524 lines
15 KiB
C
524 lines
15 KiB
C
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/* Global, SSA-based optimizations using mathematical identities.
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Copyright (C) 2005 Free Software Foundation, Inc.
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This file is part of GCC.
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GCC is free software; you can redistribute it and/or modify it
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under the terms of the GNU General Public License as published by the
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Free Software Foundation; either version 2, or (at your option) any
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later version.
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GCC is distributed in the hope that it will be useful, but WITHOUT
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ANY WARRANTY; without even the implied warranty of MERCHANTABILITY or
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FITNESS FOR A PARTICULAR PURPOSE. See the GNU General Public License
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for more details.
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You should have received a copy of the GNU General Public License
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along with GCC; see the file COPYING. If not, write to the Free
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Software Foundation, 51 Franklin Street, Fifth Floor, Boston, MA
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02110-1301, USA. */
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/* Currently, the only mini-pass in this file tries to CSE reciprocal
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operations. These are common in sequences such as this one:
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modulus = sqrt(x*x + y*y + z*z);
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x = x / modulus;
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y = y / modulus;
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z = z / modulus;
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that can be optimized to
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modulus = sqrt(x*x + y*y + z*z);
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rmodulus = 1.0 / modulus;
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x = x * rmodulus;
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y = y * rmodulus;
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z = z * rmodulus;
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We do this for loop invariant divisors, and with this pass whenever
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we notice that a division has the same divisor multiple times.
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Of course, like in PRE, we don't insert a division if a dominator
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already has one. However, this cannot be done as an extension of
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PRE for several reasons.
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First of all, with some experiments it was found out that the
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transformation is not always useful if there are only two divisions
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hy the same divisor. This is probably because modern processors
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can pipeline the divisions; on older, in-order processors it should
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still be effective to optimize two divisions by the same number.
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We make this a param, and it shall be called N in the remainder of
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this comment.
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Second, if trapping math is active, we have less freedom on where
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to insert divisions: we can only do so in basic blocks that already
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contain one. (If divisions don't trap, instead, we can insert
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divisions elsewhere, which will be in blocks that are common dominators
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of those that have the division).
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We really don't want to compute the reciprocal unless a division will
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be found. To do this, we won't insert the division in a basic block
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that has less than N divisions *post-dominating* it.
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The algorithm constructs a subset of the dominator tree, holding the
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blocks containing the divisions and the common dominators to them,
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and walk it twice. The first walk is in post-order, and it annotates
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each block with the number of divisions that post-dominate it: this
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gives information on where divisions can be inserted profitably.
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The second walk is in pre-order, and it inserts divisions as explained
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above, and replaces divisions by multiplications.
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In the best case, the cost of the pass is O(n_statements). In the
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worst-case, the cost is due to creating the dominator tree subset,
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with a cost of O(n_basic_blocks ^ 2); however this can only happen
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for n_statements / n_basic_blocks statements. So, the amortized cost
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of creating the dominator tree subset is O(n_basic_blocks) and the
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worst-case cost of the pass is O(n_statements * n_basic_blocks).
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More practically, the cost will be small because there are few
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divisions, and they tend to be in the same basic block, so insert_bb
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is called very few times.
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If we did this using domwalk.c, an efficient implementation would have
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to work on all the variables in a single pass, because we could not
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work on just a subset of the dominator tree, as we do now, and the
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cost would also be something like O(n_statements * n_basic_blocks).
