llvm-project/llvm/lib/Transforms/Scalar/LoopPredication.cpp

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//===-- LoopPredication.cpp - Guard based loop predication pass -----------===//
//
// Part of the LLVM Project, under the Apache License v2.0 with LLVM Exceptions.
// See https://llvm.org/LICENSE.txt for license information.
// SPDX-License-Identifier: Apache-2.0 WITH LLVM-exception
//
//===----------------------------------------------------------------------===//
//
// The LoopPredication pass tries to convert loop variant range checks to loop
// invariant by widening checks across loop iterations. For example, it will
// convert
//
// for (i = 0; i < n; i++) {
// guard(i < len);
// ...
// }
//
// to
//
// for (i = 0; i < n; i++) {
// guard(n - 1 < len);
// ...
// }
//
// After this transformation the condition of the guard is loop invariant, so
// loop-unswitch can later unswitch the loop by this condition which basically
// predicates the loop by the widened condition:
//
// if (n - 1 < len)
// for (i = 0; i < n; i++) {
// ...
// }
// else
// deoptimize
//
// It's tempting to rely on SCEV here, but it has proven to be problematic.
// Generally the facts SCEV provides about the increment step of add
// recurrences are true if the backedge of the loop is taken, which implicitly
// assumes that the guard doesn't fail. Using these facts to optimize the
// guard results in a circular logic where the guard is optimized under the
// assumption that it never fails.
//
// For example, in the loop below the induction variable will be marked as nuw
// basing on the guard. Basing on nuw the guard predicate will be considered
// monotonic. Given a monotonic condition it's tempting to replace the induction
// variable in the condition with its value on the last iteration. But this
// transformation is not correct, e.g. e = 4, b = 5 breaks the loop.
//
// for (int i = b; i != e; i++)
// guard(i u< len)
//
// One of the ways to reason about this problem is to use an inductive proof
// approach. Given the loop:
//
// if (B(0)) {
// do {
// I = PHI(0, I.INC)
// I.INC = I + Step
// guard(G(I));
// } while (B(I));
// }
//
// where B(x) and G(x) are predicates that map integers to booleans, we want a
// loop invariant expression M such the following program has the same semantics
// as the above:
//
// if (B(0)) {
// do {
// I = PHI(0, I.INC)
// I.INC = I + Step
// guard(G(0) && M);
// } while (B(I));
// }
//
// One solution for M is M = forall X . (G(X) && B(X)) => G(X + Step)
//
// Informal proof that the transformation above is correct:
//
// By the definition of guards we can rewrite the guard condition to:
// G(I) && G(0) && M
//
// Let's prove that for each iteration of the loop:
// G(0) && M => G(I)
// And the condition above can be simplified to G(Start) && M.
//
// Induction base.
// G(0) && M => G(0)
//
// Induction step. Assuming G(0) && M => G(I) on the subsequent
// iteration:
//
// B(I) is true because it's the backedge condition.
// G(I) is true because the backedge is guarded by this condition.
//
// So M = forall X . (G(X) && B(X)) => G(X + Step) implies G(I + Step).
//
// Note that we can use anything stronger than M, i.e. any condition which
// implies M.
//
// When S = 1 (i.e. forward iterating loop), the transformation is supported
// when:
// * The loop has a single latch with the condition of the form:
// B(X) = latchStart + X <pred> latchLimit,
// where <pred> is u<, u<=, s<, or s<=.
// * The guard condition is of the form
// G(X) = guardStart + X u< guardLimit
//
// For the ult latch comparison case M is:
// forall X . guardStart + X u< guardLimit && latchStart + X <u latchLimit =>
// guardStart + X + 1 u< guardLimit
//
// The only way the antecedent can be true and the consequent can be false is
// if
// X == guardLimit - 1 - guardStart
// (and guardLimit is non-zero, but we won't use this latter fact).
// If X == guardLimit - 1 - guardStart then the second half of the antecedent is
// latchStart + guardLimit - 1 - guardStart u< latchLimit
// and its negation is
// latchStart + guardLimit - 1 - guardStart u>= latchLimit
//
// In other words, if
// latchLimit u<= latchStart + guardLimit - 1 - guardStart
// then:
// (the ranges below are written in ConstantRange notation, where [A, B) is the
// set for (I = A; I != B; I++ /*maywrap*/) yield(I);)
//
// forall X . guardStart + X u< guardLimit &&
// latchStart + X u< latchLimit =>
// guardStart + X + 1 u< guardLimit
// == forall X . guardStart + X u< guardLimit &&
// latchStart + X u< latchStart + guardLimit - 1 - guardStart =>
// guardStart + X + 1 u< guardLimit
// == forall X . (guardStart + X) in [0, guardLimit) &&
// (latchStart + X) in [0, latchStart + guardLimit - 1 - guardStart) =>
// (guardStart + X + 1) in [0, guardLimit)
// == forall X . X in [-guardStart, guardLimit - guardStart) &&
// X in [-latchStart, guardLimit - 1 - guardStart) =>
// X in [-guardStart - 1, guardLimit - guardStart - 1)
// == true
//
// So the widened condition is:
// guardStart u< guardLimit &&
// latchStart + guardLimit - 1 - guardStart u>= latchLimit
// Similarly for ule condition the widened condition is:
// guardStart u< guardLimit &&
// latchStart + guardLimit - 1 - guardStart u> latchLimit
// For slt condition the widened condition is:
// guardStart u< guardLimit &&
// latchStart + guardLimit - 1 - guardStart s>= latchLimit
// For sle condition the widened condition is:
// guardStart u< guardLimit &&
// latchStart + guardLimit - 1 - guardStart s> latchLimit
//
// When S = -1 (i.e. reverse iterating loop), the transformation is supported
// when:
// * The loop has a single latch with the condition of the form:
// B(X) = X <pred> latchLimit, where <pred> is u>, u>=, s>, or s>=.
// * The guard condition is of the form
// G(X) = X - 1 u< guardLimit
//
// For the ugt latch comparison case M is:
// forall X. X-1 u< guardLimit and X u> latchLimit => X-2 u< guardLimit
//
// The only way the antecedent can be true and the consequent can be false is if
// X == 1.
// If X == 1 then the second half of the antecedent is
// 1 u> latchLimit, and its negation is latchLimit u>= 1.
//
// So the widened condition is:
// guardStart u< guardLimit && latchLimit u>= 1.
// Similarly for sgt condition the widened condition is:
// guardStart u< guardLimit && latchLimit s>= 1.
// For uge condition the widened condition is:
// guardStart u< guardLimit && latchLimit u> 1.
// For sge condition the widened condition is:
// guardStart u< guardLimit && latchLimit s> 1.
//===----------------------------------------------------------------------===//
#include "llvm/Transforms/Scalar/LoopPredication.h"
#include "llvm/ADT/Statistic.h"
[LoopPredication] Allow predication of loop invariant computations (within the loop) The purpose of this patch is to eliminate a pass ordering dependence between LoopPredication and LICM. To understand the purpose, consider the following snippet of code inside some loop 'L' with IV 'i' A = _a.length; guard (i < A) a = _a[i] B = _b.length; guard (i < B); b = _b[i]; ... Z = _z.length; guard (i < Z) z = _z[i] accum += a + b + ... + z; Today, we need LICM to hoist the length loads, LoopPredication to make the guards loop invariant, and TrivialUnswitch to eliminate the loop invariant guard to establish must execute for the next length load. Today, if we can't prove speculation safety, we'd have to iterate these three passes 26 times to reduce this example down to the minimal form. Using the fact that the array lengths are known to be invariant, we can short circuit this iteration. By forming the loop invariant form of all the guards at once, we remove the need for LoopPredication from the iterative cycle. At the moment, we'd still have to iterate LICM and TrivialUnswitch; we'll leave that part for later. As a secondary benefit, this allows LoopPred to expose peeling oppurtunities in a much more obvious manner. See the udiv test changes as an example. If the udiv was not hoistable (i.e. we couldn't prove speculation safety) this would be an example where peeling becomes obviously profitable whereas it wasn't before. A couple of subtleties in the implementation: - SCEV's isSafeToExpand guarantees speculation safety (i.e. let's us expand at a new point). It is not a precondition for expansion if we know the SCEV corresponds to a Value which dominates the requested expansion point. - SCEV's isLoopInvariant returns true for expressions which compute the same value across all iterations executed, regardless of where the original Value is located. (i.e. it can be in the loop) This implies we have a speculation burden to prove before expanding them outside loops. - invariant_loads and AA->pointsToConstantMemory are two cases that SCEV currently does not handle, but meets the SCEV definition of invariance. I plan to sink this part into SCEV once this has baked for a bit. Differential Revision: https://reviews.llvm.org/D60093 llvm-svn: 358684
2019-04-19 00:33:17 +08:00
#include "llvm/Analysis/AliasAnalysis.h"
#include "llvm/Analysis/BranchProbabilityInfo.h"
#include "llvm/Analysis/GuardUtils.h"
#include "llvm/Analysis/LoopInfo.h"
#include "llvm/Analysis/LoopPass.h"
#include "llvm/Analysis/ScalarEvolution.h"
#include "llvm/Analysis/ScalarEvolutionExpressions.h"
#include "llvm/IR/Function.h"
#include "llvm/IR/GlobalValue.h"
#include "llvm/IR/IntrinsicInst.h"
#include "llvm/IR/Module.h"
#include "llvm/IR/PatternMatch.h"
#include "llvm/InitializePasses.h"
#include "llvm/Pass.h"
#include "llvm/Support/CommandLine.h"
#include "llvm/Support/Debug.h"
#include "llvm/Transforms/Scalar.h"
#include "llvm/Transforms/Utils/GuardUtils.h"
#include "llvm/Transforms/Utils/Local.h"
#include "llvm/Transforms/Utils/LoopUtils.h"
#include "llvm/Transforms/Utils/ScalarEvolutionExpander.h"
#define DEBUG_TYPE "loop-predication"
STATISTIC(TotalConsidered, "Number of guards considered");
STATISTIC(TotalWidened, "Number of checks widened");
using namespace llvm;
static cl::opt<bool> EnableIVTruncation("loop-predication-enable-iv-truncation",
cl::Hidden, cl::init(true));
static cl::opt<bool> EnableCountDownLoop("loop-predication-enable-count-down-loop",
cl::Hidden, cl::init(true));
static cl::opt<bool>
SkipProfitabilityChecks("loop-predication-skip-profitability-checks",
cl::Hidden, cl::init(false));
// This is the scale factor for the latch probability. We use this during
// profitability analysis to find other exiting blocks that have a much higher
// probability of exiting the loop instead of loop exiting via latch.
