| blob | bac6e594d8f02ba32d961906d48c6bc90a03015c |
1 /* Scalar evolution detector.
2 Copyright (C) 2003, 2004, 2005, 2006, 2007, 2008, 2009
3 Free Software Foundation, Inc.
4 Contributed by Sebastian Pop <s.pop@laposte.net>
6 This file is part of GCC.
8 GCC is free software; you can redistribute it and/or modify it under
9 the terms of the GNU General Public License as published by the Free
10 Software Foundation; either version 3, or (at your option) any later
11 version.
13 GCC is distributed in the hope that it will be useful, but WITHOUT ANY
14 WARRANTY; without even the implied warranty of MERCHANTABILITY or
15 FITNESS FOR A PARTICULAR PURPOSE. See the GNU General Public License
16 for more details.
18 You should have received a copy of the GNU General Public License
19 along with GCC; see the file COPYING3. If not see
20 <http://www.gnu.org/licenses/>. */
22 /*
23 Description:
25 This pass analyzes the evolution of scalar variables in loop
26 structures. The algorithm is based on the SSA representation,
27 and on the loop hierarchy tree. This algorithm is not based on
28 the notion of versions of a variable, as it was the case for the
29 previous implementations of the scalar evolution algorithm, but
30 it assumes that each defined name is unique.
32 The notation used in this file is called "chains of recurrences",
33 and has been proposed by Eugene Zima, Robert Van Engelen, and
34 others for describing induction variables in programs. For example
35 "b -> {0, +, 2}_1" means that the scalar variable "b" is equal to 0
36 when entering in the loop_1 and has a step 2 in this loop, in other
37 words "for (b = 0; b < N; b+=2);". Note that the coefficients of
38 this chain of recurrence (or chrec [shrek]) can contain the name of
39 other variables, in which case they are called parametric chrecs.
40 For example, "b -> {a, +, 2}_1" means that the initial value of "b"
41 is the value of "a". In most of the cases these parametric chrecs
42 are fully instantiated before their use because symbolic names can
43 hide some difficult cases such as self-references described later
44 (see the Fibonacci example).
46 A short sketch of the algorithm is:
48 Given a scalar variable to be analyzed, follow the SSA edge to
49 its definition:
51 - When the definition is a GIMPLE_ASSIGN: if the right hand side
52 (RHS) of the definition cannot be statically analyzed, the answer
53 of the analyzer is: "don't know".
54 Otherwise, for all the variables that are not yet analyzed in the
55 RHS, try to determine their evolution, and finally try to
56 evaluate the operation of the RHS that gives the evolution
57 function of the analyzed variable.
59 - When the definition is a condition-phi-node: determine the
60 evolution function for all the branches of the phi node, and
61 finally merge these evolutions (see chrec_merge).
63 - When the definition is a loop-phi-node: determine its initial
64 condition, that is the SSA edge defined in an outer loop, and
65 keep it symbolic. Then determine the SSA edges that are defined
66 in the body of the loop. Follow the inner edges until ending on
67 another loop-phi-node of the same analyzed loop. If the reached
68 loop-phi-node is not the starting loop-phi-node, then we keep
69 this definition under a symbolic form. If the reached
70 loop-phi-node is the same as the starting one, then we compute a
71 symbolic stride on the return path. The result is then the
72 symbolic chrec {initial_condition, +, symbolic_stride}_loop.
74 Examples:
76 Example 1: Illustration of the basic algorithm.
78 | a = 3
79 | loop_1
80 | b = phi (a, c)
81 | c = b + 1
82 | if (c > 10) exit_loop
83 | endloop
85 Suppose that we want to know the number of iterations of the
86 loop_1. The exit_loop is controlled by a COND_EXPR (c > 10). We
87 ask the scalar evolution analyzer two questions: what's the
88 scalar evolution (scev) of "c", and what's the scev of "10". For
89 "10" the answer is "10" since it is a scalar constant. For the
90 scalar variable "c", it follows the SSA edge to its definition,
91 "c = b + 1", and then asks again what's the scev of "b".
92 Following the SSA edge, we end on a loop-phi-node "b = phi (a,
93 c)", where the initial condition is "a", and the inner loop edge
94 is "c". The initial condition is kept under a symbolic form (it
95 may be the case that the copy constant propagation has done its
96 work and we end with the constant "3" as one of the edges of the
97 loop-phi-node). The update edge is followed to the end of the
98 loop, and until reaching again the starting loop-phi-node: b -> c
99 -> b. At this point we have drawn a path from "b" to "b" from
100 which we compute the stride in the loop: in this example it is
101 "+1". The resulting scev for "b" is "b -> {a, +, 1}_1". Now
102 that the scev for "b" is known, it is possible to compute the
103 scev for "c", that is "c -> {a + 1, +, 1}_1". In order to
104 determine the number of iterations in the loop_1, we have to
105 instantiate_parameters (loop_1, {a + 1, +, 1}_1), that gives after some
106 more analysis the scev {4, +, 1}_1, or in other words, this is
107 the function "f (x) = x + 4", where x is the iteration count of
108 the loop_1. Now we have to solve the inequality "x + 4 > 10",
109 and take the smallest iteration number for which the loop is
110 exited: x = 7. This loop runs from x = 0 to x = 7, and in total
111 there are 8 iterations. In terms of loop normalization, we have
112 created a variable that is implicitly defined, "x" or just "_1",
113 and all the other analyzed scalars of the loop are defined in
114 function of this variable:
116 a -> 3
117 b -> {3, +, 1}_1
118 c -> {4, +, 1}_1
120 or in terms of a C program:
122 | a = 3
123 | for (x = 0; x <= 7; x++)
