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chromium / external / github.com / llvm / llvm-project.git / 23aa5a744666b281af807b1f598f517bf0d597cb / . / mlir / lib / Conversion / ComplexToStandard / ComplexToStandard.cpp
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//===- ComplexToStandard.cpp - conversion from Complex to Standard dialect ===//
//
// 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
//
//===----------------------------------------------------------------------===//
#include "mlir/Conversion/ComplexToStandard/ComplexToStandard.h"
#include <memory>
#include <type_traits>
#include "../PassDetail.h"
#include "mlir/Dialect/Arithmetic/IR/Arithmetic.h"
#include "mlir/Dialect/Complex/IR/Complex.h"
#include "mlir/Dialect/Func/IR/FuncOps.h"
#include "mlir/Dialect/Math/IR/Math.h"
#include "mlir/IR/ImplicitLocOpBuilder.h"
#include "mlir/IR/PatternMatch.h"
#include "mlir/Transforms/DialectConversion.h"
using namespace mlir;
namespace {
struct AbsOpConversion : public OpConversionPattern<complex::AbsOp> {
using OpConversionPattern<complex::AbsOp>::OpConversionPattern;
LogicalResult
matchAndRewrite(complex::AbsOp op, OpAdaptor adaptor,
ConversionPatternRewriter &rewriter) const override {
auto loc = op.getLoc();
auto type = op.getType();
Value real =
rewriter.create<complex::ReOp>(loc, type, adaptor.getComplex());
Value imag =
rewriter.create<complex::ImOp>(loc, type, adaptor.getComplex());
Value realSqr = rewriter.create<arith::MulFOp>(loc, real, real);
Value imagSqr = rewriter.create<arith::MulFOp>(loc, imag, imag);
Value sqNorm = rewriter.create<arith::AddFOp>(loc, realSqr, imagSqr);
rewriter.replaceOpWithNewOp<math::SqrtOp>(op, sqNorm);
return success();
}
};
template <typename ComparisonOp, arith::CmpFPredicate p>
struct ComparisonOpConversion : public OpConversionPattern<ComparisonOp> {
using OpConversionPattern<ComparisonOp>::OpConversionPattern;
using ResultCombiner =
std::conditional_t<std::is_same<ComparisonOp, complex::EqualOp>::value,
arith::AndIOp, arith::OrIOp>;
LogicalResult
matchAndRewrite(ComparisonOp op, typename ComparisonOp::Adaptor adaptor,
ConversionPatternRewriter &rewriter) const override {
auto loc = op.getLoc();
auto type = adaptor.getLhs()
.getType()
.template cast<ComplexType>()
.getElementType();
Value realLhs = rewriter.create<complex::ReOp>(loc, type, adaptor.getLhs());
Value imagLhs = rewriter.create<complex::ImOp>(loc, type, adaptor.getLhs());
Value realRhs = rewriter.create<complex::ReOp>(loc, type, adaptor.getRhs());
Value imagRhs = rewriter.create<complex::ImOp>(loc, type, adaptor.getRhs());
Value realComparison =
rewriter.create<arith::CmpFOp>(loc, p, realLhs, realRhs);
Value imagComparison =
rewriter.create<arith::CmpFOp>(loc, p, imagLhs, imagRhs);
rewriter.replaceOpWithNewOp<ResultCombiner>(op, realComparison,
imagComparison);
return success();
}
};
// Default conversion which applies the BinaryStandardOp separately on the real
// and imaginary parts. Can for example be used for complex::AddOp and
// complex::SubOp.