// This value should be greater than 1 for a sane profitability check.
static cl::opt<float> LatchExitProbabilityScale(
"loop-predication-latch-probability-scale", cl::Hidden, cl::init(2.0),
cl::desc("scale factor for the latch probability. Value should be greater "
"than 1. Lower values are ignored"));
static cl::opt<bool> PredicateWidenableBranchGuards(
"loop-predication-predicate-widenable-branches-to-deopt", cl::Hidden,
cl::desc("Whether or not we should predicate guards "
"expressed as widenable branches to deoptimize blocks"),
cl::init(true));
namespace {
/// Represents an induction variable check:
/// icmp Pred, <induction variable>, <loop invariant limit>
struct LoopICmp {
ICmpInst::Predicate Pred;
const SCEVAddRecExpr *IV;
const SCEV *Limit;
LoopICmp(ICmpInst::Predicate Pred, const SCEVAddRecExpr *IV,
const SCEV *Limit)
: Pred(Pred), IV(IV), Limit(Limit) {}
LoopICmp() {}
void dump() {
dbgs() << "LoopICmp Pred = " << Pred << ", IV = " << *IV
<< ", Limit = " << *Limit << "\n";
}
};
class LoopPredication {
[LoopPredication] Allow predication of loop invariant computations (within the loop) The purpose of this patch is to eliminate a pass ordering dependence between LoopPredication and LICM. To understand the purpose, consider the following snippet of code inside some loop 'L' with IV 'i' A = _a.length; guard (i < A) a = _a[i] B = _b.length; guard (i < B); b = _b[i]; ... Z = _z.length; guard (i < Z) z = _z[i] accum += a + b + ... + z; Today, we need LICM to hoist the length loads, LoopPredication to make the guards loop invariant, and TrivialUnswitch to eliminate the loop invariant guard to establish must execute for the next length load. Today, if we can't prove speculation safety, we'd have to iterate these three passes 26 times to reduce this example down to the minimal form. Using the fact that the array lengths are known to be invariant, we can short circuit this iteration. By forming the loop invariant form of all the guards at once, we remove the need for LoopPredication from the iterative cycle. At the moment, we'd still have to iterate LICM and TrivialUnswitch; we'll leave that part for later. As a secondary benefit, this allows LoopPred to expose peeling oppurtunities in a much more obvious manner. See the udiv test changes as an example. If the udiv was not hoistable (i.e. we couldn't prove speculation safety) this would be an example where peeling becomes obviously profitable whereas it wasn't before. A couple of subtleties in the implementation: - SCEV's isSafeToExpand guarantees speculation safety (i.e. let's us expand at a new point). It is not a precondition for expansion if we know the SCEV corresponds to a Value which dominates the requested expansion point. - SCEV's isLoopInvariant returns true for expressions which compute the same value across all iterations executed, regardless of where the original Value is located. (i.e. it can be in the loop) This implies we have a speculation burden to prove before expanding them outside loops. - invariant_loads and AA->pointsToConstantMemory are two cases that SCEV currently does not handle, but meets the SCEV definition of invariance. I plan to sink this part into SCEV once this has baked for a bit. Differential Revision: https://reviews.llvm.org/D60093 llvm-svn: 358684
2019-04-19 00:33:17 +08:00
AliasAnalysis *AA;
DominatorTree *DT;
ScalarEvolution *SE;
LoopInfo *LI;
BranchProbabilityInfo *BPI;
Loop *L;
const DataLayout *DL;
BasicBlock *Preheader;
LoopICmp LatchCheck;
bool isSupportedStep(const SCEV* Step);
Optional<LoopICmp> parseLoopICmp(ICmpInst *ICI);
Optional<LoopICmp> parseLoopLatchICmp();
/// Return an insertion point suitable for inserting a safe to speculate
/// instruction whose only user will be 'User' which has operands 'Ops'. A
/// trivial result would be the at the User itself, but we try to return a
2020-05-26 04:34:08 +08:00
/// loop invariant location if possible.
Instruction *findInsertPt(Instruction *User, ArrayRef<Value*> Ops);
/// Same as above, *except* that this uses the SCEV definition of invariant
/// which is that an expression *can be made* invariant via SCEVExpander.
/// Thus, this version is only suitable for finding an insert point to be be
/// passed to SCEVExpander!
Instruction *findInsertPt(Instruction *User, ArrayRef<const SCEV*> Ops);
[LoopPredication] Allow predication of loop invariant computations (within the loop) The purpose of this patch is to eliminate a pass ordering dependence between LoopPredication and LICM. To understand the purpose, consider the following snippet of code inside some loop 'L' with IV 'i' A = _a.length; guard (i < A) a = _a[i] B = _b.length; guard (i < B); b = _b[i]; ... Z = _z.length; guard (i < Z) z = _z[i] accum += a + b + ... + z; Today, we need LICM to hoist the length loads, LoopPredication to make the guards loop invariant, and TrivialUnswitch to eliminate the loop invariant guard to establish must execute for the next length load. Today, if we can't prove speculation safety, we'd have to iterate these three passes 26 times to reduce this example down to the minimal form. Using the fact that the array lengths are known to be invariant, we can short circuit this iteration. By forming the loop invariant form of all the guards at once, we remove the need for LoopPredication from the iterative cycle. At the moment, we'd still have to iterate LICM and TrivialUnswitch; we'll leave that part for later. As a secondary benefit, this allows LoopPred to expose peeling oppurtunities in a much more obvious manner. See the udiv test changes as an example. If the udiv was not hoistable (i.e. we couldn't prove speculation safety) this would be an example where peeling becomes obviously profitable whereas it wasn't before. A couple of subtleties in the implementation: - SCEV's isSafeToExpand guarantees speculation safety (i.e. let's us expand at a new point). It is not a precondition for expansion if we know the SCEV corresponds to a Value which dominates the requested expansion point. - SCEV's isLoopInvariant returns true for expressions which compute the same value across all iterations executed, regardless of where the original Value is located. (i.e. it can be in the loop) This implies we have a speculation burden to prove before expanding them outside loops. - invariant_loads and AA->pointsToConstantMemory are two cases that SCEV currently does not handle, but meets the SCEV definition of invariance. I plan to sink this part into SCEV once this has baked for a bit. Differential Revision: https://reviews.llvm.org/D60093 llvm-svn: 358684
2019-04-19 00:33:17 +08:00
/// Return true if the value is known to produce a single fixed value across
/// all iterations on which it executes. Note that this does not imply
2020-05-26 04:34:08 +08:00
/// speculation safety. That must be established separately.
[LoopPredication] Allow predication of loop invariant computations (within the loop) The purpose of this patch is to eliminate a pass ordering dependence between LoopPredication and LICM. To understand the purpose, consider the following snippet of code inside some loop 'L' with IV 'i' A = _a.length; guard (i < A) a = _a[i] B = _b.length; guard (i < B); b = _b[i]; ... Z = _z.length; guard (i < Z) z = _z[i] accum += a + b + ... + z; Today, we need LICM to hoist the length loads, LoopPredication to make the guards loop invariant, and TrivialUnswitch to eliminate the loop invariant guard to establish must execute for the next length load. Today, if we can't prove speculation safety, we'd have to iterate these three passes 26 times to reduce this example down to the minimal form. Using the fact that the array lengths are known to be invariant, we can short circuit this iteration. By forming the loop invariant form of all the guards at once, we remove the need for LoopPredication from the iterative cycle. At the moment, we'd still have to iterate LICM and TrivialUnswitch; we'll leave that part for later. As a secondary benefit, this allows LoopPred to expose peeling oppurtunities in a much more obvious manner. See the udiv test changes as an example. If the udiv was not hoistable (i.e. we couldn't prove speculation safety) this would be an example where peeling becomes obviously profitable whereas it wasn't before. A couple of subtleties in the implementation: - SCEV's isSafeToExpand guarantees speculation safety (i.e. let's us expand at a new point). It is not a precondition for expansion if we know the SCEV corresponds to a Value which dominates the requested expansion point. - SCEV's isLoopInvariant returns true for expressions which compute the same value across all iterations executed, regardless of where the original Value is located. (i.e. it can be in the loop) This implies we have a speculation burden to prove before expanding them outside loops. - invariant_loads and AA->pointsToConstantMemory are two cases that SCEV currently does not handle, but meets the SCEV definition of invariance. I plan to sink this part into SCEV once this has baked for a bit. Differential Revision: https://reviews.llvm.org/D60093 llvm-svn: 358684
2019-04-19 00:33:17 +08:00
bool isLoopInvariantValue(const SCEV* S);
Value *expandCheck(SCEVExpander &Expander, Instruction *Guard,
ICmpInst::Predicate Pred, const SCEV *LHS,
const SCEV *RHS);
Optional<Value *> widenICmpRangeCheck(ICmpInst *ICI, SCEVExpander &Expander,
Instruction *Guard);
Optional<Value *> widenICmpRangeCheckIncrementingLoop(LoopICmp LatchCheck,
LoopICmp RangeCheck,
SCEVExpander &Expander,
Instruction *Guard);
Optional<Value *> widenICmpRangeCheckDecrementingLoop(LoopICmp LatchCheck,
LoopICmp RangeCheck,
SCEVExpander &Expander,
Instruction *Guard);
unsigned collectChecks(SmallVectorImpl<Value *> &Checks, Value *Condition,
SCEVExpander &Expander, Instruction *Guard);
bool widenGuardConditions(IntrinsicInst *II, SCEVExpander &Expander);
bool widenWidenableBranchGuardConditions(BranchInst *Guard, SCEVExpander &Expander);
// If the loop always exits through another block in the loop, we should not
// predicate based on the latch check. For example, the latch check can be a
// very coarse grained check and there can be more fine grained exit checks
// within the loop. We identify such unprofitable loops through BPI.