124 | {
125 | b = x + 3
126 | c = x + 4
127 | }
129 Example 2a: Illustration of the algorithm on nested loops.
131 | loop_1
132 | a = phi (1, b)
133 | c = a + 2
134 | loop_2 10 times
135 | b = phi (c, d)
136 | d = b + 3
137 | endloop
138 | endloop
140 For analyzing the scalar evolution of "a", the algorithm follows
141 the SSA edge into the loop's body: "a -> b". "b" is an inner
142 loop-phi-node, and its analysis as in Example 1, gives:
144 b -> {c, +, 3}_2
145 d -> {c + 3, +, 3}_2
147 Following the SSA edge for the initial condition, we end on "c = a
148 + 2", and then on the starting loop-phi-node "a". From this point,
149 the loop stride is computed: back on "c = a + 2" we get a "+2" in
150 the loop_1, then on the loop-phi-node "b" we compute the overall
151 effect of the inner loop that is "b = c + 30", and we get a "+30"
152 in the loop_1. That means that the overall stride in loop_1 is
153 equal to "+32", and the result is:
155 a -> {1, +, 32}_1
156 c -> {3, +, 32}_1
158 Example 2b: Multivariate chains of recurrences.
160 | loop_1
161 | k = phi (0, k + 1)
162 | loop_2 4 times
163 | j = phi (0, j + 1)
164 | loop_3 4 times
165 | i = phi (0, i + 1)
166 | A[j + k] = ...
167 | endloop
168 | endloop
169 | endloop
171 Analyzing the access function of array A with
172 instantiate_parameters (loop_1, "j + k"), we obtain the
173 instantiation and the analysis of the scalar variables "j" and "k"
174 in loop_1. This leads to the scalar evolution {4, +, 1}_1: the end
175 value of loop_2 for "j" is 4, and the evolution of "k" in loop_1 is
176 {0, +, 1}_1. To obtain the evolution function in loop_3 and
177 instantiate the scalar variables up to loop_1, one has to use:
178 instantiate_scev (block_before_loop (loop_1), loop_3, "j + k").
179 The result of this call is {{0, +, 1}_1, +, 1}_2.
181 Example 3: Higher degree polynomials.
183 | loop_1
184 | a = phi (2, b)
185 | c = phi (5, d)
186 | b = a + 1
187 | d = c + a
188 | endloop
190 a -> {2, +, 1}_1
191 b -> {3, +, 1}_1
192 c -> {5, +, a}_1
193 d -> {5 + a, +, a}_1
195 instantiate_parameters (loop_1, {5, +, a}_1) -> {5, +, 2, +, 1}_1
196 instantiate_parameters (loop_1, {5 + a, +, a}_1) -> {7, +, 3, +, 1}_1
198 Example 4: Lucas, Fibonacci, or mixers in general.
200 | loop_1
201 | a = phi (1, b)
202 | c = phi (3, d)
203 | b = c
204 | d = c + a
205 | endloop
207 a -> (1, c)_1
208 c -> {3, +, a}_1
210 The syntax "(1, c)_1" stands for a PEELED_CHREC that has the
211 following semantics: during the first iteration of the loop_1, the
212 variable contains the value 1, and then it contains the value "c".
213 Note that this syntax is close to the syntax of the loop-phi-node:
214 "a -> (1, c)_1" vs. "a = phi (1, c)".
216 The symbolic chrec representation contains all the semantics of the
217 original code. What is more difficult is to use this information.
219 Example 5: Flip-flops, or exchangers.
221 | loop_1
222 | a = phi (1, b)
223 | c = phi (3, d)
224 | b = c
225 | d = a
226 | endloop
228 a -> (1, c)_1
229 c -> (3, a)_1
231 Based on these symbolic chrecs, it is possible to refine this
232 information into the more precise PERIODIC_CHRECs:
234 a -> |1, 3|_1
235 c -> |3, 1|_1
237 This transformation is not yet implemented.
239 Further readings:
241 You can find a more detailed description of the algorithm in:
242 http://icps.u-strasbg.fr/~pop/DEA_03_Pop.pdf
243 http://icps.u-strasbg.fr/~pop/DEA_03_Pop.ps.gz. But note that
244 this is a preliminary report and some of the details of the
245 algorithm have changed. I'm working on a research report that
246 updates the description of the algorithms to reflect the design
247 choices used in this implementation.
249 A set of slides show a high level overview of the algorithm and run
250 an example through the scalar evolution analyzer:
251 http://cri.ensmp.fr/~pop/gcc/mar04/slides.pdf
253 The slides that I have presented at the GCC Summit'04 are available
254 at: http://cri.ensmp.fr/~pop/gcc/20040604/gccsummit-lno-spop.pdf
255 */
265 /* These RTL headers are needed for basic-block.h. */
281 /* The cached information about an SSA name VAR, claiming that below
282 basic block INSTANTIATED_BELOW, the value of VAR can be expressed
283 as CHREC. */
286 basic_block instantiated_below;
287 tree var;
288 tree chrec;
289 };
291 /* Counters for the scev database. */
295 /* The following trees are unique elements. Thus the comparison of
296 another element to these elements should be done on the pointer to
297 these trees, and not on their value. */
299 /* The SSA_NAMEs that are not yet analyzed are qualified with NULL_TREE. */
300 tree chrec_not_analyzed_yet;
302 /* Reserved to the cases where the analyzer has detected an
303 undecidable property at compile time. */
304 tree chrec_dont_know;
306 /* When the analyzer has detected that a property will never
307 happen, then it qualifies it with chrec_known. */
308 tree chrec_known;
312 \f
313 /* Constructs a new SCEV_INFO_STR structure for VAR and INSTANTIATED_BELOW. */
317 {
326 }
328 /* Computes a hash function for database element ELT. */
330 static hashval_t
332 {
334 }
336 /* Compares database elements E1 and E2. */
338 static int
340 {
346 }
348 /* Deletes database element E. */
350 static void
352 {
354 }
356 /* Get the scalar evolution of VAR for INSTANTIATED_BELOW basic block.