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The data structures would be more complex in order to work on all the
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variables in a single pass. */
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#include "config.h"
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#include "system.h"
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#include "coretypes.h"
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#include "tm.h"
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#include "flags.h"
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#include "tree.h"
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#include "tree-flow.h"
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#include "real.h"
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#include "timevar.h"
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#include "tree-pass.h"
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#include "alloc-pool.h"
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#include "basic-block.h"
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#include "target.h"
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/* This structure represents one basic block that either computes a
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division, or is a common dominator for basic block that compute a
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division. */
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struct occurrence {
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/* The basic block represented by this structure. */
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basic_block bb;
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/* If non-NULL, the SSA_NAME holding the definition for a reciprocal
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inserted in BB. */
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tree recip_def;
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/* If non-NULL, the MODIFY_EXPR for a reciprocal computation that
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was inserted in BB. */
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tree recip_def_stmt;
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/* Pointer to a list of "struct occurrence"s for blocks dominated
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by BB. */
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struct occurrence *children;
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/* Pointer to the next "struct occurrence"s in the list of blocks
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sharing a common dominator. */
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struct occurrence *next;
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/* The number of divisions that are in BB before compute_merit. The
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number of divisions that are in BB or post-dominate it after
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compute_merit. */
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int num_divisions;
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/* True if the basic block has a division, false if it is a common
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dominator for basic blocks that do. If it is false and trapping
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math is active, BB is not a candidate for inserting a reciprocal. */
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bool bb_has_division;
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};
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/* The instance of "struct occurrence" representing the highest
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interesting block in the dominator tree. */
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static struct occurrence *occ_head;
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/* Allocation pool for getting instances of "struct occurrence". */
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static alloc_pool occ_pool;
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/* Allocate and return a new struct occurrence for basic block BB, and
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whose children list is headed by CHILDREN. */
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static struct occurrence *
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occ_new (basic_block bb, struct occurrence *children)
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{
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struct occurrence *occ;
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occ = bb->aux = pool_alloc (occ_pool);
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memset (occ, 0, sizeof (struct occurrence));
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occ->bb = bb;
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occ->children = children;
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return occ;
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}
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/* Insert NEW_OCC into our subset of the dominator tree. P_HEAD points to a
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list of "struct occurrence"s, one per basic block, having IDOM as
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their common dominator.
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We try to insert NEW_OCC as deep as possible in the tree, and we also
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insert any other block that is a common dominator for BB and one
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block already in the tree. */
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static void
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insert_bb (struct occurrence *new_occ, basic_block idom,
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struct occurrence **p_head)
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{
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struct occurrence *occ, **p_occ;
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for (p_occ = p_head; (occ = *p_occ) != NULL; )
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{
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basic_block bb = new_occ->bb, occ_bb = occ->bb;
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basic_block dom = nearest_common_dominator (CDI_DOMINATORS, occ_bb, bb);
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if (dom == bb)
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{
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/* BB dominates OCC_BB. OCC becomes NEW_OCC's child: remove OCC
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from its list. */
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*p_occ = occ->next;
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occ->next = new_occ->children;
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new_occ->children = occ;
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/* Try the next block (it may as well be dominated by BB). */
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}
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else if (dom == occ_bb)
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{
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/* OCC_BB dominates BB. Tail recurse to look deeper. */
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insert_bb (new_occ, dom, &occ->children);
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return;
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}
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else if (dom != idom)
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{
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gcc_assert (!dom->aux);
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/* There is a dominator between IDOM and BB, add it and make
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two children out of NEW_OCC and OCC. First, remove OCC from
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its list. */
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*p_occ = occ->next;
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new_occ->next = occ;
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occ->next = NULL;
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/* None of the previous blocks has DOM as a dominator: if we tail
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recursed, we would reexamine them uselessly. Just switch BB with
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DOM, and go on looking for blocks dominated by DOM. */
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new_occ = occ_new (dom, new_occ);
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}
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else
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{
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/* Nothing special, go on with the next element. */
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p_occ = &occ->next;
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}
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}
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/* No place was found as a child of IDOM. Make BB a sibling of IDOM. */
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new_occ->next = *p_head;
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*p_head = new_occ;
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}
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/* Register that we found a division in BB. */
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static inline void
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register_division_in (basic_block bb)
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{
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struct occurrence *occ;
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occ = (struct occurrence *) bb->aux;
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if (!occ)
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{
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occ = occ_new (bb, NULL);
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insert_bb (occ, ENTRY_BLOCK_PTR, &occ_head);
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}
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occ->bb_has_division = true;
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occ->num_divisions++;
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}
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/* Compute the number of divisions that postdominate each block in OCC and
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its children. */
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static void
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compute_merit (struct occurrence *occ)
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{
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struct occurrence *occ_child;
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basic_block dom = occ->bb;
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for (occ_child = occ->children; occ_child; occ_child = occ_child->next)
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{
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basic_block bb;
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if (occ_child->children)
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compute_merit (occ_child);
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if (flag_exceptions)
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bb = single_noncomplex_succ (dom);
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else
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bb = dom;
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if (dominated_by_p (CDI_POST_DOMINATORS, bb, occ_child->bb))
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occ->num_divisions += occ_child->num_divisions;
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}
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}
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/* Return whether USE_STMT is a floating-point division by DEF. */
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static inline bool
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is_division_by (tree use_stmt, tree def)
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{
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return TREE_CODE (use_stmt) == MODIFY_EXPR
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&& TREE_CODE (TREE_OPERAND (use_stmt, 1)) == RDIV_EXPR
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&& TREE_OPERAND (TREE_OPERAND (use_stmt, 1), 1) == def;
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}
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/* Walk the subset of the dominator tree rooted at OCC, setting the
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RECIP_DEF field to a definition of 1.0 / DEF that can be used in
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the given basic block. The field may be left NULL, of course,
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if it is not possible or profitable to do the optimization.