bool isLoopProfitableToPredicate();
bool predicateLoopExits(Loop *L, SCEVExpander &Rewriter);
public:
LoopPredication(AliasAnalysis *AA, DominatorTree *DT,
ScalarEvolution *SE, LoopInfo *LI,
[LoopPredication] Allow predication of loop invariant computations (within the loop) The purpose of this patch is to eliminate a pass ordering dependence between LoopPredication and LICM. To understand the purpose, consider the following snippet of code inside some loop 'L' with IV 'i' A = _a.length; guard (i < A) a = _a[i] B = _b.length; guard (i < B); b = _b[i]; ... Z = _z.length; guard (i < Z) z = _z[i] accum += a + b + ... + z; Today, we need LICM to hoist the length loads, LoopPredication to make the guards loop invariant, and TrivialUnswitch to eliminate the loop invariant guard to establish must execute for the next length load. Today, if we can't prove speculation safety, we'd have to iterate these three passes 26 times to reduce this example down to the minimal form. Using the fact that the array lengths are known to be invariant, we can short circuit this iteration. By forming the loop invariant form of all the guards at once, we remove the need for LoopPredication from the iterative cycle. At the moment, we'd still have to iterate LICM and TrivialUnswitch; we'll leave that part for later. As a secondary benefit, this allows LoopPred to expose peeling oppurtunities in a much more obvious manner. See the udiv test changes as an example. If the udiv was not hoistable (i.e. we couldn't prove speculation safety) this would be an example where peeling becomes obviously profitable whereas it wasn't before. A couple of subtleties in the implementation: - SCEV's isSafeToExpand guarantees speculation safety (i.e. let's us expand at a new point). It is not a precondition for expansion if we know the SCEV corresponds to a Value which dominates the requested expansion point. - SCEV's isLoopInvariant returns true for expressions which compute the same value across all iterations executed, regardless of where the original Value is located. (i.e. it can be in the loop) This implies we have a speculation burden to prove before expanding them outside loops. - invariant_loads and AA->pointsToConstantMemory are two cases that SCEV currently does not handle, but meets the SCEV definition of invariance. I plan to sink this part into SCEV once this has baked for a bit. Differential Revision: https://reviews.llvm.org/D60093 llvm-svn: 358684
2019-04-19 00:33:17 +08:00
BranchProbabilityInfo *BPI)
: AA(AA), DT(DT), SE(SE), LI(LI), BPI(BPI) {};
bool runOnLoop(Loop *L);
};
class LoopPredicationLegacyPass : public LoopPass {
public:
static char ID;
LoopPredicationLegacyPass() : LoopPass(ID) {
initializeLoopPredicationLegacyPassPass(*PassRegistry::getPassRegistry());
}
void getAnalysisUsage(AnalysisUsage &AU) const override {
AU.addRequired<BranchProbabilityInfoWrapperPass>();
getLoopAnalysisUsage(AU);
}
bool runOnLoop(Loop *L, LPPassManager &LPM) override {
if (skipLoop(L))
return false;
auto *SE = &getAnalysis<ScalarEvolutionWrapperPass>().getSE();
auto *LI = &getAnalysis<LoopInfoWrapperPass>().getLoopInfo();
auto *DT = &getAnalysis<DominatorTreeWrapperPass>().getDomTree();
BranchProbabilityInfo &BPI =
getAnalysis<BranchProbabilityInfoWrapperPass>().getBPI();
[LoopPredication] Allow predication of loop invariant computations (within the loop) The purpose of this patch is to eliminate a pass ordering dependence between LoopPredication and LICM. To understand the purpose, consider the following snippet of code inside some loop 'L' with IV 'i' A = _a.length; guard (i < A) a = _a[i] B = _b.length; guard (i < B); b = _b[i]; ... Z = _z.length; guard (i < Z) z = _z[i] accum += a + b + ... + z; Today, we need LICM to hoist the length loads, LoopPredication to make the guards loop invariant, and TrivialUnswitch to eliminate the loop invariant guard to establish must execute for the next length load. Today, if we can't prove speculation safety, we'd have to iterate these three passes 26 times to reduce this example down to the minimal form. Using the fact that the array lengths are known to be invariant, we can short circuit this iteration. By forming the loop invariant form of all the guards at once, we remove the need for LoopPredication from the iterative cycle. At the moment, we'd still have to iterate LICM and TrivialUnswitch; we'll leave that part for later. As a secondary benefit, this allows LoopPred to expose peeling oppurtunities in a much more obvious manner. See the udiv test changes as an example. If the udiv was not hoistable (i.e. we couldn't prove speculation safety) this would be an example where peeling becomes obviously profitable whereas it wasn't before. A couple of subtleties in the implementation: - SCEV's isSafeToExpand guarantees speculation safety (i.e. let's us expand at a new point). It is not a precondition for expansion if we know the SCEV corresponds to a Value which dominates the requested expansion point. - SCEV's isLoopInvariant returns true for expressions which compute the same value across all iterations executed, regardless of where the original Value is located. (i.e. it can be in the loop) This implies we have a speculation burden to prove before expanding them outside loops. - invariant_loads and AA->pointsToConstantMemory are two cases that SCEV currently does not handle, but meets the SCEV definition of invariance. I plan to sink this part into SCEV once this has baked for a bit. Differential Revision: https://reviews.llvm.org/D60093 llvm-svn: 358684
2019-04-19 00:33:17 +08:00
auto *AA = &getAnalysis<AAResultsWrapperPass>().getAAResults();
LoopPredication LP(AA, DT, SE, LI, &BPI);
return LP.runOnLoop(L);
}
};
char LoopPredicationLegacyPass::ID = 0;
} // end namespace
INITIALIZE_PASS_BEGIN(LoopPredicationLegacyPass, "loop-predication",
"Loop predication", false, false)
INITIALIZE_PASS_DEPENDENCY(BranchProbabilityInfoWrapperPass)
INITIALIZE_PASS_DEPENDENCY(LoopPass)
INITIALIZE_PASS_END(LoopPredicationLegacyPass, "loop-predication",
"Loop predication", false, false)
Pass *llvm::createLoopPredicationPass() {
return new LoopPredicationLegacyPass();
}
PreservedAnalyses LoopPredicationPass::run(Loop &L, LoopAnalysisManager &AM,
LoopStandardAnalysisResults &AR,
LPMUpdater &U) {
Function *F = L.getHeader()->getParent();
// For the new PM, we also can't use BranchProbabilityInfo as an analysis
// pass. Function analyses need to be preserved across loop transformations
// but BPI is not preserved, hence a newly built one is needed.
[BPI] Improve static heuristics for "cold" paths. Current approach doesn't work well in cases when multiple paths are predicted to be "cold". By "cold" paths I mean those containing "unreachable" instruction, call marked with 'cold' attribute and 'unwind' handler of 'invoke' instruction. The issue is that heuristics are applied one by one until the first match and essentially ignores relative hotness/coldness of other paths. New approach unifies processing of "cold" paths by assigning predefined absolute weight to each block estimated to be "cold". Then we propagate these weights up/down IR similarly to existing approach. And finally set up edge probabilities based on estimated block weights. One important difference is how we propagate weight up. Existing approach propagates the same weight to all blocks that are post-dominated by a block with some "known" weight. This is useless at least because it always gives 50\50 distribution which is assumed by default anyway. Worse, it causes the algorithm to skip further heuristics and can miss setting more accurate probability. New algorithm propagates the weight up only to the blocks that dominates and post-dominated by a block with some "known" weight. In other words, those blocks that are either always executed or not executed together. In addition new approach processes loops in an uniform way as well. Essentially loop exit edges are estimated as "cold" paths relative to back edges and should be considered uniformly with other coldness/hotness markers. Reviewed By: yrouban Differential Revision: https://reviews.llvm.org/D79485
2020-06-18 17:20:55 +08:00
BranchProbabilityInfo BPI(*F, AR.LI, &AR.TLI, &AR.DT, nullptr);
LoopPredication LP(&AR.AA, &AR.DT, &AR.SE, &AR.LI, &BPI);
if (!LP.runOnLoop(&L))
return PreservedAnalyses::all();
return getLoopPassPreservedAnalyses();
}
Optional<LoopICmp>
LoopPredication::parseLoopICmp(ICmpInst *ICI) {
auto Pred = ICI->getPredicate();
auto *LHS = ICI->getOperand(0);
auto *RHS = ICI->getOperand(1);
const SCEV *LHSS = SE->getSCEV(LHS);
if (isa<SCEVCouldNotCompute>(LHSS))
return None;
const SCEV *RHSS = SE->getSCEV(RHS);
if (isa<SCEVCouldNotCompute>(RHSS))
return None;
// Canonicalize RHS to be loop invariant bound, LHS - a loop computable IV
if (SE->isLoopInvariant(LHSS, L)) {
std::swap(LHS, RHS);
std::swap(LHSS, RHSS);
Pred = ICmpInst::getSwappedPredicate(Pred);
}
const SCEVAddRecExpr *AR = dyn_cast<SCEVAddRecExpr>(LHSS);
if (!AR || AR->getLoop() != L)
return None;
return LoopICmp(Pred, AR, RHSS);
}
Value *LoopPredication::expandCheck(SCEVExpander &Expander,
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Instruction *Guard,
ICmpInst::Predicate Pred, const SCEV *LHS,
const SCEV *RHS) {
Type *Ty = LHS->getType();
assert(Ty == RHS->getType() && "expandCheck operands have different types?");
if (SE->isLoopInvariant(LHS, L) && SE->isLoopInvariant(RHS, L)) {
IRBuilder<> Builder(Guard);
if (SE->isLoopEntryGuardedByCond(L, Pred, LHS, RHS))
return Builder.getTrue();
if (SE->isLoopEntryGuardedByCond(L, ICmpInst::getInversePredicate(Pred),
LHS, RHS))
return Builder.getFalse();
}
Value *LHSV = Expander.expandCodeFor(LHS, Ty, findInsertPt(Guard, {LHS}));
Value *RHSV = Expander.expandCodeFor(RHS, Ty, findInsertPt(Guard, {RHS}));
IRBuilder<> Builder(findInsertPt(Guard, {LHSV, RHSV}));
return Builder.CreateICmp(Pred, LHSV, RHSV);
}
// Returns true if its safe to truncate the IV to RangeCheckType.
// When the IV type is wider than the range operand type, we can still do loop
// predication, by generating SCEVs for the range and latch that are of the
// same type. We achieve this by generating a SCEV truncate expression for the
// latch IV. This is done iff truncation of the IV is a safe operation,
// without loss of information.
// Another way to achieve this is by generating a wider type SCEV for the
// range check operand, however, this needs a more involved check that
// operands do not overflow. This can lead to loss of information when the
// range operand is of the form: add i32 %offset, %iv. We need to prove that
// sext(x + y) is same as sext(x) + sext(y).
// This function returns true if we can safely represent the IV type in
// the RangeCheckType without loss of information.
static bool isSafeToTruncateWideIVType(const DataLayout &DL,
ScalarEvolution &SE,
const LoopICmp LatchCheck,
Type *RangeCheckType) {
if (!EnableIVTruncation)
return false;
assert(DL.getTypeSizeInBits(LatchCheck.IV->getType()).getFixedSize() >
DL.getTypeSizeInBits(RangeCheckType).getFixedSize() &&
"Expected latch check IV type to be larger than range check operand "
"type!");
// The start and end values of the IV should be known. This is to guarantee
// that truncating the wide type will not lose information.
auto *Limit = dyn_cast<SCEVConstant>(LatchCheck.Limit);
auto *Start = dyn_cast<SCEVConstant>(LatchCheck.IV->getStart());
if (!Limit || !Start)
return false;
// This check makes sure that the IV does not change sign during loop
// iterations. Consider latchType = i64, LatchStart = 5, Pred = ICMP_SGE,
// LatchEnd = 2, rangeCheckType = i32. If it's not a monotonic predicate, the
// IV wraps around, and the truncation of the IV would lose the range of
// iterations between 2^32 and 2^64.
if (!SE.getMonotonicPredicateType(LatchCheck.IV, LatchCheck.Pred))
return false;
// The active bits should be less than the bits in the RangeCheckType. This
// guarantees that truncating the latch check to RangeCheckType is a safe
// operation.
auto RangeCheckTypeBitSize =
DL.getTypeSizeInBits(RangeCheckType).getFixedSize();
return Start->getAPInt().getActiveBits() < RangeCheckTypeBitSize &&
Limit->getAPInt().getActiveBits() < RangeCheckTypeBitSize;
}
// Return an LoopICmp describing a latch check equivlent to LatchCheck but with
// the requested type if safe to do so. May involve the use of a new IV.
static Optional<LoopICmp> generateLoopLatchCheck(const DataLayout &DL,
ScalarEvolution &SE,
const LoopICmp LatchCheck,
Type *RangeCheckType) {
auto *LatchType = LatchCheck.IV->getType();
if (RangeCheckType == LatchType)
return LatchCheck;
// For now, bail out if latch type is narrower than range type.
if (DL.getTypeSizeInBits(LatchType).getFixedSize() <
DL.getTypeSizeInBits(RangeCheckType).getFixedSize())
return None;
if (!isSafeToTruncateWideIVType(DL, SE, LatchCheck, RangeCheckType))
return None;
// We can now safely identify the truncated version of the IV and limit for
// RangeCheckType.