357 A first query on VAR returns chrec_not_analyzed_yet. */
361 {
375 }
377 /* Return true when CHREC contains symbolic names defined in
378 LOOP_NB. */
380 bool
382 {
400 {
412 }
417 loop_nb))
420 }
422 /* Return true when PHI is a loop-phi-node. */
424 static bool
426 {
427 /* The implementation of this function is based on the following
428 property: "all the loop-phi-nodes of a loop are contained in the
429 loop's header basic block". */
432 }
434 /* Compute the scalar evolution for EVOLUTION_FN after crossing LOOP.
435 In general, in the case of multivariate evolutions we want to get
436 the evolution in different loops. LOOP specifies the level for
437 which to get the evolution.
439 Example:
441 | for (j = 0; j < 100; j++)
442 | {
443 | for (k = 0; k < 100; k++)
444 | {
445 | i = k + j; - Here the value of i is a function of j, k.
446 | }
447 | ... = i - Here the value of i is a function of j.
448 | }
449 | ... = i - Here the value of i is a scalar.
451 Example:
453 | i_0 = ...
454 | loop_1 10 times
455 | i_1 = phi (i_0, i_2)
456 | i_2 = i_1 + 2
457 | endloop
459 This loop has the same effect as:
460 LOOP_1 has the same effect as:
462 | i_1 = i_0 + 20
464 The overall effect of the loop, "i_0 + 20" in the previous example,
465 is obtained by passing in the parameters: LOOP = 1,
466 EVOLUTION_FN = {i_0, +, 2}_1.
467 */
469 static tree
471 {
478 {
483 {
488 else
489 {
490 tree res;
492 /* evolution_fn is the evolution function in LOOP. Get
493 its value in the nb_iter-th iteration. */
496 /* Continue the computation until ending on a parent of LOOP. */
498 }
499 }
500 else
502 }
504 /* If the evolution function is an invariant, there is nothing to do. */
508 else
510 }
512 /* Determine whether the CHREC is always positive/negative. If the expression
513 cannot be statically analyzed, return false, otherwise set the answer into
514 VALUE. */
516 bool
518 {
523 {
529 /* FIXME -- overflows. */
531 {
534 }
536 /* Otherwise the chrec is under the form: "{-197, +, 2}_1",
537 and the proof consists in showing that the sign never
538 changes during the execution of the loop, from 0 to
539 loop->nb_iterations. */
547 #if 0
548 /* TODO -- If the test is after the exit, we may decrease the number of
549 iterations by one. */
552 #endif
568 }
569 }
571 /* Associate CHREC to SCALAR. */
573 static void
575 {
584 {
586 {
595 }
597 nb_set_scev++;
598 }
601 }
603 /* Retrieve the chrec associated to SCALAR instantiated below
604 INSTANTIATED_BELOW block. */
606 static tree
608 {
609 tree res;
612 {
614 {
619 }
621 nb_get_scev++;
622 }
625 {
639 }
642 {
646 }
649 }
651 /* Helper function for add_to_evolution. Returns the evolution
652 function for an assignment of the form "a = b + c", where "a" and
653 "b" are on the strongly connected component. CHREC_BEFORE is the
654 information that we already have collected up to this point.
655 TO_ADD is the evolution of "c".
657 When CHREC_BEFORE has an evolution part in LOOP_NB, add to this
658 evolution the expression TO_ADD, otherwise construct an evolution
659 part for this loop. */
661 static tree
663 gimple at_stmt)
664 {
669 {
674 {
679 /* When there is no evolution part in this loop, build it. */
681 {
687 }
688 else
689 {
693 }
699 }
700 else
701 {
704 /* Search the evolution in LOOP_NB. */
711 }
714 /* These nodes do not depend on a loop. */
721 }
722 }
724 /* Add TO_ADD to the evolution part of CHREC_BEFORE in the dimension
725 of LOOP_NB.
727 Description (provided for completeness, for those who read code in
728 a plane, and for my poor 62 bytes brain that would have forgotten
729 all this in the next two or three months):
731 The algorithm of translation of programs from the SSA representation
732 into the chrecs syntax is based on a pattern matching. After having
733 reconstructed the overall tree expression for a loop, there are only
734 two cases that can arise:
736 1. a = loop-phi (init, a + expr)
737 2. a = loop-phi (init, expr)
739 where EXPR is either a scalar constant with respect to the analyzed
740 loop (this is a degree 0 polynomial), or an expression containing
741 other loop-phi definitions (these are higher degree polynomials).
743 Examples:
745 1.
746 | init = ...
747 | loop_1
748 | a = phi (init, a + 5)
749 | endloop
751 2.
752 | inita = ...
753 | initb = ...
754 | loop_1
755 | a = phi (inita, 2 * b + 3)
756 | b = phi (initb, b + 1)
757 | endloop
759 For the first case, the semantics of the SSA representation is:
761 | a (x) = init + \sum_{j = 0}^{x - 1} expr (j)
763 that is, there is a loop index "x" that determines the scalar value
764 of the variable during the loop execution. During the first
765 iteration, the value is that of the initial condition INIT, while
766 during the subsequent iterations, it is the sum of the initial
767 condition with the sum of all the values of EXPR from the initial
768 iteration to the before last considered iteration.
770 For the second case, the semantics of the SSA program is:
772 | a (x) = init, if x = 0;
773 | expr (x - 1), otherwise.
775 The second case corresponds to the PEELED_CHREC, whose syntax is
776 close to the syntax of a loop-phi-node:
778 | phi (init, expr) vs. (init, expr)_x
780 The proof of the translation algorithm for the first case is a
781 proof by structural induction based on the degree of EXPR.