template <typename BinaryComplexOp, typename BinaryStandardOp>
struct BinaryComplexOpConversion : public OpConversionPattern<BinaryComplexOp> {
using OpConversionPattern<BinaryComplexOp>::OpConversionPattern;
LogicalResult
matchAndRewrite(BinaryComplexOp op, typename BinaryComplexOp::Adaptor adaptor,
ConversionPatternRewriter &rewriter) const override {
auto type = adaptor.getLhs().getType().template cast<ComplexType>();
auto elementType = type.getElementType().template cast<FloatType>();
mlir::ImplicitLocOpBuilder b(op.getLoc(), rewriter);
Value realLhs = b.create<complex::ReOp>(elementType, adaptor.getLhs());
Value realRhs = b.create<complex::ReOp>(elementType, adaptor.getRhs());
Value resultReal =
b.create<BinaryStandardOp>(elementType, realLhs, realRhs);
Value imagLhs = b.create<complex::ImOp>(elementType, adaptor.getLhs());
Value imagRhs = b.create<complex::ImOp>(elementType, adaptor.getRhs());
Value resultImag =
b.create<BinaryStandardOp>(elementType, imagLhs, imagRhs);
rewriter.replaceOpWithNewOp<complex::CreateOp>(op, type, resultReal,
resultImag);
return success();
}
};
struct DivOpConversion : public OpConversionPattern<complex::DivOp> {
using OpConversionPattern<complex::DivOp>::OpConversionPattern;
LogicalResult
matchAndRewrite(complex::DivOp op, OpAdaptor adaptor,
ConversionPatternRewriter &rewriter) const override {
auto loc = op.getLoc();
auto type = adaptor.getLhs().getType().cast<ComplexType>();
auto elementType = type.getElementType().cast<FloatType>();
Value lhsReal =
rewriter.create<complex::ReOp>(loc, elementType, adaptor.getLhs());
Value lhsImag =
rewriter.create<complex::ImOp>(loc, elementType, adaptor.getLhs());
Value rhsReal =
rewriter.create<complex::ReOp>(loc, elementType, adaptor.getRhs());
Value rhsImag =
rewriter.create<complex::ImOp>(loc, elementType, adaptor.getRhs());
// Smith's algorithm to divide complex numbers. It is just a bit smarter
// way to compute the following formula:
// (lhsReal + lhsImag * i) / (rhsReal + rhsImag * i)
// = (lhsReal + lhsImag * i) (rhsReal - rhsImag * i) /
// ((rhsReal + rhsImag * i)(rhsReal - rhsImag * i))
// = ((lhsReal * rhsReal + lhsImag * rhsImag) +
// (lhsImag * rhsReal - lhsReal * rhsImag) * i) / ||rhs||^2
//
// Depending on whether |rhsReal| < |rhsImag| we compute either
// rhsRealImagRatio = rhsReal / rhsImag
// rhsRealImagDenom = rhsImag + rhsReal * rhsRealImagRatio
// resultReal = (lhsReal * rhsRealImagRatio + lhsImag) / rhsRealImagDenom
// resultImag = (lhsImag * rhsRealImagRatio - lhsReal) / rhsRealImagDenom
//
// or
//
// rhsImagRealRatio = rhsImag / rhsReal
// rhsImagRealDenom = rhsReal + rhsImag * rhsImagRealRatio
// resultReal = (lhsReal + lhsImag * rhsImagRealRatio) / rhsImagRealDenom
// resultImag = (lhsImag - lhsReal * rhsImagRealRatio) / rhsImagRealDenom
//
// See https://dl.acm.org/citation.cfm?id=368661 for more details.
Value rhsRealImagRatio =
rewriter.create<arith::DivFOp>(loc, rhsReal, rhsImag);
Value rhsRealImagDenom = rewriter.create<arith::AddFOp>(
loc, rhsImag,
rewriter.create<arith::MulFOp>(loc, rhsRealImagRatio, rhsReal));
Value realNumerator1 = rewriter.create<arith::AddFOp>(
loc, rewriter.create<arith::MulFOp>(loc, lhsReal, rhsRealImagRatio),
lhsImag);
Value resultReal1 =
rewriter.create<arith::DivFOp>(loc, realNumerator1, rhsRealImagDenom);
Value imagNumerator1 = rewriter.create<arith::SubFOp>(
loc, rewriter.create<arith::MulFOp>(loc, lhsImag, rhsRealImagRatio),
lhsReal);
Value resultImag1 =
rewriter.create<arith::DivFOp>(loc, imagNumerator1, rhsRealImagDenom);
Value rhsImagRealRatio =
rewriter.create<arith::DivFOp>(loc, rhsImag, rhsReal);
Value rhsImagRealDenom = rewriter.create<arith::AddFOp>(
loc, rhsReal,
rewriter.create<arith::MulFOp>(loc, rhsImagRealRatio, rhsImag));
Value realNumerator2 = rewriter.create<arith::AddFOp>(
loc, lhsReal,
rewriter.create<arith::MulFOp>(loc, lhsImag, rhsImagRealRatio));
Value resultReal2 =
rewriter.create<arith::DivFOp>(loc, realNumerator2, rhsImagRealDenom);
Value imagNumerator2 = rewriter.create<arith::SubFOp>(
loc, lhsImag,
rewriter.create<arith::MulFOp>(loc, lhsReal, rhsImagRealRatio));
Value resultImag2 =
rewriter.create<arith::DivFOp>(loc, imagNumerator2, rhsImagRealDenom);
// Consider corner cases.