LoopICmp NewLatchCheck;
NewLatchCheck.Pred = LatchCheck.Pred;
NewLatchCheck.IV = dyn_cast<SCEVAddRecExpr>(
SE.getTruncateExpr(LatchCheck.IV, RangeCheckType));
if (!NewLatchCheck.IV)
return None;
NewLatchCheck.Limit = SE.getTruncateExpr(LatchCheck.Limit, RangeCheckType);
LLVM_DEBUG(dbgs() << "IV of type: " << *LatchType
<< "can be represented as range check type:"
<< *RangeCheckType << "\n");
LLVM_DEBUG(dbgs() << "LatchCheck.IV: " << *NewLatchCheck.IV << "\n");
LLVM_DEBUG(dbgs() << "LatchCheck.Limit: " << *NewLatchCheck.Limit << "\n");
return NewLatchCheck;
}
bool LoopPredication::isSupportedStep(const SCEV* Step) {
return Step->isOne() || (Step->isAllOnesValue() && EnableCountDownLoop);
}
Instruction *LoopPredication::findInsertPt(Instruction *Use,
ArrayRef<Value*> Ops) {
for (Value *Op : Ops)
if (!L->isLoopInvariant(Op))
return Use;
return Preheader->getTerminator();
}
Instruction *LoopPredication::findInsertPt(Instruction *Use,
ArrayRef<const SCEV*> Ops) {
[LoopPredication] Allow predication of loop invariant computations (within the loop) The purpose of this patch is to eliminate a pass ordering dependence between LoopPredication and LICM. To understand the purpose, consider the following snippet of code inside some loop 'L' with IV 'i' A = _a.length; guard (i < A) a = _a[i] B = _b.length; guard (i < B); b = _b[i]; ... Z = _z.length; guard (i < Z) z = _z[i] accum += a + b + ... + z; Today, we need LICM to hoist the length loads, LoopPredication to make the guards loop invariant, and TrivialUnswitch to eliminate the loop invariant guard to establish must execute for the next length load. Today, if we can't prove speculation safety, we'd have to iterate these three passes 26 times to reduce this example down to the minimal form. Using the fact that the array lengths are known to be invariant, we can short circuit this iteration. By forming the loop invariant form of all the guards at once, we remove the need for LoopPredication from the iterative cycle. At the moment, we'd still have to iterate LICM and TrivialUnswitch; we'll leave that part for later. As a secondary benefit, this allows LoopPred to expose peeling oppurtunities in a much more obvious manner. See the udiv test changes as an example. If the udiv was not hoistable (i.e. we couldn't prove speculation safety) this would be an example where peeling becomes obviously profitable whereas it wasn't before. A couple of subtleties in the implementation: - SCEV's isSafeToExpand guarantees speculation safety (i.e. let's us expand at a new point). It is not a precondition for expansion if we know the SCEV corresponds to a Value which dominates the requested expansion point. - SCEV's isLoopInvariant returns true for expressions which compute the same value across all iterations executed, regardless of where the original Value is located. (i.e. it can be in the loop) This implies we have a speculation burden to prove before expanding them outside loops. - invariant_loads and AA->pointsToConstantMemory are two cases that SCEV currently does not handle, but meets the SCEV definition of invariance. I plan to sink this part into SCEV once this has baked for a bit. Differential Revision: https://reviews.llvm.org/D60093 llvm-svn: 358684
2019-04-19 00:33:17 +08:00
// Subtlety: SCEV considers things to be invariant if the value produced is
// the same across iterations. This is not the same as being able to
// evaluate outside the loop, which is what we actually need here.
for (const SCEV *Op : Ops)
[LoopPredication] Allow predication of loop invariant computations (within the loop) The purpose of this patch is to eliminate a pass ordering dependence between LoopPredication and LICM. To understand the purpose, consider the following snippet of code inside some loop 'L' with IV 'i' A = _a.length; guard (i < A) a = _a[i] B = _b.length; guard (i < B); b = _b[i]; ... Z = _z.length; guard (i < Z) z = _z[i] accum += a + b + ... + z; Today, we need LICM to hoist the length loads, LoopPredication to make the guards loop invariant, and TrivialUnswitch to eliminate the loop invariant guard to establish must execute for the next length load. Today, if we can't prove speculation safety, we'd have to iterate these three passes 26 times to reduce this example down to the minimal form. Using the fact that the array lengths are known to be invariant, we can short circuit this iteration. By forming the loop invariant form of all the guards at once, we remove the need for LoopPredication from the iterative cycle. At the moment, we'd still have to iterate LICM and TrivialUnswitch; we'll leave that part for later. As a secondary benefit, this allows LoopPred to expose peeling oppurtunities in a much more obvious manner. See the udiv test changes as an example. If the udiv was not hoistable (i.e. we couldn't prove speculation safety) this would be an example where peeling becomes obviously profitable whereas it wasn't before. A couple of subtleties in the implementation: - SCEV's isSafeToExpand guarantees speculation safety (i.e. let's us expand at a new point). It is not a precondition for expansion if we know the SCEV corresponds to a Value which dominates the requested expansion point. - SCEV's isLoopInvariant returns true for expressions which compute the same value across all iterations executed, regardless of where the original Value is located. (i.e. it can be in the loop) This implies we have a speculation burden to prove before expanding them outside loops. - invariant_loads and AA->pointsToConstantMemory are two cases that SCEV currently does not handle, but meets the SCEV definition of invariance. I plan to sink this part into SCEV once this has baked for a bit. Differential Revision: https://reviews.llvm.org/D60093 llvm-svn: 358684
2019-04-19 00:33:17 +08:00
if (!SE->isLoopInvariant(Op, L) ||
!isSafeToExpandAt(Op, Preheader->getTerminator(), *SE))
return Use;
return Preheader->getTerminator();
}
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bool LoopPredication::isLoopInvariantValue(const SCEV* S) {
[LoopPredication] Allow predication of loop invariant computations (within the loop) The purpose of this patch is to eliminate a pass ordering dependence between LoopPredication and LICM. To understand the purpose, consider the following snippet of code inside some loop 'L' with IV 'i' A = _a.length; guard (i < A) a = _a[i] B = _b.length; guard (i < B); b = _b[i]; ... Z = _z.length; guard (i < Z) z = _z[i] accum += a + b + ... + z; Today, we need LICM to hoist the length loads, LoopPredication to make the guards loop invariant, and TrivialUnswitch to eliminate the loop invariant guard to establish must execute for the next length load. Today, if we can't prove speculation safety, we'd have to iterate these three passes 26 times to reduce this example down to the minimal form. Using the fact that the array lengths are known to be invariant, we can short circuit this iteration. By forming the loop invariant form of all the guards at once, we remove the need for LoopPredication from the iterative cycle. At the moment, we'd still have to iterate LICM and TrivialUnswitch; we'll leave that part for later. As a secondary benefit, this allows LoopPred to expose peeling oppurtunities in a much more obvious manner. See the udiv test changes as an example. If the udiv was not hoistable (i.e. we couldn't prove speculation safety) this would be an example where peeling becomes obviously profitable whereas it wasn't before. A couple of subtleties in the implementation: - SCEV's isSafeToExpand guarantees speculation safety (i.e. let's us expand at a new point). It is not a precondition for expansion if we know the SCEV corresponds to a Value which dominates the requested expansion point. - SCEV's isLoopInvariant returns true for expressions which compute the same value across all iterations executed, regardless of where the original Value is located. (i.e. it can be in the loop) This implies we have a speculation burden to prove before expanding them outside loops. - invariant_loads and AA->pointsToConstantMemory are two cases that SCEV currently does not handle, but meets the SCEV definition of invariance. I plan to sink this part into SCEV once this has baked for a bit. Differential Revision: https://reviews.llvm.org/D60093 llvm-svn: 358684
2019-04-19 00:33:17 +08:00
// Handling expressions which produce invariant results, but *haven't* yet
// been removed from the loop serves two important purposes.
// 1) Most importantly, it resolves a pass ordering cycle which would
// otherwise need us to iteration licm, loop-predication, and either
// loop-unswitch or loop-peeling to make progress on examples with lots of
// predicable range checks in a row. (Since, in the general case, we can't
// hoist the length checks until the dominating checks have been discharged
// as we can't prove doing so is safe.)
// 2) As a nice side effect, this exposes the value of peeling or unswitching
// much more obviously in the IR. Otherwise, the cost modeling for other
// transforms would end up needing to duplicate all of this logic to model a
// check which becomes predictable based on a modeled peel or unswitch.
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//
[LoopPredication] Allow predication of loop invariant computations (within the loop) The purpose of this patch is to eliminate a pass ordering dependence between LoopPredication and LICM. To understand the purpose, consider the following snippet of code inside some loop 'L' with IV 'i' A = _a.length; guard (i < A) a = _a[i] B = _b.length; guard (i < B); b = _b[i]; ... Z = _z.length; guard (i < Z) z = _z[i] accum += a + b + ... + z; Today, we need LICM to hoist the length loads, LoopPredication to make the guards loop invariant, and TrivialUnswitch to eliminate the loop invariant guard to establish must execute for the next length load. Today, if we can't prove speculation safety, we'd have to iterate these three passes 26 times to reduce this example down to the minimal form. Using the fact that the array lengths are known to be invariant, we can short circuit this iteration. By forming the loop invariant form of all the guards at once, we remove the need for LoopPredication from the iterative cycle. At the moment, we'd still have to iterate LICM and TrivialUnswitch; we'll leave that part for later. As a secondary benefit, this allows LoopPred to expose peeling oppurtunities in a much more obvious manner. See the udiv test changes as an example. If the udiv was not hoistable (i.e. we couldn't prove speculation safety) this would be an example where peeling becomes obviously profitable whereas it wasn't before. A couple of subtleties in the implementation: - SCEV's isSafeToExpand guarantees speculation safety (i.e. let's us expand at a new point). It is not a precondition for expansion if we know the SCEV corresponds to a Value which dominates the requested expansion point. - SCEV's isLoopInvariant returns true for expressions which compute the same value across all iterations executed, regardless of where the original Value is located. (i.e. it can be in the loop) This implies we have a speculation burden to prove before expanding them outside loops. - invariant_loads and AA->pointsToConstantMemory are two cases that SCEV currently does not handle, but meets the SCEV definition of invariance. I plan to sink this part into SCEV once this has baked for a bit. Differential Revision: https://reviews.llvm.org/D60093 llvm-svn: 358684
2019-04-19 00:33:17 +08:00
// The cost of doing so in the worst case is an extra fill from the stack in
// the loop to materialize the loop invariant test value instead of checking
// against the original IV which is presumable in a register inside the loop.
// Such cases are presumably rare, and hint at missing oppurtunities for
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// other passes.
[LoopPredication] Allow predication of loop invariant computations (within the loop) The purpose of this patch is to eliminate a pass ordering dependence between LoopPredication and LICM. To understand the purpose, consider the following snippet of code inside some loop 'L' with IV 'i' A = _a.length; guard (i < A) a = _a[i] B = _b.length; guard (i < B); b = _b[i]; ... Z = _z.length; guard (i < Z) z = _z[i] accum += a + b + ... + z; Today, we need LICM to hoist the length loads, LoopPredication to make the guards loop invariant, and TrivialUnswitch to eliminate the loop invariant guard to establish must execute for the next length load. Today, if we can't prove speculation safety, we'd have to iterate these three passes 26 times to reduce this example down to the minimal form. Using the fact that the array lengths are known to be invariant, we can short circuit this iteration. By forming the loop invariant form of all the guards at once, we remove the need for LoopPredication from the iterative cycle. At the moment, we'd still have to iterate LICM and TrivialUnswitch; we'll leave that part for later. As a secondary benefit, this allows LoopPred to expose peeling oppurtunities in a much more obvious manner. See the udiv test changes as an example. If the udiv was not hoistable (i.e. we couldn't prove speculation safety) this would be an example where peeling becomes obviously profitable whereas it wasn't before. A couple of subtleties in the implementation: - SCEV's isSafeToExpand guarantees speculation safety (i.e. let's us expand at a new point). It is not a precondition for expansion if we know the SCEV corresponds to a Value which dominates the requested expansion point. - SCEV's isLoopInvariant returns true for expressions which compute the same value across all iterations executed, regardless of where the original Value is located. (i.e. it can be in the loop) This implies we have a speculation burden to prove before expanding them outside loops. - invariant_loads and AA->pointsToConstantMemory are two cases that SCEV currently does not handle, but meets the SCEV definition of invariance. I plan to sink this part into SCEV once this has baked for a bit. Differential Revision: https://reviews.llvm.org/D60093 llvm-svn: 358684
2019-04-19 00:33:17 +08:00
if (SE->isLoopInvariant(S, L))
// Note: This the SCEV variant, so the original Value* may be within the
// loop even though SCEV has proven it is loop invariant.
return true;
// Handle a particular important case which SCEV doesn't yet know about which
2020-05-26 04:34:08 +08:00
// shows up in range checks on arrays with immutable lengths.