783 Degree 0:
784 When EXPR is a constant with respect to the analyzed loop, or in
785 other words when EXPR is a polynomial of degree 0, the evolution of
786 the variable A in the loop is an affine function with an initial
787 condition INIT, and a step EXPR. In order to show this, we start
788 from the semantics of the SSA representation:
790 f (x) = init + \sum_{j = 0}^{x - 1} expr (j)
792 and since "expr (j)" is a constant with respect to "j",
794 f (x) = init + x * expr
796 Finally, based on the semantics of the pure sum chrecs, by
797 identification we get the corresponding chrecs syntax:
799 f (x) = init * \binom{x}{0} + expr * \binom{x}{1}
800 f (x) -> {init, +, expr}_x
802 Higher degree:
803 Suppose that EXPR is a polynomial of degree N with respect to the
804 analyzed loop_x for which we have already determined that it is
805 written under the chrecs syntax:
807 | expr (x) -> {b_0, +, b_1, +, ..., +, b_{n-1}} (x)
809 We start from the semantics of the SSA program:
811 | f (x) = init + \sum_{j = 0}^{x - 1} expr (j)
812 |
813 | f (x) = init + \sum_{j = 0}^{x - 1}
814 | (b_0 * \binom{j}{0} + ... + b_{n-1} * \binom{j}{n-1})
815 |
816 | f (x) = init + \sum_{j = 0}^{x - 1}
817 | \sum_{k = 0}^{n - 1} (b_k * \binom{j}{k})
818 |
819 | f (x) = init + \sum_{k = 0}^{n - 1}
820 | (b_k * \sum_{j = 0}^{x - 1} \binom{j}{k})
821 |
822 | f (x) = init + \sum_{k = 0}^{n - 1}
823 | (b_k * \binom{x}{k + 1})
824 |
825 | f (x) = init + b_0 * \binom{x}{1} + ...
826 | + b_{n-1} * \binom{x}{n}
827 |
828 | f (x) = init * \binom{x}{0} + b_0 * \binom{x}{1} + ...
829 | + b_{n-1} * \binom{x}{n}
830 |
832 And finally from the definition of the chrecs syntax, we identify:
833 | f (x) -> {init, +, b_0, +, ..., +, b_{n-1}}_x
835 This shows the mechanism that stands behind the add_to_evolution
836 function. An important point is that the use of symbolic
837 parameters avoids the need of an analysis schedule.
839 Example:
841 | inita = ...
842 | initb = ...
843 | loop_1
844 | a = phi (inita, a + 2 + b)
845 | b = phi (initb, b + 1)
846 | endloop
848 When analyzing "a", the algorithm keeps "b" symbolically:
850 | a -> {inita, +, 2 + b}_1
852 Then, after instantiation, the analyzer ends on the evolution:
854 | a -> {inita, +, 2 + initb, +, 1}_1
856 */
858 static tree
861 {
868 /* TO_ADD is either a scalar, or a parameter. TO_ADD is not
869 instantiated at this point. */
871 /* This should not happen. */
875 {
883 }
893 {
897 }
900 }
902 /* Helper function. */
906 tree res)
907 {
909 {
913 }
917 }
919 \f
921 /* This section selects the loops that will be good candidates for the
922 scalar evolution analysis. For the moment, greedily select all the
923 loop nests we could analyze. */
925 /* For a loop with a single exit edge, return the COND_EXPR that
926 guards the exit edge. If the expression is too difficult to
927 analyze, then give up. */
929 gimple
931 {
939 {
940 gimple stmt;
945 }
948 {
951 }
954 }
956 /* Recursively determine and enqueue the exit conditions for a loop. */
958 static void
961 {
965 /* Recurse on the inner loops, then on the next (sibling) loops. */
970 {
975 }
976 }
978 /* Select the candidate loop nests for the analysis. This function
979 initializes the EXIT_CONDITIONS array. */
981 static void
983 {
987 }
989 \f
990 /* Depth first search algorithm. */
993 t_false,
994 t_true,
995 t_dont_know
1001 /* Follow the ssa edge into the binary expression RHS0 CODE RHS1.
1002 Return true if the strongly connected component has been found. */
1004 static t_bool
1008 {
1010 tree evol;
1013 {
1017 {
1019 {
1020 /* Match an assignment under the form:
1021 "a = b + c". */
1023 /* We want only assignments of form "name + name" contribute to
1024 LIMIT, as the other cases do not necessarily contribute to
1025 the complexity of the expression. */
1026 limit++;
1029 res = follow_ssa_edge
1039 {
1040 res = follow_ssa_edge
1052 }
1056 }
1058 else
1059 {
1060 /* Match an assignment under the form:
1061 "a = b + ...". */
1062 res = follow_ssa_edge
1068 at_stmt),
1073 }
1074 }
1077 {
1078 /* Match an assignment under the form:
1079 "a = ... + c". */
1080 res = follow_ssa_edge
1086 at_stmt),
1091 }
1093 else
1094 /* Otherwise, match an assignment under the form:
1095 "a = ... + ...". */
1096 /* And there is nothing to do. */
1101 /* This case is under the form "opnd0 = rhs0 - rhs1". */
1103 {
1104 /* Match an assignment under the form:
1105 "a = b - ...". */
1107 /* We want only assignments of form "name - name" contribute to
1108 LIMIT, as the other cases do not necessarily contribute to
1109 the complexity of the expression. */
1111 limit++;
1122 }
1123 else
1124 /* Otherwise, match an assignment under the form:
1125 "a = ... - ...". */
1126 /* And there is nothing to do. */
1132 }
1135 }
1137 /* Follow the ssa edge into the expression EXPR.