// Case 1. Zero denominator, numerator contains at most one NaN value.
Value zero = rewriter.create<arith::ConstantOp>(
loc, elementType, rewriter.getZeroAttr(elementType));
Value rhsRealAbs = rewriter.create<math::AbsOp>(loc, rhsReal);
Value rhsRealIsZero = rewriter.create<arith::CmpFOp>(
loc, arith::CmpFPredicate::OEQ, rhsRealAbs, zero);
Value rhsImagAbs = rewriter.create<math::AbsOp>(loc, rhsImag);
Value rhsImagIsZero = rewriter.create<arith::CmpFOp>(
loc, arith::CmpFPredicate::OEQ, rhsImagAbs, zero);
Value lhsRealIsNotNaN = rewriter.create<arith::CmpFOp>(
loc, arith::CmpFPredicate::ORD, lhsReal, zero);
Value lhsImagIsNotNaN = rewriter.create<arith::CmpFOp>(
loc, arith::CmpFPredicate::ORD, lhsImag, zero);
Value lhsContainsNotNaNValue =
rewriter.create<arith::OrIOp>(loc, lhsRealIsNotNaN, lhsImagIsNotNaN);
Value resultIsInfinity = rewriter.create<arith::AndIOp>(
loc, lhsContainsNotNaNValue,
rewriter.create<arith::AndIOp>(loc, rhsRealIsZero, rhsImagIsZero));
Value inf = rewriter.create<arith::ConstantOp>(
loc, elementType,
rewriter.getFloatAttr(
elementType, APFloat::getInf(elementType.getFloatSemantics())));
Value infWithSignOfRhsReal =
rewriter.create<math::CopySignOp>(loc, inf, rhsReal);
Value infinityResultReal =
rewriter.create<arith::MulFOp>(loc, infWithSignOfRhsReal, lhsReal);
Value infinityResultImag =
rewriter.create<arith::MulFOp>(loc, infWithSignOfRhsReal, lhsImag);
// Case 2. Infinite numerator, finite denominator.
