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1 /* Global, SSA-based optimizations using mathematical identities.
2 Copyright (C) 2005 Free Software Foundation, Inc.
4 This file is part of GCC.
6 GCC is free software; you can redistribute it and/or modify it
7 under the terms of the GNU General Public License as published by the
8 Free Software Foundation; either version 2, or (at your option) any
9 later version.
11 GCC is distributed in the hope that it will be useful, but WITHOUT
12 ANY WARRANTY; without even the implied warranty of MERCHANTABILITY or
13 FITNESS FOR A PARTICULAR PURPOSE. See the GNU General Public License
14 for more details.
16 You should have received a copy of the GNU General Public License
17 along with GCC; see the file COPYING. If not, write to the Free
18 Software Foundation, 51 Franklin Street, Fifth Floor, Boston, MA
19 02110-1301, USA. */
21 /* Currently, the only mini-pass in this file tries to CSE reciprocal
22 operations. These are common in sequences such as this one:
24 modulus = sqrt(x*x + y*y + z*z);
25 x = x / modulus;
26 y = y / modulus;
27 z = z / modulus;
29 that can be optimized to
31 modulus = sqrt(x*x + y*y + z*z);
32 rmodulus = 1.0 / modulus;
33 x = x * rmodulus;
34 y = y * rmodulus;
35 z = z * rmodulus;
37 We do this for loop invariant divisors, and with this pass whenever
38 we notice that a division has the same divisor multiple times.
40 Of course, like in PRE, we don't insert a division if a dominator
41 already has one. However, this cannot be done as an extension of
42 PRE for several reasons.
44 First of all, with some experiments it was found out that the
45 transformation is not always useful if there are only two divisions
46 hy the same divisor. This is probably because modern processors
47 can pipeline the divisions; on older, in-order processors it should
48 still be effective to optimize two divisions by the same number.
49 We make this a param, and it shall be called N in the remainder of
50 this comment.
52 Second, if trapping math is active, we have less freedom on where
53 to insert divisions: we can only do so in basic blocks that already
54 contain one. (If divisions don't trap, instead, we can insert
55 divisions elsewhere, which will be in blocks that are common dominators
56 of those that have the division).
58 We really don't want to compute the reciprocal unless a division will
59 be found. To do this, we won't insert the division in a basic block
60 that has less than N divisions *post-dominating* it.
62 The algorithm constructs a subset of the dominator tree, holding the
63 blocks containing the divisions and the common dominators to them,
64 and walk it twice. The first walk is in post-order, and it annotates
65 each block with the number of divisions that post-dominate it: this
66 gives information on where divisions can be inserted profitably.
67 The second walk is in pre-order, and it inserts divisions as explained
68 above, and replaces divisions by multiplications.
70 In the best case, the cost of the pass is O(n_statements). In the
71 worst-case, the cost is due to creating the dominator tree subset,
72 with a cost of O(n_basic_blocks ^ 2); however this can only happen
73 for n_statements / n_basic_blocks statements. So, the amortized cost
74 of creating the dominator tree subset is O(n_basic_blocks) and the
75 worst-case cost of the pass is O(n_statements * n_basic_blocks).
77 More practically, the cost will be small because there are few
78 divisions, and they tend to be in the same basic block, so insert_bb
79 is called very few times.
81 If we did this using domwalk.c, an efficient implementation would have
82 to work on all the variables in a single pass, because we could not
83 work on just a subset of the dominator tree, as we do now, and the
84 cost would also be something like O(n_statements * n_basic_blocks).
85 The data structures would be more complex in order to work on all the
86 variables in a single pass. */
103 /* This structure represents one basic block that either computes a
104 division, or is a common dominator for basic block that compute a
105 division. */
107 /* The basic block represented by this structure. */
108 basic_block bb;
110 /* If non-NULL, the SSA_NAME holding the definition for a reciprocal
111 inserted in BB. */
112 tree recip_def;
114 /* If non-NULL, the GIMPLE_MODIFY_STMT for a reciprocal computation that
115 was inserted in BB. */
116 tree recip_def_stmt;
118 /* Pointer to a list of "struct occurrence"s for blocks dominated
119 by BB. */
122 /* Pointer to the next "struct occurrence"s in the list of blocks
123 sharing a common dominator. */
126 /* The number of divisions that are in BB before compute_merit. The
127 number of divisions that are in BB or post-dominate it after
128 compute_merit. */
131 /* True if the basic block has a division, false if it is a common
132 dominator for basic blocks that do. If it is false and trapping
133 math is active, BB is not a candidate for inserting a reciprocal. */
135 };
138 /* The instance of "struct occurrence" representing the highest
139 interesting block in the dominator tree. */
142 /* Allocation pool for getting instances of "struct occurrence". */
147 /* Allocate and return a new struct occurrence for basic block BB, and
148 whose children list is headed by CHILDREN. */
151 {
160 }
163 /* Insert NEW_OCC into our subset of the dominator tree. P_HEAD points to a
164 list of "struct occurrence"s, one per basic block, having IDOM as
165 their common dominator.