[LoopPredication] Allow predication of loop invariant computations (within the loop) The purpose of this patch is to eliminate a pass ordering dependence between LoopPredication and LICM. To understand the purpose, consider the following snippet of code inside some loop 'L' with IV 'i' A = _a.length; guard (i < A) a = _a[i] B = _b.length; guard (i < B); b = _b[i]; ... Z = _z.length; guard (i < Z) z = _z[i] accum += a + b + ... + z; Today, we need LICM to hoist the length loads, LoopPredication to make the guards loop invariant, and TrivialUnswitch to eliminate the loop invariant guard to establish must execute for the next length load. Today, if we can't prove speculation safety, we'd have to iterate these three passes 26 times to reduce this example down to the minimal form. Using the fact that the array lengths are known to be invariant, we can short circuit this iteration. By forming the loop invariant form of all the guards at once, we remove the need for LoopPredication from the iterative cycle. At the moment, we'd still have to iterate LICM and TrivialUnswitch; we'll leave that part for later. As a secondary benefit, this allows LoopPred to expose peeling oppurtunities in a much more obvious manner. See the udiv test changes as an example. If the udiv was not hoistable (i.e. we couldn't prove speculation safety) this would be an example where peeling becomes obviously profitable whereas it wasn't before. A couple of subtleties in the implementation: - SCEV's isSafeToExpand guarantees speculation safety (i.e. let's us expand at a new point). It is not a precondition for expansion if we know the SCEV corresponds to a Value which dominates the requested expansion point. - SCEV's isLoopInvariant returns true for expressions which compute the same value across all iterations executed, regardless of where the original Value is located. (i.e. it can be in the loop) This implies we have a speculation burden to prove before expanding them outside loops. - invariant_loads and AA->pointsToConstantMemory are two cases that SCEV currently does not handle, but meets the SCEV definition of invariance. I plan to sink this part into SCEV once this has baked for a bit. Differential Revision: https://reviews.llvm.org/D60093 llvm-svn: 358684
2019-04-19 00:33:17 +08:00
// TODO: This should be sunk inside SCEV.
if (const SCEVUnknown *U = dyn_cast<SCEVUnknown>(S))
if (const auto *LI = dyn_cast<LoadInst>(U->getValue()))
if (LI->isUnordered() && L->hasLoopInvariantOperands(LI))
[LoopPredication] Allow predication of loop invariant computations (within the loop) The purpose of this patch is to eliminate a pass ordering dependence between LoopPredication and LICM. To understand the purpose, consider the following snippet of code inside some loop 'L' with IV 'i' A = _a.length; guard (i < A) a = _a[i] B = _b.length; guard (i < B); b = _b[i]; ... Z = _z.length; guard (i < Z) z = _z[i] accum += a + b + ... + z; Today, we need LICM to hoist the length loads, LoopPredication to make the guards loop invariant, and TrivialUnswitch to eliminate the loop invariant guard to establish must execute for the next length load. Today, if we can't prove speculation safety, we'd have to iterate these three passes 26 times to reduce this example down to the minimal form. Using the fact that the array lengths are known to be invariant, we can short circuit this iteration. By forming the loop invariant form of all the guards at once, we remove the need for LoopPredication from the iterative cycle. At the moment, we'd still have to iterate LICM and TrivialUnswitch; we'll leave that part for later. As a secondary benefit, this allows LoopPred to expose peeling oppurtunities in a much more obvious manner. See the udiv test changes as an example. If the udiv was not hoistable (i.e. we couldn't prove speculation safety) this would be an example where peeling becomes obviously profitable whereas it wasn't before. A couple of subtleties in the implementation: - SCEV's isSafeToExpand guarantees speculation safety (i.e. let's us expand at a new point). It is not a precondition for expansion if we know the SCEV corresponds to a Value which dominates the requested expansion point. - SCEV's isLoopInvariant returns true for expressions which compute the same value across all iterations executed, regardless of where the original Value is located. (i.e. it can be in the loop) This implies we have a speculation burden to prove before expanding them outside loops. - invariant_loads and AA->pointsToConstantMemory are two cases that SCEV currently does not handle, but meets the SCEV definition of invariance. I plan to sink this part into SCEV once this has baked for a bit. Differential Revision: https://reviews.llvm.org/D60093 llvm-svn: 358684
2019-04-19 00:33:17 +08:00
if (AA->pointsToConstantMemory(LI->getOperand(0)) ||
LI->hasMetadata(LLVMContext::MD_invariant_load))
[LoopPredication] Allow predication of loop invariant computations (within the loop) The purpose of this patch is to eliminate a pass ordering dependence between LoopPredication and LICM. To understand the purpose, consider the following snippet of code inside some loop 'L' with IV 'i' A = _a.length; guard (i < A) a = _a[i] B = _b.length; guard (i < B); b = _b[i]; ... Z = _z.length; guard (i < Z) z = _z[i] accum += a + b + ... + z; Today, we need LICM to hoist the length loads, LoopPredication to make the guards loop invariant, and TrivialUnswitch to eliminate the loop invariant guard to establish must execute for the next length load. Today, if we can't prove speculation safety, we'd have to iterate these three passes 26 times to reduce this example down to the minimal form. Using the fact that the array lengths are known to be invariant, we can short circuit this iteration. By forming the loop invariant form of all the guards at once, we remove the need for LoopPredication from the iterative cycle. At the moment, we'd still have to iterate LICM and TrivialUnswitch; we'll leave that part for later. As a secondary benefit, this allows LoopPred to expose peeling oppurtunities in a much more obvious manner. See the udiv test changes as an example. If the udiv was not hoistable (i.e. we couldn't prove speculation safety) this would be an example where peeling becomes obviously profitable whereas it wasn't before. A couple of subtleties in the implementation: - SCEV's isSafeToExpand guarantees speculation safety (i.e. let's us expand at a new point). It is not a precondition for expansion if we know the SCEV corresponds to a Value which dominates the requested expansion point. - SCEV's isLoopInvariant returns true for expressions which compute the same value across all iterations executed, regardless of where the original Value is located. (i.e. it can be in the loop) This implies we have a speculation burden to prove before expanding them outside loops. - invariant_loads and AA->pointsToConstantMemory are two cases that SCEV currently does not handle, but meets the SCEV definition of invariance. I plan to sink this part into SCEV once this has baked for a bit. Differential Revision: https://reviews.llvm.org/D60093 llvm-svn: 358684
2019-04-19 00:33:17 +08:00
return true;
return false;
}
Optional<Value *> LoopPredication::widenICmpRangeCheckIncrementingLoop(
LoopICmp LatchCheck, LoopICmp RangeCheck,
SCEVExpander &Expander, Instruction *Guard) {
auto *Ty = RangeCheck.IV->getType();
// Generate the widened condition for the forward loop:
// guardStart u< guardLimit &&
// latchLimit <pred> guardLimit - 1 - guardStart + latchStart
// where <pred> depends on the latch condition predicate. See the file
// header comment for the reasoning.
// guardLimit - guardStart + latchStart - 1
const SCEV *GuardStart = RangeCheck.IV->getStart();
const SCEV *GuardLimit = RangeCheck.Limit;
const SCEV *LatchStart = LatchCheck.IV->getStart();
const SCEV *LatchLimit = LatchCheck.Limit;
[LoopPredication] Allow predication of loop invariant computations (within the loop) The purpose of this patch is to eliminate a pass ordering dependence between LoopPredication and LICM. To understand the purpose, consider the following snippet of code inside some loop 'L' with IV 'i' A = _a.length; guard (i < A) a = _a[i] B = _b.length; guard (i < B); b = _b[i]; ... Z = _z.length; guard (i < Z) z = _z[i] accum += a + b + ... + z; Today, we need LICM to hoist the length loads, LoopPredication to make the guards loop invariant, and TrivialUnswitch to eliminate the loop invariant guard to establish must execute for the next length load. Today, if we can't prove speculation safety, we'd have to iterate these three passes 26 times to reduce this example down to the minimal form. Using the fact that the array lengths are known to be invariant, we can short circuit this iteration. By forming the loop invariant form of all the guards at once, we remove the need for LoopPredication from the iterative cycle. At the moment, we'd still have to iterate LICM and TrivialUnswitch; we'll leave that part for later. As a secondary benefit, this allows LoopPred to expose peeling oppurtunities in a much more obvious manner. See the udiv test changes as an example. If the udiv was not hoistable (i.e. we couldn't prove speculation safety) this would be an example where peeling becomes obviously profitable whereas it wasn't before. A couple of subtleties in the implementation: - SCEV's isSafeToExpand guarantees speculation safety (i.e. let's us expand at a new point). It is not a precondition for expansion if we know the SCEV corresponds to a Value which dominates the requested expansion point. - SCEV's isLoopInvariant returns true for expressions which compute the same value across all iterations executed, regardless of where the original Value is located. (i.e. it can be in the loop) This implies we have a speculation burden to prove before expanding them outside loops. - invariant_loads and AA->pointsToConstantMemory are two cases that SCEV currently does not handle, but meets the SCEV definition of invariance. I plan to sink this part into SCEV once this has baked for a bit. Differential Revision: https://reviews.llvm.org/D60093 llvm-svn: 358684
2019-04-19 00:33:17 +08:00
// Subtlety: We need all the values to be *invariant* across all iterations,
// but we only need to check expansion safety for those which *aren't*
2020-05-26 04:34:08 +08:00
// already guaranteed to dominate the guard.