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DEF_BSI is an iterator pointing at the statement defining DEF.
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If RECIP_DEF is set, a dominator already has a computation that can
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be used. */
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static void
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insert_reciprocals (block_stmt_iterator *def_bsi, struct occurrence *occ,
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tree def, tree recip_def, int threshold)
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{
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tree type, new_stmt;
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block_stmt_iterator bsi;
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struct occurrence *occ_child;
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if (!recip_def
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&& (occ->bb_has_division || !flag_trapping_math)
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&& occ->num_divisions >= threshold)
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{
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/* Make a variable with the replacement and substitute it. */
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type = TREE_TYPE (def);
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recip_def = make_rename_temp (type, "reciptmp");
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new_stmt = build2 (MODIFY_EXPR, void_type_node, recip_def,
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fold_build2 (RDIV_EXPR, type, build_one_cst (type),
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def));
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if (occ->bb_has_division)
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{
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/* Case 1: insert before an existing division. */
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bsi = bsi_after_labels (occ->bb);
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while (!bsi_end_p (bsi) && !is_division_by (bsi_stmt (bsi), def))
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bsi_next (&bsi);
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bsi_insert_before (&bsi, new_stmt, BSI_SAME_STMT);
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}
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else if (def_bsi && occ->bb == def_bsi->bb)
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{
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/* Case 2: insert right after the definition. Note that this will
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never happen if the definition statement can throw, because in
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that case the sole successor of the statement's basic block will
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dominate all the uses as well. */
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bsi_insert_after (def_bsi, new_stmt, BSI_NEW_STMT);
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}
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else
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{
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/* Case 3: insert in a basic block not containing defs/uses. */
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bsi = bsi_after_labels (occ->bb);
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bsi_insert_before (&bsi, new_stmt, BSI_SAME_STMT);
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}
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occ->recip_def_stmt = new_stmt;
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}
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occ->recip_def = recip_def;
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for (occ_child = occ->children; occ_child; occ_child = occ_child->next)
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insert_reciprocals (def_bsi, occ_child, def, recip_def, threshold);
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}
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/* Replace the division at USE_P with a multiplication by the reciprocal, if
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possible. */
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static inline void
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replace_reciprocal (use_operand_p use_p)
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{
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tree use_stmt = USE_STMT (use_p);
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basic_block bb = bb_for_stmt (use_stmt);
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struct occurrence *occ = (struct occurrence *) bb->aux;
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if (occ->recip_def && use_stmt != occ->recip_def_stmt)
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{
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TREE_SET_CODE (TREE_OPERAND (use_stmt, 1), MULT_EXPR);
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SET_USE (use_p, occ->recip_def);
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fold_stmt_inplace (use_stmt);
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update_stmt (use_stmt);
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}
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}
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/* Free OCC and return one more "struct occurrence" to be freed. */
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static struct occurrence *
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free_bb (struct occurrence *occ)
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{
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struct occurrence *child, *next;
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/* First get the two pointers hanging off OCC. */
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next = occ->next;
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child = occ->children;
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occ->bb->aux = NULL;
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pool_free (occ_pool, occ);
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/* Now ensure that we don't recurse unless it is necessary. */
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if (!child)
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return next;
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else
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{
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while (next)
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next = free_bb (next);
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return child;
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}
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}
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/* Look for floating-point divisions among DEF's uses, and try to
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replace them by multiplications with the reciprocal. Add
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as many statements computing the reciprocal as needed.
