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1 /* Chains of recurrences.
2 Copyright (C) 2003, 2004, 2005, 2006, 2007 Free Software Foundation, Inc.
3 Contributed by Sebastian Pop <pop@cri.ensmp.fr>
5 This file is part of GCC.
7 GCC is free software; you can redistribute it and/or modify it under
8 the terms of the GNU General Public License as published by the Free
9 Software Foundation; either version 2, or (at your option) any later
10 version.
12 GCC is distributed in the hope that it will be useful, but WITHOUT ANY
13 WARRANTY; without even the implied warranty of MERCHANTABILITY or
14 FITNESS FOR A PARTICULAR PURPOSE. See the GNU General Public License
15 for more details.
17 You should have received a copy of the GNU General Public License
18 along with GCC; see the file COPYING. If not, write to the Free
19 Software Foundation, 51 Franklin Street, Fifth Floor, Boston, MA
20 02110-1301, USA. */
22 /* This file implements operations on chains of recurrences. Chains
23 of recurrences are used for modeling evolution functions of scalar
24 variables.
25 */
42 \f
44 /* Extended folder for chrecs. */
46 /* Determines whether CST is not a constant evolution. */
50 {
52 }
54 /* Fold CODE for a polynomial function and a constant. */
58 tree type,
59 tree poly,
60 tree cst)
61 {
69 {
71 return build_polynomial_chrec
77 return build_polynomial_chrec
83 return build_polynomial_chrec
90 }
91 }
93 /* Fold the addition of two polynomial functions. */
97 tree type,
98 tree poly0,
99 tree poly1)
100 {
112 /*
113 {a, +, b}_1 + {c, +, d}_2 -> {{a, +, b}_1 + c, +, d}_2,
114 {a, +, b}_2 + {c, +, d}_1 -> {{c, +, d}_1 + a, +, b}_2,
115 {a, +, b}_x + {c, +, d}_x -> {a+c, +, b+d}_x. */
117 {
119 return build_polynomial_chrec
123 else
124 return build_polynomial_chrec
131 }
134 {
136 return build_polynomial_chrec
140 else
141 return build_polynomial_chrec
145 }
147 /* This function should never be called for chrecs of loops that
148 do not belong to the same loop nest. */
152 {
153 left = chrec_fold_plus
155 right = chrec_fold_plus
157 }
158 else
159 {
160 left = chrec_fold_minus
162 right = chrec_fold_minus
164 }
168 else
169 return build_polynomial_chrec
171 }
173 \f
175 /* Fold the multiplication of two polynomial functions. */
179 tree poly0,
180 tree poly1)
181 {
194 /* {a, +, b}_1 * {c, +, d}_2 -> {c*{a, +, b}_1, +, d}_2,
195 {a, +, b}_2 * {c, +, d}_1 -> {a*{c, +, d}_1, +, b}_2,
196 {a, +, b}_x * {c, +, d}_x -> {a*c, +, a*d + b*c + b*d, +, 2*b*d}_x. */
198 /* poly0 is a constant wrt. poly1. */
199 return build_polynomial_chrec
205 /* poly1 is a constant wrt. poly0. */
206 return build_polynomial_chrec
213 /* poly0 and poly1 are two polynomials in the same variable,
214 {a, +, b}_x * {c, +, d}_x -> {a*c, +, a*d + b*c + b*d, +, 2*b*d}_x. */
216 /* "a*c". */
219 /* "a*d + b*c + b*d". */
227 /* "2*b*d". */
236 }
238 /* When the operands are automatically_generated_chrec_p, the fold has
239 to respect the semantics of the operands. */
243 tree op1)
244 {
257 /* The default case produces a safe result. */
259 }
261 /* Fold the addition of two chrecs. */
263 static tree
266 {
272 {
275 {
281 return build_polynomial_chrec
285 else
286 return build_polynomial_chrec
290 }
294 {
297 return build_polynomial_chrec