[LoopPredication] Allow predication of loop invariant computations (within the loop) The purpose of this patch is to eliminate a pass ordering dependence between LoopPredication and LICM. To understand the purpose, consider the following snippet of code inside some loop 'L' with IV 'i' A = _a.length; guard (i < A) a = _a[i] B = _b.length; guard (i < B); b = _b[i]; ... Z = _z.length; guard (i < Z) z = _z[i] accum += a + b + ... + z; Today, we need LICM to hoist the length loads, LoopPredication to make the guards loop invariant, and TrivialUnswitch to eliminate the loop invariant guard to establish must execute for the next length load. Today, if we can't prove speculation safety, we'd have to iterate these three passes 26 times to reduce this example down to the minimal form. Using the fact that the array lengths are known to be invariant, we can short circuit this iteration. By forming the loop invariant form of all the guards at once, we remove the need for LoopPredication from the iterative cycle. At the moment, we'd still have to iterate LICM and TrivialUnswitch; we'll leave that part for later. As a secondary benefit, this allows LoopPred to expose peeling oppurtunities in a much more obvious manner. See the udiv test changes as an example. If the udiv was not hoistable (i.e. we couldn't prove speculation safety) this would be an example where peeling becomes obviously profitable whereas it wasn't before. A couple of subtleties in the implementation: - SCEV's isSafeToExpand guarantees speculation safety (i.e. let's us expand at a new point). It is not a precondition for expansion if we know the SCEV corresponds to a Value which dominates the requested expansion point. - SCEV's isLoopInvariant returns true for expressions which compute the same value across all iterations executed, regardless of where the original Value is located. (i.e. it can be in the loop) This implies we have a speculation burden to prove before expanding them outside loops. - invariant_loads and AA->pointsToConstantMemory are two cases that SCEV currently does not handle, but meets the SCEV definition of invariance. I plan to sink this part into SCEV once this has baked for a bit. Differential Revision: https://reviews.llvm.org/D60093 llvm-svn: 358684
2019-04-19 00:33:17 +08:00
if (!isLoopInvariantValue(GuardStart) ||
!isLoopInvariantValue(GuardLimit) ||
!isLoopInvariantValue(LatchStart) ||
!isLoopInvariantValue(LatchLimit)) {
LLVM_DEBUG(dbgs() << "Can't expand limit check!\n");
return None;
}
if (!isSafeToExpandAt(LatchStart, Guard, *SE) ||
!isSafeToExpandAt(LatchLimit, Guard, *SE)) {
LLVM_DEBUG(dbgs() << "Can't expand limit check!\n");
return None;
}
// guardLimit - guardStart + latchStart - 1
const SCEV *RHS =
SE->getAddExpr(SE->getMinusSCEV(GuardLimit, GuardStart),
SE->getMinusSCEV(LatchStart, SE->getOne(Ty)));
auto LimitCheckPred =
ICmpInst::getFlippedStrictnessPredicate(LatchCheck.Pred);
LLVM_DEBUG(dbgs() << "LHS: " << *LatchLimit << "\n");
LLVM_DEBUG(dbgs() << "RHS: " << *RHS << "\n");
LLVM_DEBUG(dbgs() << "Pred: " << LimitCheckPred << "\n");
2020-05-26 04:34:08 +08:00
auto *LimitCheck =
expandCheck(Expander, Guard, LimitCheckPred, LatchLimit, RHS);
auto *FirstIterationCheck = expandCheck(Expander, Guard, RangeCheck.Pred,
GuardStart, GuardLimit);
IRBuilder<> Builder(findInsertPt(Guard, {FirstIterationCheck, LimitCheck}));
return Builder.CreateAnd(FirstIterationCheck, LimitCheck);
}
Optional<Value *> LoopPredication::widenICmpRangeCheckDecrementingLoop(
LoopICmp LatchCheck, LoopICmp RangeCheck,
SCEVExpander &Expander, Instruction *Guard) {
auto *Ty = RangeCheck.IV->getType();
const SCEV *GuardStart = RangeCheck.IV->getStart();
const SCEV *GuardLimit = RangeCheck.Limit;
[LoopPredication] Allow predication of loop invariant computations (within the loop) The purpose of this patch is to eliminate a pass ordering dependence between LoopPredication and LICM. To understand the purpose, consider the following snippet of code inside some loop 'L' with IV 'i' A = _a.length; guard (i < A) a = _a[i] B = _b.length; guard (i < B); b = _b[i]; ... Z = _z.length; guard (i < Z) z = _z[i] accum += a + b + ... + z; Today, we need LICM to hoist the length loads, LoopPredication to make the guards loop invariant, and TrivialUnswitch to eliminate the loop invariant guard to establish must execute for the next length load. Today, if we can't prove speculation safety, we'd have to iterate these three passes 26 times to reduce this example down to the minimal form. Using the fact that the array lengths are known to be invariant, we can short circuit this iteration. By forming the loop invariant form of all the guards at once, we remove the need for LoopPredication from the iterative cycle. At the moment, we'd still have to iterate LICM and TrivialUnswitch; we'll leave that part for later. As a secondary benefit, this allows LoopPred to expose peeling oppurtunities in a much more obvious manner. See the udiv test changes as an example. If the udiv was not hoistable (i.e. we couldn't prove speculation safety) this would be an example where peeling becomes obviously profitable whereas it wasn't before. A couple of subtleties in the implementation: - SCEV's isSafeToExpand guarantees speculation safety (i.e. let's us expand at a new point). It is not a precondition for expansion if we know the SCEV corresponds to a Value which dominates the requested expansion point. - SCEV's isLoopInvariant returns true for expressions which compute the same value across all iterations executed, regardless of where the original Value is located. (i.e. it can be in the loop) This implies we have a speculation burden to prove before expanding them outside loops. - invariant_loads and AA->pointsToConstantMemory are two cases that SCEV currently does not handle, but meets the SCEV definition of invariance. I plan to sink this part into SCEV once this has baked for a bit. Differential Revision: https://reviews.llvm.org/D60093 llvm-svn: 358684
2019-04-19 00:33:17 +08:00
const SCEV *LatchStart = LatchCheck.IV->getStart();
const SCEV *LatchLimit = LatchCheck.Limit;
[LoopPredication] Allow predication of loop invariant computations (within the loop) The purpose of this patch is to eliminate a pass ordering dependence between LoopPredication and LICM. To understand the purpose, consider the following snippet of code inside some loop 'L' with IV 'i' A = _a.length; guard (i < A) a = _a[i] B = _b.length; guard (i < B); b = _b[i]; ... Z = _z.length; guard (i < Z) z = _z[i] accum += a + b + ... + z; Today, we need LICM to hoist the length loads, LoopPredication to make the guards loop invariant, and TrivialUnswitch to eliminate the loop invariant guard to establish must execute for the next length load. Today, if we can't prove speculation safety, we'd have to iterate these three passes 26 times to reduce this example down to the minimal form. Using the fact that the array lengths are known to be invariant, we can short circuit this iteration. By forming the loop invariant form of all the guards at once, we remove the need for LoopPredication from the iterative cycle. At the moment, we'd still have to iterate LICM and TrivialUnswitch; we'll leave that part for later. As a secondary benefit, this allows LoopPred to expose peeling oppurtunities in a much more obvious manner. See the udiv test changes as an example. If the udiv was not hoistable (i.e. we couldn't prove speculation safety) this would be an example where peeling becomes obviously profitable whereas it wasn't before. A couple of subtleties in the implementation: - SCEV's isSafeToExpand guarantees speculation safety (i.e. let's us expand at a new point). It is not a precondition for expansion if we know the SCEV corresponds to a Value which dominates the requested expansion point. - SCEV's isLoopInvariant returns true for expressions which compute the same value across all iterations executed, regardless of where the original Value is located. (i.e. it can be in the loop) This implies we have a speculation burden to prove before expanding them outside loops. - invariant_loads and AA->pointsToConstantMemory are two cases that SCEV currently does not handle, but meets the SCEV definition of invariance. I plan to sink this part into SCEV once this has baked for a bit. Differential Revision: https://reviews.llvm.org/D60093 llvm-svn: 358684
2019-04-19 00:33:17 +08:00
// Subtlety: We need all the values to be *invariant* across all iterations,
// but we only need to check expansion safety for those which *aren't*
2020-05-26 04:34:08 +08:00
// already guaranteed to dominate the guard.
[LoopPredication] Allow predication of loop invariant computations (within the loop) The purpose of this patch is to eliminate a pass ordering dependence between LoopPredication and LICM. To understand the purpose, consider the following snippet of code inside some loop 'L' with IV 'i' A = _a.length; guard (i < A) a = _a[i] B = _b.length; guard (i < B); b = _b[i]; ... Z = _z.length; guard (i < Z) z = _z[i] accum += a + b + ... + z; Today, we need LICM to hoist the length loads, LoopPredication to make the guards loop invariant, and TrivialUnswitch to eliminate the loop invariant guard to establish must execute for the next length load. Today, if we can't prove speculation safety, we'd have to iterate these three passes 26 times to reduce this example down to the minimal form. Using the fact that the array lengths are known to be invariant, we can short circuit this iteration. By forming the loop invariant form of all the guards at once, we remove the need for LoopPredication from the iterative cycle. At the moment, we'd still have to iterate LICM and TrivialUnswitch; we'll leave that part for later. As a secondary benefit, this allows LoopPred to expose peeling oppurtunities in a much more obvious manner. See the udiv test changes as an example. If the udiv was not hoistable (i.e. we couldn't prove speculation safety) this would be an example where peeling becomes obviously profitable whereas it wasn't before. A couple of subtleties in the implementation: - SCEV's isSafeToExpand guarantees speculation safety (i.e. let's us expand at a new point). It is not a precondition for expansion if we know the SCEV corresponds to a Value which dominates the requested expansion point. - SCEV's isLoopInvariant returns true for expressions which compute the same value across all iterations executed, regardless of where the original Value is located. (i.e. it can be in the loop) This implies we have a speculation burden to prove before expanding them outside loops. - invariant_loads and AA->pointsToConstantMemory are two cases that SCEV currently does not handle, but meets the SCEV definition of invariance. I plan to sink this part into SCEV once this has baked for a bit. Differential Revision: https://reviews.llvm.org/D60093 llvm-svn: 358684
2019-04-19 00:33:17 +08:00
if (!isLoopInvariantValue(GuardStart) ||
!isLoopInvariantValue(GuardLimit) ||
!isLoopInvariantValue(LatchStart) ||
!isLoopInvariantValue(LatchLimit)) {
LLVM_DEBUG(dbgs() << "Can't expand limit check!\n");
return None;
}
if (!isSafeToExpandAt(LatchStart, Guard, *SE) ||
!isSafeToExpandAt(LatchLimit, Guard, *SE)) {
LLVM_DEBUG(dbgs() << "Can't expand limit check!\n");
return None;
}
// The decrement of the latch check IV should be the same as the
// rangeCheckIV.
auto *PostDecLatchCheckIV = LatchCheck.IV->getPostIncExpr(*SE);
if (RangeCheck.IV != PostDecLatchCheckIV) {
LLVM_DEBUG(dbgs() << "Not the same. PostDecLatchCheckIV: "
<< *PostDecLatchCheckIV
<< " and RangeCheckIV: " << *RangeCheck.IV << "\n");
return None;
}
// Generate the widened condition for CountDownLoop:
// guardStart u< guardLimit &&
// latchLimit <pred> 1.
// See the header comment for reasoning of the checks.
auto LimitCheckPred =
ICmpInst::getFlippedStrictnessPredicate(LatchCheck.Pred);
auto *FirstIterationCheck = expandCheck(Expander, Guard,
ICmpInst::ICMP_ULT,
GuardStart, GuardLimit);
auto *LimitCheck = expandCheck(Expander, Guard, LimitCheckPred, LatchLimit,
SE->getOne(Ty));
IRBuilder<> Builder(findInsertPt(Guard, {FirstIterationCheck, LimitCheck}));
return Builder.CreateAnd(FirstIterationCheck, LimitCheck);
}
static void normalizePredicate(ScalarEvolution *SE, Loop *L,
LoopICmp& RC) {
// LFTR canonicalizes checks to the ICMP_NE/EQ form; normalize back to the
2020-05-26 04:34:08 +08:00
// ULT/UGE form for ease of handling by our caller.
if (ICmpInst::isEquality(RC.Pred) &&
RC.IV->getStepRecurrence(*SE)->isOne() &&
SE->isKnownPredicate(ICmpInst::ICMP_ULE, RC.IV->getStart(), RC.Limit))
RC.Pred = RC.Pred == ICmpInst::ICMP_NE ?