1138 Return true if the strongly connected component has been found. */
1140 static t_bool
1143 {
1146 t_bool res;
1148 /* The EXPR is one of the following cases:
1149 - an SSA_NAME,
1150 - an INTEGER_CST,
1151 - a PLUS_EXPR,
1152 - a POINTER_PLUS_EXPR,
1153 - a MINUS_EXPR,
1154 - an ASSERT_EXPR,
1155 - other cases are not yet handled. */
1158 {
1159 CASE_CONVERT:
1160 /* This assignment is under the form "a_1 = (cast) rhs. */
1167 /* This assignment is under the form "a_1 = 7". */
1172 /* This assignment is under the form: "a_1 = b_2". */
1173 res = follow_ssa_edge
1180 /* This case is under the form "rhs0 +- rhs1". */
1191 /* This assignment is of the form: "a_1 = ASSERT_EXPR <a_2, ...>"
1192 It must be handled as a copy assignment of the form a_1 = a_2. */
1197 else
1204 }
1207 }
1209 /* Follow the ssa edge into the right hand side of an assignment STMT.
1210 Return true if the strongly connected component has been found. */
1212 static t_bool
1215 {
1218 t_bool res;
1221 {
1222 CASE_CONVERT:
1223 /* This assignment is under the form "a_1 = (cast) rhs. */
1243 else
1246 }
1249 }
1251 /* Checks whether the I-th argument of a PHI comes from a backedge. */
1253 static bool
1255 {
1258 /* We would in fact like to test EDGE_DFS_BACK here, but we do not care
1259 about updating it anywhere, and this should work as well most of the
1260 time. */
1265 }
1267 /* Helper function for one branch of the condition-phi-node. Return
1268 true if the strongly connected component has been found following
1269 this path. */
1274 gimple condition_phi,
1275 gimple halting_phi,
1278 {
1282 /* Do not follow back edges (they must belong to an irreducible loop, which
1283 we really do not want to worry about). */
1288 {
1292 }
1294 /* This case occurs when one of the condition branches sets
1295 the variable to a constant: i.e. a phi-node like
1296 "a_2 = PHI <a_7(5), 2(6)>;".
1298 FIXME: This case have to be refined correctly:
1299 in some cases it is possible to say something better than
1300 chrec_dont_know, for example using a wrap-around notation. */
1302 }
1304 /* This function merges the branches of a condition-phi-node in a
1305 loop. */
1307 static t_bool
1309 gimple condition_phi,
1310 gimple halting_phi,
1312 {
1315 tree evolution_of_branch;
1317 halting_phi,
1327 {
1328 /* Quickly give up when the evolution of one of the branches is
1329 not known. */
1333 /* Increase the limit by the PHI argument number to avoid exponential
1334 time and memory complexity. */
1336 halting_phi,
1343 evolution_of_branch);
1344 }
1347 }
1349 /* Follow an SSA edge in an inner loop. It computes the overall
1350 effect of the loop, and following the symbolic initial conditions,
1351 it follows the edges in the parent loop. The inner loop is
1352 considered as a single statement. */
1354 static t_bool
1356 gimple loop_phi_node,
1357 gimple halting_phi,
1359 {
1363 /* Sometimes, the inner loop is too difficult to analyze, and the
1364 result of the analysis is a symbolic parameter. */
1366 {
1371 {
1373 basic_block bb;
1375 /* Follow the edges that exit the inner loop. */
1383 }
1385 /* If the path crosses this loop-phi, give up. */
1390 }
1392 /* Otherwise, compute the overall effect of the inner loop. */
1396 }
1398 /* Follow an SSA edge from a loop-phi-node to itself, constructing a
1399 path that is analyzed on the return walk. */
1401 static t_bool
1404 {
1410 /* Give up if the path is longer than the MAX that we allow. */
1417 {
1420 /* DEF is a condition-phi-node. Follow the branches, and
1421 record their evolutions. Finally, merge the collected
1422 information and set the approximation to the main
1423 variable. */
1424 return follow_ssa_edge_in_condition_phi
1427 /* When the analyzed phi is the halting_phi, the
1428 depth-first search is over: we have found a path from
1429 the halting_phi to itself in the loop. */
1433 /* Otherwise, the evolution of the HALTING_PHI depends
1434 on the evolution of another loop-phi-node, i.e. the
1435 evolution function is a higher degree polynomial. */
1439 /* Inner loop. */
1441 return follow_ssa_edge_inner_loop_phi
1444 /* Outer loop. */
1452 /* At this level of abstraction, the program is just a set
1453 of GIMPLE_ASSIGNs and PHI_NODEs. In principle there is no
1454 other node to be handled. */
1456 }
1457 }
1459 \f
1461 /* Given a LOOP_PHI_NODE, this function determines the evolution
1462 function from LOOP_PHI_NODE to LOOP_PHI_NODE in the loop. */
1464 static tree
1466 tree init_cond)
1467 {
1471 basic_block bb;
1474 {
1479 }
1482 {
1484 gimple ssa_chain;
1485 tree ev_fn;
1486 t_bool res;
1488 /* Select the edges that enter the loop body. */
1494 {
1497 /* Pass in the initial condition to the follow edge function. */
1500 }
1501 else
1504 /* When it is impossible to go back on the same
1505 loop_phi_node by following the ssa edges, the
1506 evolution is represented by a peeled chrec, i.e. the
1507 first iteration, EV_FN has the value INIT_COND, then
1508 all the other iterations it has the value of ARG.
1509 For the moment, PEELED_CHREC nodes are not built. */
1513 /* When there are multiple back edges of the loop (which in fact never
1514 happens currently, but nevertheless), merge their evolutions. */
1516 }
1519 {
1523 }
1526 }
1528 /* Given a loop-phi-node, return the initial conditions of the
1529 variable on entry of the loop. When the CCP has propagated
1530 constants into the loop-phi-node, the initial condition is
1531 instantiated, otherwise the initial condition is kept symbolic.
1532 This analyzer does not analyze the evolution outside the current
1533 loop, and leaves this task to the on-demand tree reconstructor. */
1535 static tree
1537 {
1543 {
1548 }
1552 {
1556 /* When the branch is oriented to the loop's body, it does
1557 not contribute to the initial condition. */
1562 {
1565 }
1568 {
1571 }
1574 }
1576 /* Ooops -- a loop without an entry??? */
1580 /* During early loop unrolling we do not have fully constant propagated IL.