301 else
302 return build_polynomial_chrec
311 {
321 else
323 }
324 }
325 }
326 }
328 /* Fold the addition of two chrecs. */
330 tree
332 tree op0,
333 tree op1)
334 {
345 }
347 /* Fold the subtraction of two chrecs. */
349 tree
351 tree op0,
352 tree op1)
353 {
362 }
364 /* Fold the multiplication of two chrecs. */
366 tree
368 tree op0,
369 tree op1)
370 {
376 {
379 {
389 return build_polynomial_chrec
393 }
403 {
405 return build_polynomial_chrec
416 }
417 }
418 }
420 \f
422 /* Operations. */
424 /* Evaluate the binomial coefficient. Return NULL_TREE if the intermediate
425 calculation overflows, otherwise return C(n,k) with type TYPE. */
427 static tree
429 {
433 tree res;
435 /* Handle the most frequent cases. */
441 /* Check that k <= n. */
446 /* Numerator = n. */
450 /* Denominator = 2. */
454 /* Index = Numerator-1. */
456 {
459 }
460 else
461 {
464 }
466 /* Numerator = Numerator*Index = n*(n-1). */
471 {
472 /* Index--. */
474 {
475 hidx--;
477 }
478 else
479 lidx--;
481 /* Numerator *= Index. */
485 /* Denominator *= i. */
487 }
489 /* Result = Numerator / Denominator. */
495 }
497 /* Helper function. Use the Newton's interpolating formula for
498 evaluating the value of the evolution function. */
500 static tree
502 {
513 {
523 }
530 }
532 /* Evaluates "CHREC (X)" when the varying variable is VAR.
533 Example: Given the following parameters,
535 var = 1
536 chrec = {3, +, 4}_1
537 x = 10
539 The result is given by the Newton's interpolating formula:
540 3 * \binom{10}{0} + 4 * \binom{10}{1}.
541 */
543 tree
545 tree chrec,
546 tree x)
547 {
554 /* When the symbols are defined in an outer loop, it is possible
555 to symbolically compute the apply, since the symbols are
556 constants with respect to the varying loop. */
567 {
568 /* "{a, +, b} (x)" -> "a + b*x". */
573 }
580 /* testsuite/.../ssa-chrec-38.c. */
582 else
586 {
595 }
598 }
600 /* Replaces the initial condition in CHREC with INIT_COND. */
602 tree
604 tree init_cond)
605 {
612 {
614 return build_polynomial_chrec
621 }
622 }
624 /* Returns the initial condition of a given CHREC. */
626 tree
628 {
634 else
636 }
638 /* Returns a univariate function that represents the evolution in
639 LOOP_NUM. Mask the evolution of any other loop. */
641 tree
644 {
650 {
655 return build_polynomial_chrec
658 loop_num),
662 /* There is no evolution in this loop. */
665 else
666 {
669 loop_num);
670 }
674 }
675 }
677 /* Returns the evolution part of CHREC in LOOP_NUM when RIGHT is
678 true, otherwise returns the initial condition in LOOP_NUM. */
680 static tree
684 {
685 tree component;
692 {
697 {
700 else
707 else
708 return build_polynomial_chrec
711 loop_num,
712 right),
713 component);
714 }
717 /* There is no evolution part in this loop. */
720 else
721 {
724 loop_num,
725 right);
726 }
731 else
733 }
734 }
736 /* Returns the evolution part in LOOP_NUM. Example: the call
737 evolution_part_in_loop_num ({{0, +, 1}_1, +, 2}_1, 1) returns
738 {1, +, 2}_1 */
740 tree
743 {
745 }
747 /* Returns the initial condition in LOOP_NUM. Example: the call
748 initial_condition_in_loop_num ({{0, +, 1}_1, +, 2}_2, 2) returns
749 {0, +, 1}_1 */
751 tree
754 {
756 }
758 /* Set or reset the evolution of CHREC to NEW_EVOL in loop LOOP_NUM.
