 * The most stringent of these constraints is the one that selects
742 * all negative a_i, so the polyhedron we are looking for has constraints
743 *
744 * <a_i, x> + sum_{a_i < 0} a_i - ceil{b/d} >= 0
745 *
746 * Note that if cone were known to have only non-negative rays
747 * (which can be accomplished by a unimodular transformation),
748 * then we would only have to check the points x' = x + e_i
749 * and we only have to add the smallest negative a_i (if any)
750 * instead of the sum of all negative a_i.
751 */
754 {
785 }
786 }
792 error:
797 }
799 /* Given a rational point vec in a (transformed) basic set,
800 * such that cone is the recession cone of the original basic set,
801 * "round up" the rational point to an integer point.
802 *
803 * We first check if the rational point just happens to be integer.
804 * If not, we transform the cone in the same way as the basic set,
805 * pick a point x in this cone shifted to the rational point such that
806 * the whole unit cube at x is also inside this affine cone.
807 * Then we simply round up the coordinates of x and return the
808 * resulting integer point.
809 */
812 {
823 }
835 error:
840 }
842 /* Concatenate two integer vectors, i.e., two vectors with denominator
843 * (stored in element 0) equal to 1.
844 */
846 {
867 error:
871 }
873 /* Give a basic set "bset" with recession cone "cone", compute and
874 * return an integer point in bset, if any.
875 *
876 * If the recession cone is full-dimensional, then we know that
877 * bset contains an infinite number of integer points and it is
878 * fairly easy to pick one of them.
879 * If the recession cone is not full-dimensional, then we first
880 * transform bset such that the bounded directions appear as
881 * the first dimensions of the transformed basic set.
882 * We do this by using a unimodular transformation that transforms
883 * the equalities in the recession cone to equalities on the first
884 * dimensions.
885 *
886 * The transformed set is then projected onto its bounded dimensions.
887 * Note that to compute this projection, we can simply drop all constraints
888 * involving any of the unbounded dimensions since these constraints
889 * cannot be combined to produce a constraint on the bounded dimensions.
890 * To see this, assume that there is such a combination of constraints
891 * that produces a constraint on the bounded dimensions. This means
892 * that some combination of the unbounded dimensions has both an upper
893 * bound and a lower bound in terms of the bounded dimensions, but then
894 * this combination would be a bounded direction too and would have been
895 * transformed into a bounded dimensions.
896 *
897 * We then compute a sample value in the bounded dimensions.
898 * If no such value can be found, then the original set did not contain
899 * any integer points and we are done.
900 * Otherwise, we plug in the value we found in the bounded dimensions,
901 * project out these bounded dimensions and end up with a set with
902 * a full-dimensional recession cone.
903 * A sample point in this set is computed by "rounding up" any
904 * rational point in the set.
905 *
906 * The sample points in the bounded and unbounded dimensions are
907 * then combined into a single sample point and transformed back
908 * to the original space.
909 */
912 {
947 }
954 error:
958 }
961 {
969 }
971 /* Given a tableau "tab", a tableau "tab_cone" that corresponds
972 * to the recession cone and the inverse of a new basis U = inv(B),
973 * with the unbounded directions in B last,
974 * add constraints to "tab" that ensure any rational value
975 * in the unbounded directions can be rounded up to an integer value.
976 *
977 * The new basis is given by x' = B x, i.e., x = U x'.
978 * For any rational value of the last tab->n_unbounded coordinates
979 * in the update tableau, the value that is obtained by rounding
980 * up this value should be contained in the original tableau.
981 * For any constraint "a x + c >= 0", we therefore need to add
982 * a constraint "a x + c + s >= 0", with s the sum of all negative
983 * entries in the last elements of "a U".
984 *
985 * Since we are not interested in the first entries of any of the "a U",
986 * we first drop the columns of U that correpond to bounded directions.
987 */
990 {
992 isl_int v;
998 }
1027 }
1032 error:
1036 }
1038 /* Compute and return an initial basis for the possibly
1039 * unbounded tableau "tab". "tab_cone" is a tableau
1040 * for the corresponding recession cone.
1041 * Additionally, add constraints to "tab" that ensure
1042 * that any rational value for the unbounded directions
1043 * can be rounded up to an integer value.
1044 *
1045 * If the tableau is bounded, i.e., if the recession cone
1046 * is zero-dimensional, then we just use inital_basis.
1047 * Otherwise, we construct a basis whose first directions
1048 * correspond to equalities, followed by bounded directions,
1049 * i.e., equalities in the recession cone.
1050 * The remaining directions are then unbounded.
1051 */
1054 {
1065 }
1086 }
1088 /* Compute and return a sample point in bset using generalized basis
1089 * reduction. We first check if the input set has a non-trivial
1090 * recession cone. If so, we perform some extra preprocessing in
1091 * sample_with_cone. Otherwise, we directly perform generalized basis
1092 * reduction.
1093 */
1095 {
1110 error:
1113 }
1116 {
1138 }
1139 }
1152 error:
1155 }
1158 {
1160 }
1162 /* Compute an integer sample in "bset", where the caller guarantees
1163 * that "bset" is bounded.
1164 */
1166 {
1168 }
1171 {
1194 }
1198 error:
1202 }
1205 {
1219 }
1222 error:
1225 }
1228 {
1230 }
1233 {
1247 }
1252 error:
1255 }
1258 {
1260 }
1263 {
1272 }
1275 {
1289 }
1295 error:
1298 }