ICmpInst::ICMP_ULT : ICmpInst::ICMP_UGE;
}
/// If ICI can be widened to a loop invariant condition emits the loop
/// invariant condition in the loop preheader and return it, otherwise
/// returns None.
Optional<Value *> LoopPredication::widenICmpRangeCheck(ICmpInst *ICI,
SCEVExpander &Expander,
Instruction *Guard) {
LLVM_DEBUG(dbgs() << "Analyzing ICmpInst condition:\n");
LLVM_DEBUG(ICI->dump());
// parseLoopStructure guarantees that the latch condition is:
// ++i <pred> latchLimit, where <pred> is u<, u<=, s<, or s<=.
// We are looking for the range checks of the form:
// i u< guardLimit
auto RangeCheck = parseLoopICmp(ICI);
if (!RangeCheck) {
LLVM_DEBUG(dbgs() << "Failed to parse the loop latch condition!\n");
return None;
}
LLVM_DEBUG(dbgs() << "Guard check:\n");
LLVM_DEBUG(RangeCheck->dump());
if (RangeCheck->Pred != ICmpInst::ICMP_ULT) {
LLVM_DEBUG(dbgs() << "Unsupported range check predicate("
<< RangeCheck->Pred << ")!\n");
return None;
}
auto *RangeCheckIV = RangeCheck->IV;
if (!RangeCheckIV->isAffine()) {
LLVM_DEBUG(dbgs() << "Range check IV is not affine!\n");
return None;
}
auto *Step = RangeCheckIV->getStepRecurrence(*SE);
// We cannot just compare with latch IV step because the latch and range IVs
// may have different types.
if (!isSupportedStep(Step)) {
LLVM_DEBUG(dbgs() << "Range check and latch have IVs different steps!\n");
return None;
}
auto *Ty = RangeCheckIV->getType();
auto CurrLatchCheckOpt = generateLoopLatchCheck(*DL, *SE, LatchCheck, Ty);
if (!CurrLatchCheckOpt) {
LLVM_DEBUG(dbgs() << "Failed to generate a loop latch check "
"corresponding to range type: "
<< *Ty << "\n");
return None;
}
LoopICmp CurrLatchCheck = *CurrLatchCheckOpt;
// At this point, the range and latch step should have the same type, but need
// not have the same value (we support both 1 and -1 steps).
assert(Step->getType() ==
CurrLatchCheck.IV->getStepRecurrence(*SE)->getType() &&
"Range and latch steps should be of same type!");
if (Step != CurrLatchCheck.IV->getStepRecurrence(*SE)) {
LLVM_DEBUG(dbgs() << "Range and latch have different step values!\n");
return None;
}
if (Step->isOne())
return widenICmpRangeCheckIncrementingLoop(CurrLatchCheck, *RangeCheck,
Expander, Guard);
else {
assert(Step->isAllOnesValue() && "Step should be -1!");
return widenICmpRangeCheckDecrementingLoop(CurrLatchCheck, *RangeCheck,
Expander, Guard);
}
}
unsigned LoopPredication::collectChecks(SmallVectorImpl<Value *> &Checks,
Value *Condition,
SCEVExpander &Expander,
Instruction *Guard) {
unsigned NumWidened = 0;
// The guard condition is expected to be in form of:
// cond1 && cond2 && cond3 ...
// Iterate over subconditions looking for icmp conditions which can be
// widened across loop iterations. Widening these conditions remember the
// resulting list of subconditions in Checks vector.
SmallVector<Value *, 4> Worklist(1, Condition);
SmallPtrSet<Value *, 4> Visited;
Value *WideableCond = nullptr;
do {
Value *Condition = Worklist.pop_back_val();
if (!Visited.insert(Condition).second)
continue;
Value *LHS, *RHS;
using namespace llvm::PatternMatch;
if (match(Condition, m_And(m_Value(LHS), m_Value(RHS)))) {
Worklist.push_back(LHS);
Worklist.push_back(RHS);
continue;
}
if (match(Condition,
m_Intrinsic<Intrinsic::experimental_widenable_condition>())) {
// Pick any, we don't care which
WideableCond = Condition;
continue;
}
if (ICmpInst *ICI = dyn_cast<ICmpInst>(Condition)) {
if (auto NewRangeCheck = widenICmpRangeCheck(ICI, Expander,
Guard)) {
Checks.push_back(NewRangeCheck.getValue());
NumWidened++;
continue;
}
}
// Save the condition as is if we can't widen it
Checks.push_back(Condition);
} while (!Worklist.empty());
// At the moment, our matching logic for wideable conditions implicitly
// assumes we preserve the form: (br (and Cond, WC())). FIXME
// Note that if there were multiple calls to wideable condition in the
// traversal, we only need to keep one, and which one is arbitrary.
if (WideableCond)
Checks.push_back(WideableCond);
return NumWidened;
}
bool LoopPredication::widenGuardConditions(IntrinsicInst *Guard,
SCEVExpander &Expander) {
LLVM_DEBUG(dbgs() << "Processing guard:\n");
LLVM_DEBUG(Guard->dump());
TotalConsidered++;
SmallVector<Value *, 4> Checks;
unsigned NumWidened = collectChecks(Checks, Guard->getOperand(0), Expander,
Guard);
if (NumWidened == 0)
return false;
TotalWidened += NumWidened;
// Emit the new guard condition
IRBuilder<> Builder(findInsertPt(Guard, Checks));
Value *AllChecks = Builder.CreateAnd(Checks);
auto *OldCond = Guard->getOperand(0);
Guard->setOperand(0, AllChecks);
RecursivelyDeleteTriviallyDeadInstructions(OldCond);
LLVM_DEBUG(dbgs() << "Widened checks = " << NumWidened << "\n");
return true;
}
bool LoopPredication::widenWidenableBranchGuardConditions(
BranchInst *BI, SCEVExpander &Expander) {
assert(isGuardAsWidenableBranch(BI) && "Must be!");
LLVM_DEBUG(dbgs() << "Processing guard:\n");
LLVM_DEBUG(BI->dump());
TotalConsidered++;
SmallVector<Value *, 4> Checks;
unsigned NumWidened = collectChecks(Checks, BI->getCondition(),
Expander, BI);
if (NumWidened == 0)
return false;
TotalWidened += NumWidened;
// Emit the new guard condition
IRBuilder<> Builder(findInsertPt(BI, Checks));
Value *AllChecks = Builder.CreateAnd(Checks);
auto *OldCond = BI->getCondition();
BI->setCondition(AllChecks);
RecursivelyDeleteTriviallyDeadInstructions(OldCond);
assert(isGuardAsWidenableBranch(BI) &&
"Stopped being a guard after transform?");
LLVM_DEBUG(dbgs() << "Widened checks = " << NumWidened << "\n");
return true;
}
Optional<LoopICmp> LoopPredication::parseLoopLatchICmp() {
using namespace PatternMatch;
BasicBlock *LoopLatch = L->getLoopLatch();
if (!LoopLatch) {
LLVM_DEBUG(dbgs() << "The loop doesn't have a single latch!\n");
return None;
}
auto *BI = dyn_cast<BranchInst>(LoopLatch->getTerminator());
if (!BI || !BI->isConditional()) {
LLVM_DEBUG(dbgs() << "Failed to match the latch terminator!\n");
return None;
}
BasicBlock *TrueDest = BI->getSuccessor(0);
assert(
(TrueDest == L->getHeader() || BI->getSuccessor(1) == L->getHeader()) &&
"One of the latch's destinations must be the header");
auto *ICI = dyn_cast<ICmpInst>(BI->getCondition());
if (!ICI) {
LLVM_DEBUG(dbgs() << "Failed to match the latch condition!\n");
return None;
}
auto Result = parseLoopICmp(ICI);
if (!Result) {
LLVM_DEBUG(dbgs() << "Failed to parse the loop latch condition!\n");
return None;
}
if (TrueDest != L->getHeader())
Result->Pred = ICmpInst::getInversePredicate(Result->Pred);
// Check affine first, so if it's not we don't try to compute the step
// recurrence.
if (!Result->IV->isAffine()) {
LLVM_DEBUG(dbgs() << "The induction variable is not affine!\n");
return None;
}
auto *Step = Result->IV->getStepRecurrence(*SE);
if (!isSupportedStep(Step)) {
LLVM_DEBUG(dbgs() << "Unsupported loop stride(" << *Step << ")!\n");
return None;
}
auto IsUnsupportedPredicate = [](const SCEV *Step, ICmpInst::Predicate Pred) {
if (Step->isOne()) {
return Pred != ICmpInst::ICMP_ULT && Pred != ICmpInst::ICMP_SLT &&
Pred != ICmpInst::ICMP_ULE && Pred != ICmpInst::ICMP_SLE;
} else {
assert(Step->isAllOnesValue() && "Step should be -1!");
return Pred != ICmpInst::ICMP_UGT && Pred != ICmpInst::ICMP_SGT &&
Pred != ICmpInst::ICMP_UGE && Pred != ICmpInst::ICMP_SGE;
}
};
normalizePredicate(SE, L, *Result);
if (IsUnsupportedPredicate(Step, Result->Pred)) {
LLVM_DEBUG(dbgs() << "Unsupported loop latch predicate(" << Result->Pred
<< ")!\n");
return None;
}
return Result;
}
bool LoopPredication::isLoopProfitableToPredicate() {
if (SkipProfitabilityChecks || !BPI)
return true;
SmallVector<std::pair<BasicBlock *, BasicBlock *>, 8> ExitEdges;
L->getExitEdges(ExitEdges);
// If there is only one exiting edge in the loop, it is always profitable to
// predicate the loop.
if (ExitEdges.size() == 1)
return true;
// Calculate the exiting probabilities of all exiting edges from the loop,
// starting with the LatchExitProbability.
// Heuristic for profitability: If any of the exiting blocks' probability of
// exiting the loop is larger than exiting through the latch block, it's not
// profitable to predicate the loop.
auto *LatchBlock = L->getLoopLatch();
assert(LatchBlock && "Should have a single latch at this point!");
auto *LatchTerm = LatchBlock->getTerminator();
assert(LatchTerm->getNumSuccessors() == 2 &&
"expected to be an exiting block with 2 succs!");
unsigned LatchBrExitIdx =
LatchTerm->getSuccessor(0) == L->getHeader() ? 1 : 0;
BranchProbability LatchExitProbability =
BPI->getEdgeProbability(LatchBlock, LatchBrExitIdx);
// Protect against degenerate inputs provided by the user. Providing a value
// less than one, can invert the definition of profitable loop predication.
float ScaleFactor = LatchExitProbabilityScale;
if (ScaleFactor < 1) {
LLVM_DEBUG(
dbgs()
<< "Ignored user setting for loop-predication-latch-probability-scale: "
<< LatchExitProbabilityScale << "\n");
LLVM_DEBUG(dbgs() << "The value is set to 1.0\n");
ScaleFactor = 1.0;
}
const auto LatchProbabilityThreshold =
LatchExitProbability * ScaleFactor;
for (const auto &ExitEdge : ExitEdges) {
BranchProbability ExitingBlockProbability =
BPI->getEdgeProbability(ExitEdge.first, ExitEdge.second);
// Some exiting edge has higher probability than the latch exiting edge.