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DEF must be a GIMPLE register of a floating-point type. */
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static void
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execute_cse_reciprocals_1 (block_stmt_iterator *def_bsi, tree def)
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{
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use_operand_p use_p;
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imm_use_iterator use_iter;
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struct occurrence *occ;
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int count = 0, threshold;
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gcc_assert (FLOAT_TYPE_P (TREE_TYPE (def)) && is_gimple_reg (def));
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FOR_EACH_IMM_USE_FAST (use_p, use_iter, def)
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{
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tree use_stmt = USE_STMT (use_p);
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if (is_division_by (use_stmt, def))
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{
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register_division_in (bb_for_stmt (use_stmt));
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count++;
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}
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}
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/* Do the expensive part only if we can hope to optimize something. */
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threshold = targetm.min_divisions_for_recip_mul (TYPE_MODE (TREE_TYPE (def)));
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if (count >= threshold)
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{
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tree use_stmt;
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for (occ = occ_head; occ; occ = occ->next)
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{
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compute_merit (occ);
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insert_reciprocals (def_bsi, occ, def, NULL, threshold);
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}
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FOR_EACH_IMM_USE_STMT (use_stmt, use_iter, def)
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{
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if (is_division_by (use_stmt, def))
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{
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FOR_EACH_IMM_USE_ON_STMT (use_p, use_iter)
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replace_reciprocal (use_p);
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}
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}
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}
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for (occ = occ_head; occ; )
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occ = free_bb (occ);
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|
occ_head = NULL;
|
||
|
}
|
||
|
|
||
|
|
||
|
static bool
|
||
|
gate_cse_reciprocals (void)
|
||
|
{
|
||
|
return optimize && !optimize_size && flag_unsafe_math_optimizations;
|
||
|
}
|
||
|
|
||
|
|
||
|
/* Go through all the floating-point SSA_NAMEs, and call
|
||
|
execute_cse_reciprocals_1 on each of them. */
|
||
|
static unsigned int
|
||
|
execute_cse_reciprocals (void)
|
||
|
{
|
||
|
basic_block bb;
|
||
|
tree arg;
|
||
|
|
||
|
occ_pool = create_alloc_pool ("dominators for recip",
|
||
|
sizeof (struct occurrence),
|
||
|
n_basic_blocks / 3 + 1);
|
||
|
|
||
|
calculate_dominance_info (CDI_DOMINATORS);
|
||
|
calculate_dominance_info (CDI_POST_DOMINATORS);
|
||
|
|
||
|
#ifdef ENABLE_CHECKING
|
||
|
FOR_EACH_BB (bb)
|
||
|
gcc_assert (!bb->aux);
|
||
|
#endif
|
||
|
|
||
|
for (arg = DECL_ARGUMENTS (cfun->decl); arg; arg = TREE_CHAIN (arg))
|
||
|
if (default_def (arg)
|
||
|
&& FLOAT_TYPE_P (TREE_TYPE (arg))
|
||
|
&& is_gimple_reg (arg))
|
||
|
execute_cse_reciprocals_1 (NULL, default_def (arg));
|
||
|
|
||
|
FOR_EACH_BB (bb)
|
||
|
{
|
||
|
block_stmt_iterator bsi;
|
||
|
tree phi, def;
|
||
|
|
||
|
for (phi = phi_nodes (bb); phi; phi = PHI_CHAIN (phi))
|
||
|
{
|
||
|
def = PHI_RESULT (phi);
|
||
|
if (FLOAT_TYPE_P (TREE_TYPE (def))
|
||
|
&& is_gimple_reg (def))
|
||
|
execute_cse_reciprocals_1 (NULL, def);
|
||
|
}
|
||
|
|
||
|
for (bsi = bsi_after_labels (bb); !bsi_end_p (bsi); bsi_next (&bsi))
|
||
|
{
|
||
|
tree stmt = bsi_stmt (bsi);
|
||
|
if (TREE_CODE (stmt) == MODIFY_EXPR
|
||
|
&& (def = SINGLE_SSA_TREE_OPERAND (stmt, SSA_OP_DEF)) != NULL
|
||
|
&& FLOAT_TYPE_P (TREE_TYPE (def))
|
||
|
&& TREE_CODE (def) == SSA_NAME)
|
||
|
execute_cse_reciprocals_1 (&bsi, def);
|
||
|
}
|
||
|
}
|
||
|
|
||
|
free_dominance_info (CDI_DOMINATORS);
|
||
|
free_dominance_info (CDI_POST_DOMINATORS);
|
||
|
free_alloc_pool (occ_pool);
|
||
|
return 0;
|
||
|
}
|
||
|
|
||
|
struct tree_opt_pass pass_cse_reciprocals =
|
||
|
{
|
||
|
"recip", /* name */
|
||
|
gate_cse_reciprocals, /* gate */
|
||
|
execute_cse_reciprocals, /* execute */
|
||
|
NULL, /* sub */
|
||
|
NULL, /* next */
|
||
|
0, /* static_pass_number */
|
||
|
0, /* tv_id */
|
||
|
PROP_ssa, /* properties_required */
|
||
|
0, /* properties_provided */
|
||
|
0, /* properties_destroyed */
|
||
|
0, /* todo_flags_start */
|
||
|
TODO_dump_func | TODO_update_ssa | TODO_verify_ssa
|
||
|
| TODO_verify_stmts, /* todo_flags_finish */
|
||
|
0 /* letter */
|
||
|
};
|