759 This function is essentially used for setting the evolution to
760 chrec_dont_know, for example after having determined that it is
761 impossible to say how many times a loop will execute. */
763 tree
765 tree chrec,
766 tree new_evol)
767 {
774 {
776 new_evol);
778 new_evol);
782 }
789 }
791 /* Merges two evolution functions that were found by following two
792 alternate paths of a conditional expression. */
794 tree
796 tree chrec2)
797 {
815 }
817 \f
819 /* Observers. */
821 /* Helper function for is_multivariate_chrec. */
823 static bool
825 {
830 {
833 else
836 }
837 else
839 }
841 /* Determine whether the given chrec is multivariate or not. */
843 bool
845 {
854 else
856 }
858 /* Determines whether the chrec contains symbolic names or not. */
860 bool
862 {
882 }
884 /* Determines whether the chrec contains undetermined coefficients. */
886 bool
888 {
901 }
903 /* Determines whether the tree EXPR contains chrecs, and increment
904 SIZE if it is not a NULL pointer by an estimation of the depth of
905 the tree. */
907 bool
909 {
926 }
928 /* Recursive helper function. */
930 static bool
932 {
941 {
944 loopnum)
946 loopnum))
949 }
952 {
955 loopnum))
960 loopnum))
966 }
969 }
971 /* Return true if CHREC is invariant in loop LOOPNUM, false otherwise. */
973 bool
975 {
983 }
985 /* Determine whether the given tree is an affine multivariate
986 evolution. */
988 bool
990 {
995 {
998 {
1001 else
1002 {
1006 && evolution_function_is_affine_multivariate_p
1009 else
1011 }
1012 }
1013 else
1014 {
1018 && evolution_function_is_affine_multivariate_p
1021 else
1023 }
1027 }
1028 }
1030 /* Determine whether the given tree is a function in zero or one
1031 variables. */
1033 bool
1035 {
1040 {
1043 {
1053 }
1056 {
1066 }
1070 }
1071 }
1073 /* Returns the number of variables of CHREC. Example: the call
1074 nb_vars_in_chrec ({{0, +, 1}_5, +, 2}_6) returns 2. */
1076 unsigned
1078 {
1083 {
1090 }
1091 }
1093 /* Returns true if TYPE is a type in that we cannot directly perform
1094 arithmetics, even though it is a scalar type. */
1096 static bool
1098 {
1099 /* Ada frontend uses subtypes -- an arithmetic cannot be directly performed
1100 in the subtype, but a base type must be used, and the result then can
1101 be casted to the subtype. */
1106 }
1110 /* Converts BASE and STEP of affine scev to TYPE. LOOP is the loop whose iv
1111 the scev corresponds to. AT_STMT is the statement at that the scev is
1112 evaluated. USE_OVERFLOW_SEMANTICS is true if this function should assume that
1113 the rules for overflow of the given language apply (e.g., that signed
1114 arithmetics in C does not overflow) -- i.e., to use them to avoid unnecessary
1115 tests, but also to enforce that the result follows them. Returns true if the
1116 conversion succeeded, false otherwise. */
1118 bool
1122 {
1128 /* If we cannot perform arithmetic in TYPE, avoid creating an scev. */
1132 /* In general,
1133 (TYPE) (BASE + STEP * i) = (TYPE) BASE + (TYPE -- sign extend) STEP * i,
1134 but we must check some assumptions.
1136 1) If [BASE, +, STEP] wraps, the equation is not valid when precision
1137 of CT is smaller than the precision of TYPE. For example, when we
1138 cast unsigned char [254, +, 1] to unsigned, the values on left side
1139 are 254, 255, 0, 1, ..., but those on the right side are
1140 254, 255, 256, 257, ...
1141 2) In case that we must also preserve the fact that signed ivs do not
1142 overflow, we must additionally check that the new iv does not wrap.