// No longer profitable to predicate.
if (ExitingBlockProbability > LatchProbabilityThreshold)
return false;
}
// Using BPI, we have concluded that the most probable way to exit from the
// loop is through the latch (or there's no profile information and all
// exits are equally likely).
return true;
}
/// If we can (cheaply) find a widenable branch which controls entry into the
/// loop, return it.
static BranchInst *FindWidenableTerminatorAboveLoop(Loop *L, LoopInfo &LI) {
// Walk back through any unconditional executed blocks and see if we can find
// a widenable condition which seems to control execution of this loop. Note
// that we predict that maythrow calls are likely untaken and thus that it's
// profitable to widen a branch before a maythrow call with a condition
// afterwards even though that may cause the slow path to run in a case where
// it wouldn't have otherwise.
BasicBlock *BB = L->getLoopPreheader();
if (!BB)
return nullptr;
do {
if (BasicBlock *Pred = BB->getSinglePredecessor())
if (BB == Pred->getSingleSuccessor()) {
BB = Pred;
continue;
}
break;
} while (true);
if (BasicBlock *Pred = BB->getSinglePredecessor()) {
auto *Term = Pred->getTerminator();
Value *Cond, *WC;
BasicBlock *IfTrueBB, *IfFalseBB;
if (parseWidenableBranch(Term, Cond, WC, IfTrueBB, IfFalseBB) &&
IfTrueBB == BB)
return cast<BranchInst>(Term);
}
return nullptr;
}
/// Return the minimum of all analyzeable exit counts. This is an upper bound
/// on the actual exit count. If there are not at least two analyzeable exits,
/// returns SCEVCouldNotCompute.
static const SCEV *getMinAnalyzeableBackedgeTakenCount(ScalarEvolution &SE,
DominatorTree &DT,
Loop *L) {
SmallVector<BasicBlock *, 16> ExitingBlocks;
L->getExitingBlocks(ExitingBlocks);
SmallVector<const SCEV *, 4> ExitCounts;
for (BasicBlock *ExitingBB : ExitingBlocks) {
const SCEV *ExitCount = SE.getExitCount(L, ExitingBB);
if (isa<SCEVCouldNotCompute>(ExitCount))
continue;
assert(DT.dominates(ExitingBB, L->getLoopLatch()) &&
"We should only have known counts for exiting blocks that "
"dominate latch!");
ExitCounts.push_back(ExitCount);
}
if (ExitCounts.size() < 2)
return SE.getCouldNotCompute();
return SE.getUMinFromMismatchedTypes(ExitCounts);
}
/// This implements an analogous, but entirely distinct transform from the main
/// loop predication transform. This one is phrased in terms of using a
/// widenable branch *outside* the loop to allow us to simplify loop exits in a
/// following loop. This is close in spirit to the IndVarSimplify transform
/// of the same name, but is materially different widening loosens legality
/// sharply.
bool LoopPredication::predicateLoopExits(Loop *L, SCEVExpander &Rewriter) {
// The transformation performed here aims to widen a widenable condition
// above the loop such that all analyzeable exit leading to deopt are dead.
// It assumes that the latch is the dominant exit for profitability and that
// exits branching to deoptimizing blocks are rarely taken. It relies on the
// semantics of widenable expressions for legality. (i.e. being able to fall
// down the widenable path spuriously allows us to ignore exit order,
// unanalyzeable exits, side effects, exceptional exits, and other challenges
// which restrict the applicability of the non-WC based version of this
// transform in IndVarSimplify.)
//
// NOTE ON POISON/UNDEF - We're hoisting an expression above guards which may
// imply flags on the expression being hoisted and inserting new uses (flags
// are only correct for current uses). The result is that we may be
// inserting a branch on the value which can be either poison or undef. In
// this case, the branch can legally go either way; we just need to avoid
// introducing UB. This is achieved through the use of the freeze
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// instruction.
SmallVector<BasicBlock *, 16> ExitingBlocks;
L->getExitingBlocks(ExitingBlocks);
if (ExitingBlocks.empty())
return false; // Nothing to do.
auto *Latch = L->getLoopLatch();
if (!Latch)
return false;
auto *WidenableBR = FindWidenableTerminatorAboveLoop(L, *LI);
if (!WidenableBR)
return false;
const SCEV *LatchEC = SE->getExitCount(L, Latch);
if (isa<SCEVCouldNotCompute>(LatchEC))
return false; // profitability - want hot exit in analyzeable set
// At this point, we have found an analyzeable latch, and a widenable
// condition above the loop. If we have a widenable exit within the loop
// (for which we can't compute exit counts), drop the ability to further
// widen so that we gain ability to analyze it's exit count and perform this
// transform. TODO: It'd be nice to know for sure the exit became
// analyzeable after dropping widenability.
{
bool Invalidate = false;
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for (auto *ExitingBB : ExitingBlocks) {
if (LI->getLoopFor(ExitingBB) != L)
continue;
auto *BI = dyn_cast<BranchInst>(ExitingBB->getTerminator());
if (!BI)
continue;
Use *Cond, *WC;
BasicBlock *IfTrueBB, *IfFalseBB;
if (parseWidenableBranch(BI, Cond, WC, IfTrueBB, IfFalseBB) &&
L->contains(IfTrueBB)) {
WC->set(ConstantInt::getTrue(IfTrueBB->getContext()));
Invalidate = true;
}
}
if (Invalidate)
SE->forgetLoop(L);
}
// The use of umin(all analyzeable exits) instead of latch is subtle, but
// important for profitability. We may have a loop which hasn't been fully
// canonicalized just yet. If the exit we chose to widen is provably never
// taken, we want the widened form to *also* be provably never taken. We
// can't guarantee this as a current unanalyzeable exit may later become
// analyzeable, but we can at least avoid the obvious cases.
const SCEV *MinEC = getMinAnalyzeableBackedgeTakenCount(*SE, *DT, L);
if (isa<SCEVCouldNotCompute>(MinEC) || MinEC->getType()->isPointerTy() ||
!SE->isLoopInvariant(MinEC, L) ||
!isSafeToExpandAt(MinEC, WidenableBR, *SE))
return false;
// Subtlety: We need to avoid inserting additional uses of the WC. We know
// that it can only have one transitive use at the moment, and thus moving
// that use to just before the branch and inserting code before it and then
// modifying the operand is legal.
auto *IP = cast<Instruction>(WidenableBR->getCondition());
IP->moveBefore(WidenableBR);
Rewriter.setInsertPoint(IP);
IRBuilder<> B(IP);
bool Changed = false;
Value *MinECV = nullptr; // lazily generated if needed
for (BasicBlock *ExitingBB : ExitingBlocks) {
// If our exiting block exits multiple loops, we can only rewrite the
// innermost one. Otherwise, we're changing how many times the innermost
// loop runs before it exits.
if (LI->getLoopFor(ExitingBB) != L)
continue;
// Can't rewrite non-branch yet.
auto *BI = dyn_cast<BranchInst>(ExitingBB->getTerminator());
if (!BI)
continue;
// If already constant, nothing to do.
if (isa<Constant>(BI->getCondition()))
continue;
const SCEV *ExitCount = SE->getExitCount(L, ExitingBB);
if (isa<SCEVCouldNotCompute>(ExitCount) ||
ExitCount->getType()->isPointerTy() ||
!isSafeToExpandAt(ExitCount, WidenableBR, *SE))
continue;
const bool ExitIfTrue = !L->contains(*succ_begin(ExitingBB));
BasicBlock *ExitBB = BI->getSuccessor(ExitIfTrue ? 0 : 1);
if (!ExitBB->getPostdominatingDeoptimizeCall())
continue;
/// Here we can be fairly sure that executing this exit will most likely
/// lead to executing llvm.experimental.deoptimize.
/// This is a profitability heuristic, not a legality constraint.
// If we found a widenable exit condition, do two things:
// 1) fold the widened exit test into the widenable condition
// 2) fold the branch to untaken - avoids infinite looping
Value *ECV = Rewriter.expandCodeFor(ExitCount);
if (!MinECV)
MinECV = Rewriter.expandCodeFor(MinEC);
Value *RHS = MinECV;
if (ECV->getType() != RHS->getType()) {
Type *WiderTy = SE->getWiderType(ECV->getType(), RHS->getType());
ECV = B.CreateZExt(ECV, WiderTy);
RHS = B.CreateZExt(RHS, WiderTy);
}
assert(!Latch || DT->dominates(ExitingBB, Latch));
Value *NewCond = B.CreateICmp(ICmpInst::ICMP_UGT, ECV, RHS);
// Freeze poison or undef to an arbitrary bit pattern to ensure we can
// branch without introducing UB. See NOTE ON POISON/UNDEF above for
// context.
NewCond = B.CreateFreeze(NewCond);
widenWidenableBranch(WidenableBR, NewCond);
Value *OldCond = BI->getCondition();
BI->setCondition(ConstantInt::get(OldCond->getType(), !ExitIfTrue));
Changed = true;
}
if (Changed)
// We just mutated a bunch of loop exits changing there exit counts
// widely. We need to force recomputation of the exit counts given these
// changes. Note that all of the inserted exits are never taken, and
// should be removed next time the CFG is modified.
SE->forgetLoop(L);
return Changed;
}
bool LoopPredication::runOnLoop(Loop *Loop) {
L = Loop;
LLVM_DEBUG(dbgs() << "Analyzing ");
LLVM_DEBUG(L->dump());
Module *M = L->getHeader()->getModule();
// There is nothing to do if the module doesn't use guards
auto *GuardDecl =
M->getFunction(Intrinsic::getName(Intrinsic::experimental_guard));
bool HasIntrinsicGuards = GuardDecl && !GuardDecl->use_empty();
auto *WCDecl = M->getFunction(
Intrinsic::getName(Intrinsic::experimental_widenable_condition));
bool HasWidenableConditions =
PredicateWidenableBranchGuards && WCDecl && !WCDecl->use_empty();
if (!HasIntrinsicGuards && !HasWidenableConditions)
return false;
DL = &M->getDataLayout();
Preheader = L->getLoopPreheader();
if (!Preheader)
return false;
auto LatchCheckOpt = parseLoopLatchICmp();
if (!LatchCheckOpt)
return false;
LatchCheck = *LatchCheckOpt;
LLVM_DEBUG(dbgs() << "Latch check:\n");
LLVM_DEBUG(LatchCheck.dump());
if (!isLoopProfitableToPredicate()) {
LLVM_DEBUG(dbgs() << "Loop not profitable to predicate!\n");
return false;
}
// Collect all the guards into a vector and process later, so as not
// to invalidate the instruction iterator.
SmallVector<IntrinsicInst *, 4> Guards;
SmallVector<BranchInst *, 4> GuardsAsWidenableBranches;
for (const auto BB : L->blocks()) {
for (auto &I : *BB)
if (isGuard(&I))
Guards.push_back(cast<IntrinsicInst>(&I));
if (PredicateWidenableBranchGuards &&
isGuardAsWidenableBranch(BB->getTerminator()))
GuardsAsWidenableBranches.push_back(
cast<BranchInst>(BB->getTerminator()));
}
SCEVExpander Expander(*SE, *DL, "loop-predication");
bool Changed = false;
for (auto *Guard : Guards)
Changed |= widenGuardConditions(Guard, Expander);
for (auto *Guard : GuardsAsWidenableBranches)
Changed |= widenWidenableBranchGuardConditions(Guard, Expander);
Changed |= predicateLoopExits(L, Expander);
return Changed;
}