1581 Handle degenerate PHIs here to not miss important unrollings. */
1583 {
1585 tree res;
1588 /* Only allow invariants here, otherwise we may break
1589 loop-closed SSA form. */
1592 }
1595 {
1599 }
1602 }
1604 /* Analyze the scalar evolution for LOOP_PHI_NODE. */
1606 static tree
1608 {
1609 tree res;
1611 tree init_cond;
1614 {
1616 tree evolution_fn = analyze_scalar_evolution
1619 /* Dive one level deeper. */
1622 /* Interpret the subloop. */
1625 }
1627 /* Otherwise really interpret the loop phi. */
1632 }
1634 /* This function merges the branches of a condition-phi-node,
1635 contained in the outermost loop, and whose arguments are already
1636 analyzed. */
1638 static tree
1640 {
1645 {
1646 tree branch_chrec;
1649 {
1652 }
1654 branch_chrec = analyze_scalar_evolution
1658 }
1661 }
1663 /* Interpret the operation RHS1 OP RHS2. If we didn't
1664 analyze this node before, follow the definitions until ending
1665 either on an analyzed GIMPLE_ASSIGN, or on a loop-phi-node. On the
1666 return path, this function propagates evolutions (ala constant copy
1667 propagation). OPND1 is not a GIMPLE expression because we could
1668 analyze the effect of an inner loop: see interpret_loop_phi. */
1670 static tree
1673 {
1677 {
1683 at_stmt);
1686 {
1689 at_stmt);
1690 }
1693 }
1696 {
1724 /* TYPE may be integer, real or complex, so use fold_convert. */
1730 /* Handle ~X as -1 - X. */
1735 chrec1);
1746 CASE_CONVERT:
1754 }
1757 }
1759 /* Interpret the expression EXPR. */
1761 static tree
1763 {
1777 }
1779 /* Interpret the rhs of the assignment STMT. */
1781 static tree
1783 {
1790 }
1792 \f
1794 /* This section contains all the entry points:
1795 - number_of_iterations_in_loop,
1796 - analyze_scalar_evolution,
1797 - instantiate_parameters.
1798 */
1800 /* Compute and return the evolution function in WRTO_LOOP, the nearest
1801 common ancestor of DEF_LOOP and USE_LOOP. */
1803 static tree
1806 tree ev)
1807 {
1808 tree res;
1816 }
1818 /* Helper recursive function. */
1820 static tree
1822 {
1824 gimple def;
1825 basic_block bb;
1840 {
1841 /* Keep the symbolic form. */
1844 }
1847 {
1849 res = compute_scalar_evolution_in_loop
1853 }
1856 {
1861 }
1864 {
1872 else
1879 }
1881 set_and_end:
1883 /* Keep the symbolic form. */
1891 }
1893 /* Entry point for the scalar evolution analyzer.
1894 Analyzes and returns the scalar evolution of the ssa_name VAR.
1895 LOOP_NB is the identifier number of the loop in which the variable
1896 is used.
1898 Example of use: having a pointer VAR to a SSA_NAME node, STMT a
1899 pointer to the statement that uses this variable, in order to
1900 determine the evolution function of the variable, use the following
1901 calls:
1903 unsigned loop_nb = loop_containing_stmt (stmt)->num;
1904 tree chrec_with_symbols = analyze_scalar_evolution (loop_nb, var);
1905 tree chrec_instantiated = instantiate_parameters (loop, chrec_with_symbols);
1906 */
1908 tree
1910 {
1911 tree res;
1914 {
1920 }
1929 }
1931 /* Analyze scalar evolution of use of VERSION in USE_LOOP with respect to
1932 WRTO_LOOP (which should be a superloop of USE_LOOP)
1934 FOLDED_CASTS is set to true if resolve_mixers used
1935 chrec_convert_aggressive (TODO -- not really, we are way too conservative
1936 at the moment in order to keep things simple).
1938 To illustrate the meaning of USE_LOOP and WRTO_LOOP, consider the following
1939 example:
1941 for (i = 0; i < 100; i++) -- loop 1
1942 {
1943 for (j = 0; j < 100; j++) -- loop 2
1944 {
1945 k1 = i;
1946 k2 = j;
1948 use2 (k1, k2);
1950 for (t = 0; t < 100; t++) -- loop 3
1951 use3 (k1, k2);
1953 }
1954 use1 (k1, k2);
1955 }
1957 Both k1 and k2 are invariants in loop3, thus
1958 analyze_scalar_evolution_in_loop (loop3, loop3, k1) = k1
1959 analyze_scalar_evolution_in_loop (loop3, loop3, k2) = k2
1961 As they are invariant, it does not matter whether we consider their
1962 usage in loop 3 or loop 2, hence
1963 analyze_scalar_evolution_in_loop (loop2, loop3, k1) =
1964 analyze_scalar_evolution_in_loop (loop2, loop2, k1) = i
1965 analyze_scalar_evolution_in_loop (loop2, loop3, k2) =
1966 analyze_scalar_evolution_in_loop (loop2, loop2, k2) = [0,+,1]_2
1968 Similarly for their evolutions with respect to loop 1. The values of K2
1969 in the use in loop 2 vary independently on loop 1, thus we cannot express
1970 the evolution with respect to loop 1:
1971 analyze_scalar_evolution_in_loop (loop1, loop3, k1) =
1972 analyze_scalar_evolution_in_loop (loop1, loop2, k1) = [0,+,1]_1
1973 analyze_scalar_evolution_in_loop (loop1, loop3, k2) =
1974 analyze_scalar_evolution_in_loop (loop1, loop2, k2) = dont_know
1976 The value of k2 in the use in loop 1 is known, though:
1977 analyze_scalar_evolution_in_loop (loop1, loop1, k1) = [0,+,1]_1
1978 analyze_scalar_evolution_in_loop (loop1, loop1, k2) = 100
1979 */
1981 static tree
1984 {
1988 /* We cannot just do
1990 tmp = analyze_scalar_evolution (use_loop, version);
1991 ev = resolve_mixers (wrto_loop, tmp);
1993 as resolve_mixers would query the scalar evolution with respect to
1994 wrto_loop. For example, in the situation described in the function
1995 comment, suppose that wrto_loop = loop1, use_loop = loop3 and
1996 version = k2. Then
1998 analyze_scalar_evolution (use_loop, version) = k2
2000 and resolve_mixers (loop1, k2) finds that the value of k2 in loop 1
2001 is 100, which is a wrong result, since we are interested in the
2002 value in loop 3.