1143 For example, unsigned char [125, +, 1] casted to signed char could
1144 become a wrapping variable with values 125, 126, 127, -128, -127, ...,
1145 which would confuse optimizers that assume that this does not
1146 happen. */
1149 enforce_overflow_semantics = (use_overflow_semantics
1152 {
1153 /* We can avoid checking whether the result overflows in the following
1154 cases:
1156 -- must_check_src_overflow is true, and the range of TYPE is superset
1157 of the range of CT -- i.e., in all cases except if CT signed and
1158 TYPE unsigned.
1159 -- both CT and TYPE have the same precision and signedness, and we
1160 verify instead that the source does not overflow (this may be
1161 easier than verifying it for the result, as we may use the
1162 information about the semantics of overflow in CT). */
1164 {
1167 else
1169 }
1172 {
1175 }
1176 else
1178 }
1179 else
1184 use_overflow_semantics))
1188 use_overflow_semantics);
1189 /* The step must be sign extended, regardless of the signedness
1190 of CT and TYPE. This only needs to be handled specially when
1191 CT is unsigned -- to avoid e.g. unsigned char [100, +, 255]
1192 (with values 100, 99, 98, ...) from becoming signed or unsigned
1193 [100, +, 255] with values 100, 355, ...; the sign-extension is
1194 performed by default when CT is signed. */
1198 use_overflow_semantics);
1206 /* Note that in this case we cannot use the fact that signed variables
1207 do not overflow, as this is what we are verifying for the new iv. */
1214 }
1215 \f
1217 /* Convert CHREC to TYPE. When the analyzer knows the context in
1218 which the CHREC is built, it sets AT_STMT to the statement that
1219 contains the definition of the analyzed variable, otherwise the
1220 conversion is less accurate: the information is used for
1221 determining a more accurate estimation of the number of iterations.
1222 By default AT_STMT could be safely set to NULL_TREE.
1224 The following rule is always true: TREE_TYPE (chrec) ==
1225 TREE_TYPE (CHREC_LEFT (chrec)) == TREE_TYPE (CHREC_RIGHT (chrec)).
1226 An example of what could happen when adding two chrecs and the type
1227 of the CHREC_RIGHT is different than CHREC_LEFT is:
1229 {(uint) 0, +, (uchar) 10} +
1230 {(uint) 0, +, (uchar) 250}
1232 that would produce a wrong result if CHREC_RIGHT is not (uint):
1234 {(uint) 0, +, (uchar) 4}
1236 instead of
1238 {(uint) 0, +, (uint) 260}
1239 */
1241 tree
1243 {
1245 }
1247 /* Convert CHREC to TYPE. When the analyzer knows the context in
1248 which the CHREC is built, it sets AT_STMT to the statement that
1249 contains the definition of the analyzed variable, otherwise the
1250 conversion is less accurate: the information is used for
1251 determining a more accurate estimation of the number of iterations.
1252 By default AT_STMT could be safely set to NULL_TREE.
1254 USE_OVERFLOW_SEMANTICS is true if this function should assume that
1255 the rules for overflow of the given language apply (e.g., that signed
1256 arithmetics in C does not overflow) -- i.e., to use them to avoid unnecessary
1257 tests, but also to enforce that the result follows them. */
1259 static tree
1262 {
1282 use_overflow_semantics))
1285 /* If we cannot propagate the cast inside the chrec, just keep the cast. */
1286 keep_cast:
1289 /* Don't propagate overflows. */
1293 /* But reject constants that don't fit in their type after conversion.
1294 This can happen if TYPE_MIN_VALUE or TYPE_MAX_VALUE are not the
1295 natural values associated with TYPE_PRECISION and TYPE_UNSIGNED,
1296 and can cause problems later when computing niters of loops. Note
1297 that we don't do the check before converting because we don't want
1298 to reject conversions of negative chrecs to unsigned types. */
1305 }
1307 /* Convert CHREC to TYPE, without regard to signed overflows. Returns the new
1308 chrec if something else than what chrec_convert would do happens, NULL_TREE
1309 otherwise. */
1311 tree
1313 {
1324 /* If we cannot perform arithmetic in TYPE, avoid creating an scev. */
1338 }
1340 /* Returns true when CHREC0 == CHREC1. */
1342 bool
1344 tree chrec1)
1345 {
1355 {
1365 }
1366 }
1368 /* Returns EV_GROWS if CHREC grows (assuming that it does not overflow),
1369 EV_DECREASES if it decreases, and EV_UNKNOWN if we cannot determine
1370 which of these cases happens. */
1372 enum ev_direction
1374 {
1375 tree step;
1386 else
1388 }