167 We try to insert NEW_OCC as deep as possible in the tree, and we also
168 insert any other block that is a common dominator for BB and one
169 block already in the tree. */
171 static void
174 {
178 {
182 {
183 /* BB dominates OCC_BB. OCC becomes NEW_OCC's child: remove OCC
184 from its list. */
189 /* Try the next block (it may as well be dominated by BB). */
190 }
193 {
194 /* OCC_BB dominates BB. Tail recurse to look deeper. */
197 }
200 {
203 /* There is a dominator between IDOM and BB, add it and make
204 two children out of NEW_OCC and OCC. First, remove OCC from
205 its list. */
210 /* None of the previous blocks has DOM as a dominator: if we tail
211 recursed, we would reexamine them uselessly. Just switch BB with
212 DOM, and go on looking for blocks dominated by DOM. */
214 }
216 else
217 {
218 /* Nothing special, go on with the next element. */
220 }
221 }
223 /* No place was found as a child of IDOM. Make BB a sibling of IDOM. */
226 }
228 /* Register that we found a division in BB. */
232 {
237 {
240 }
244 }
247 /* Compute the number of divisions that postdominate each block in OCC and
248 its children. */
250 static void
252 {
257 {
258 basic_block bb;
264 else
269 }
270 }
273 /* Return whether USE_STMT is a floating-point division by DEF. */
276 {
280 }
282 /* Walk the subset of the dominator tree rooted at OCC, setting the
283 RECIP_DEF field to a definition of 1.0 / DEF that can be used in
284 the given basic block. The field may be left NULL, of course,
285 if it is not possible or profitable to do the optimization.
287 DEF_BSI is an iterator pointing at the statement defining DEF.
288 If RECIP_DEF is set, a dominator already has a computation that can
289 be used. */
291 static void
294 {
296 block_stmt_iterator bsi;
302 {
303 /* Make a variable with the replacement and substitute it. */
308 def));
312 {
313 /* Case 1: insert before an existing division. */
319 }
321 {
322 /* Case 2: insert right after the definition. Note that this will
323 never happen if the definition statement can throw, because in
324 that case the sole successor of the statement's basic block will
325 dominate all the uses as well. */
327 }
328 else
329 {
330 /* Case 3: insert in a basic block not containing defs/uses. */
333 }
336 }
341 }
344 /* Replace the division at USE_P with a multiplication by the reciprocal, if
345 possible. */
349 {
355 {
360 }
361 }
364 /* Free OCC and return one more "struct occurrence" to be freed. */
368 {
371 /* First get the two pointers hanging off OCC. */
377 /* Now ensure that we don't recurse unless it is necessary. */
380 else
381 {
386 }
387 }
390 /* Look for floating-point divisions among DEF's uses, and try to
391 replace them by multiplications with the reciprocal. Add
392 as many statements computing the reciprocal as needed.
394 DEF must be a GIMPLE register of a floating-point type. */
396 static void
398 {
399 use_operand_p use_p;
400 imm_use_iterator use_iter;
407 {
410 {
412 count++;
413 }
414 }
416 /* Do the expensive part only if we can hope to optimize something. */
419 {
420 tree use_stmt;
422 {
425 }
428 {
430 {
433 }
434 }
435 }
441 }
444 static bool
446 {
448 }
451 /* Go through all the floating-point SSA_NAMEs, and call
452 execute_cse_reciprocals_1 on each of them. */
453 static unsigned int
455 {
456 basic_block bb;
457 tree arg;
466 #ifdef ENABLE_CHECKING
469 #endif
478 {
479 block_stmt_iterator bsi;
483 {
488 }
491 {
498 }
499 }
505 }
508 {
523 };