2004 Instead, we need to proceed from use_loop to wrto_loop loop by loop,
2005 each time checking that there is no evolution in the inner loop. */
2010 {
2020 /* If the value of the use changes in the inner loop, we cannot express
2021 its value in the outer loop (we might try to return interval chrec,
2022 but we do not have a user for it anyway) */
2028 }
2029 }
2031 /* Returns from CACHE the value for VERSION instantiated below
2032 INSTANTIATED_BELOW block. */
2034 static tree
2036 tree version)
2037 {
2046 else
2048 }
2050 /* Sets in CACHE the value of VERSION instantiated below basic block
2051 INSTANTIATED_BELOW to VAL. */
2053 static void
2056 {
2068 }
2070 /* Return the closed_loop_phi node for VAR. If there is none, return
2071 NULL_TREE. */
2073 static tree
2075 {
2077 edge exit;
2078 gimple phi;
2079 gimple_stmt_iterator psi;
2091 {
2095 }
2098 }
2100 /* Analyze all the parameters of the chrec, between INSTANTIATE_BELOW
2101 and EVOLUTION_LOOP, that were left under a symbolic form.
2103 CHREC is the scalar evolution to instantiate.
2105 CACHE is the cache of already instantiated values.
2107 FOLD_CONVERSIONS should be set to true when the conversions that
2108 may wrap in signed/pointer type are folded, as long as the value of
2109 the chrec is preserved.
2111 SIZE_EXPR is used for computing the size of the expression to be
2112 instantiated, and to stop if it exceeds some limit. */
2114 static tree
2118 {
2120 basic_block def_bb;
2124 /* Give up if the expression is larger than the MAX that we allow. */
2133 {
2137 /* A parameter (or loop invariant and we do not want to include
2138 evolutions in outer loops), nothing to do. */
2144 /* We cache the value of instantiated variable to avoid exponential
2145 time complexity due to reevaluations. We also store the convenient
2146 value in the cache in order to prevent infinite recursion -- we do
2147 not want to instantiate the SSA_NAME if it is in a mixer
2148 structure. This is used for avoiding the instantiation of
2149 recursively defined functions, such as:
2151 | a_2 -> {0, +, 1, +, a_2}_1 */
2162 /* If the analysis yields a parametric chrec, instantiate the
2163 result again. */
2166 /* Don't instantiate loop-closed-ssa phi nodes. */
2171 {
2174 else
2179 }
2185 /* Store the correct value to the cache. */
2192 size_expr);
2198 size_expr);
2204 {
2207 }
2214 size_expr);
2220 size_expr);
2226 {
2230 }
2236 size_expr);
2248 {
2252 }
2270 {
2274 }
2277 CASE_CONVERT:
2285 {
2289 }
2294 /* If we used chrec_convert_aggressive, we can no longer assume that
2295 signed chrecs do not overflow, as chrec_convert does, so avoid
2296 calling it in that case. */
2303 /* Handle ~X as -1 - X. */
2311 {
2315 integer_minus_one_node),
2316 op0);
2317 }
2328 }
2334 {
2395 }
2397 /* Too complicated to handle. */
2399 }
2401 /* Analyze all the parameters of the chrec that were left under a
2402 symbolic form. INSTANTIATE_BELOW is the basic block that stops the
2403 recursive instantiation of parameters: a parameter is a variable
2404 that is defined in a basic block that dominates INSTANTIATE_BELOW or
2405 a function parameter. */
2407 tree
2409 tree chrec)
2410 {
2411 tree res;
2415 {
2422 }
2428 {
2432 }
2437 }
2439 /* Similar to instantiate_parameters, but does not introduce the
2440 evolutions in outer loops for LOOP invariants in CHREC, and does not
2441 care about causing overflows, as long as they do not affect value
2442 of an expression. */
2444 tree
2446 {
2452 }
2454 /* Entry point for the analysis of the number of iterations pass.
2455 This function tries to safely approximate the number of iterations
2456 the loop will run. When this property is not decidable at compile
2457 time, the result is chrec_dont_know. Otherwise the result is
2458 a scalar or a symbolic parameter.
2460 Example of analysis: suppose that the loop has an exit condition:
2462 "if (b > 49) goto end_loop;"
2464 and that in a previous analysis we have determined that the
2465 variable 'b' has an evolution function:
2467 "EF = {23, +, 5}_2".
2469 When we evaluate the function at the point 5, i.e. the value of the
2470 variable 'b' after 5 iterations in the loop, we have EF (5) = 48,
2471 and EF (6) = 53. In this case the value of 'b' on exit is '53' and
2472 the loop body has been executed 6 times. */
2474 tree
2476 {
2478 edge exit;
2481 /* Determine whether the number_of_iterations_in_loop has already
2482 been computed. */
2503 else
2506 end:
2508 }
2510 /* Returns the number of executions of the exit condition of LOOP,
2511 i.e., the number by one higher than number_of_latch_executions.
2512 Note that unlike number_of_latch_executions, this number does
2513 not necessarily fit in the unsigned variant of the type of
2514 the control variable -- if the number of iterations is a constant,
2515 we return chrec_dont_know if adding one to number_of_latch_executions
2516 overflows; however, in case the number of iterations is symbolic
2517 expression, the caller is responsible for dealing with this
2518 the possible overflow. */
2520 tree
2522 {
2535 }
2537 /* One of the drivers for testing the scalar evolutions analysis.
2538 This function computes the number of iterations for all the loops
2539 from the EXIT_CONDITIONS array. */
2541 static void
2543 {
2547 gimple cond;
2550 {
2553 nb_chrec_dont_know_loops++;
2554 else
2555 nb_static_loops++;
2556 }
2559 {
2569 }
2570 }
2572 \f
2574 /* Counters for the stats. */
2576 struct chrec_stats
2577 {
2584 };
2586 /* Reset the counters. */
2590 {
2597 }
2599 /* Dump the contents of a CHREC_STATS structure. */
2601 static void
2603 {
2622 }
2624 /* Gather statistics about CHREC. */
2626 static void
2628 {
2630 {
2634 }
2639 {
2642 }
2645 {
2648 {
2652 }
2654 {
2658 }
2659 else
2660 {
2664 }
2670 }
2673 {
2677 }
2681 }
2683 /* One of the drivers for testing the scalar evolutions analysis.
2684 This function analyzes the scalar evolution of all the scalars
2685 defined as loop phi nodes in one of the loops from the
2686 EXIT_CONDITIONS array.
2688 TODO Optimization: A loop is in canonical form if it contains only
2689 a single scalar loop phi node. All the other scalars that have an
2690 evolution in the loop are rewritten in function of this single
2691 index. This allows the parallelization of the loop. */
2693 static void
2695 {
2699 gimple_stmt_iterator psi;
2704 {
2706 basic_block bb;
2707 tree chrec;
2713 {
2716 {
2717 chrec = instantiate_parameters
2723 }
2724 }
2725 }
2729 }
2731 /* Callback for htab_traverse, gathers information on chrecs in the
2732 hashtable. */
2734 static int
2736 {
2742 }
2744 /* Classify the chrecs of the whole database. */
2746 void
2748 {
2760 }
2762 \f
2764 /* Initializer. */
2766 static void
2768 {
2769 /* The elements below are unique. */
2771 {
2777 }
2778 }
2780 /* Initialize the analysis of scalar evolutions for LOOPS. */
2782 void
2784 {
2785 loop_iterator li;
2789 hash_scev_info,
2790 eq_scev_info,
2791 del_scev_info,
2792 ggc_calloc,
2793 ggc_free);
2798 {
2800 }
2801 }
2803 /* Cleans up the information cached by the scalar evolutions analysis. */
2805 void
2807 {
2808 loop_iterator li;
2816 {
2818 }
2819 }
2821 /* Checks whether use of OP in USE_LOOP behaves as a simple affine iv with
2822 respect to WRTO_LOOP and returns its base and step in IV if possible
2823 (see analyze_scalar_evolution_in_loop for more details on USE_LOOP
2824 and WRTO_LOOP). If ALLOW_NONCONSTANT_STEP is true, we want step to be
2825 invariant in LOOP. Otherwise we require it to be an integer constant.
2827 IV->no_overflow is set to true if we are sure the iv cannot overflow (e.g.
2828 because it is computed in signed arithmetics). Consequently, adding an
2829 induction variable
2831 for (i = IV->base; ; i += IV->step)
2833 is only safe if IV->no_overflow is false, or TYPE_OVERFLOW_UNDEFINED is
2834 false for the type of the induction variable, or you can prove that i does
2835 not wrap by some other argument. Otherwise, this might introduce undefined
2836 behavior, and
2838 for (i = iv->base; ; i = (type) ((unsigned type) i + (unsigned type) iv->step))
2840 must be used instead. */
2842 bool
2845 {
2865 {
2870 }
2888 }
2890 /* Runs the analysis of scalar evolutions. */
2892 void
2894 {
2905 }
2907 /* Finalize the scalar evolution analysis. */
2909 void
2911 {
2916 }
2918 /* Returns true if the expression EXPR is considered to be too expensive
2919 for scev_const_prop. */
2921 bool
2923 {
2939 {
2940 /* Division by power of two is usually cheap, so we allow it.
2941 Forbid anything else. */
2944 }
2947 {
2953 /* Fallthru. */
2959 }
2960 }
2962 /* Replace ssa names for that scev can prove they are constant by the
2963 appropriate constants. Also perform final value replacement in loops,
2964 in case the replacement expressions are cheap.
2966 We only consider SSA names defined by phi nodes; rest is left to the
2967 ordinary constant propagation pass. */
2969 unsigned int
2971 {
2972 basic_block bb;
2978 loop_iterator li;
2979 gimple_stmt_iterator psi;
2985 {
2989 {
3007 /* Replace the uses of the name. */
3014 }
3015 }
3017 /* Remove the ssa names that were replaced by constants. We do not
3018 remove them directly in the previous cycle, since this
3019 invalidates scev cache. */
3021 {
3022 bitmap_iterator bi;
3025 {
3026 gimple_stmt_iterator psi;
3033 }
3037 }
3039 /* Now the regular final value replacement. */
3041 {
3042 edge exit;
3044 gimple_stmt_iterator bsi;
3046 /* If we do not know exact number of iterations of the loop, we cannot
3047 replace the final value. */
3056 /* Ensure that it is possible to insert new statements somewhere. */
3065 {
3070 {
3073 }
3077 {
3080 }
3086 /* Moving the computation from the loop may prolong life range
3087 of some ssa names, which may cause problems if they appear
3088 on abnormal edges. */
3090 /* Do not emit expensive expressions. The rationale is that
3091 when someone writes a code like
3093 while (n > 45) n -= 45;
3095 he probably knows that n is not large, and does not want it
3096 to be turned into n %= 45. */
3098 {
3101 }
3103 /* Eliminate the PHI node and replace it by a computation outside
3104 the loop. */
3112 }
3113 }
3115 }