Value rhsRealFinite = rewriter.create<arith::CmpFOp>(
loc, arith::CmpFPredicate::ONE, rhsRealAbs, inf);
Value rhsImagFinite = rewriter.create<arith::CmpFOp>(
loc, arith::CmpFPredicate::ONE, rhsImagAbs, inf);
Value rhsFinite =
rewriter.create<arith::AndIOp>(loc, rhsRealFinite, rhsImagFinite);
Value lhsRealAbs = rewriter.create<math::AbsOp>(loc, lhsReal);
Value lhsRealInfinite = rewriter.create<arith::CmpFOp>(
loc, arith::CmpFPredicate::OEQ, lhsRealAbs, inf);
Value lhsImagAbs = rewriter.create<math::AbsOp>(loc, lhsImag);
Value lhsImagInfinite = rewriter.create<arith::CmpFOp>(
loc, arith::CmpFPredicate::OEQ, lhsImagAbs, inf);
Value lhsInfinite =
rewriter.create<arith::OrIOp>(loc, lhsRealInfinite, lhsImagInfinite);
Value infNumFiniteDenom =
rewriter.create<arith::AndIOp>(loc, lhsInfinite, rhsFinite);
Value one = rewriter.create<arith::ConstantOp>(
loc, elementType, rewriter.getFloatAttr(elementType, 1));
Value lhsRealIsInfWithSign = rewriter.create<math::CopySignOp>(
loc, rewriter.create<arith::SelectOp>(loc, lhsRealInfinite, one, zero),
lhsReal);
Value lhsImagIsInfWithSign = rewriter.create<math::CopySignOp>(
loc, rewriter.create<arith::SelectOp>(loc, lhsImagInfinite, one, zero),
lhsImag);
Value lhsRealIsInfWithSignTimesRhsReal =
rewriter.create<arith::MulFOp>(loc, lhsRealIsInfWithSign, rhsReal);
Value lhsImagIsInfWithSignTimesRhsImag =
rewriter.create<arith::MulFOp>(loc, lhsImagIsInfWithSign, rhsImag);
Value resultReal3 = rewriter.create<arith::MulFOp>(
loc, inf,
rewriter.create<arith::AddFOp>(loc, lhsRealIsInfWithSignTimesRhsReal,
lhsImagIsInfWithSignTimesRhsImag));
Value lhsRealIsInfWithSignTimesRhsImag =
rewriter.create<arith::MulFOp>(loc, lhsRealIsInfWithSign, rhsImag);
Value lhsImagIsInfWithSignTimesRhsReal =
rewriter.create<arith::MulFOp>(loc, lhsImagIsInfWithSign, rhsReal);
Value resultImag3 = rewriter.create<arith::MulFOp>(
loc, inf,
rewriter.create<arith::SubFOp>(loc, lhsImagIsInfWithSignTimesRhsReal,
lhsRealIsInfWithSignTimesRhsImag));
// Case 3: Finite numerator, infinite denominator.
Value lhsRealFinite = rewriter.create<arith::CmpFOp>(
loc, arith::CmpFPredicate::ONE, lhsRealAbs, inf);
Value lhsImagFinite = rewriter.create<arith::CmpFOp>(
loc, arith::CmpFPredicate::ONE, lhsImagAbs, inf);
Value lhsFinite =
rewriter.create<arith::AndIOp>(loc, lhsRealFinite, lhsImagFinite);
Value rhsRealInfinite = rewriter.create<arith::CmpFOp>(
loc, arith::CmpFPredicate::OEQ, rhsRealAbs, inf);
Value rhsImagInfinite = rewriter.create<arith::CmpFOp>(
loc, arith::CmpFPredicate::OEQ, rhsImagAbs, inf);
Value rhsInfinite =
rewriter.create<arith::OrIOp>(loc, rhsRealInfinite, rhsImagInfinite);
Value finiteNumInfiniteDenom =
rewriter.create<arith::AndIOp>(loc, lhsFinite, rhsInfinite);
Value rhsRealIsInfWithSign = rewriter.create<math::CopySignOp>(
loc, rewriter.create<arith::SelectOp>(loc, rhsRealInfinite, one, zero),
rhsReal);
Value rhsImagIsInfWithSign = rewriter.create<math::CopySignOp>(
loc, rewriter.create<arith::SelectOp>(loc, rhsImagInfinite, one, zero),
rhsImag);
Value rhsRealIsInfWithSignTimesLhsReal =
rewriter.create<arith::MulFOp>(loc, lhsReal, rhsRealIsInfWithSign);
Value rhsImagIsInfWithSignTimesLhsImag =
rewriter.create<arith::MulFOp>(loc, lhsImag, rhsImagIsInfWithSign);
Value resultReal4 = rewriter.create<arith::MulFOp>(
loc, zero,
rewriter.create<arith::AddFOp>(loc, rhsRealIsInfWithSignTimesLhsReal,
rhsImagIsInfWithSignTimesLhsImag));
Value rhsRealIsInfWithSignTimesLhsImag =
rewriter.create<arith::MulFOp>(loc, lhsImag, rhsRealIsInfWithSign);
Value rhsImagIsInfWithSignTimesLhsReal =
rewriter.create<arith::MulFOp>(loc, lhsReal, rhsImagIsInfWithSign);
Value resultImag4 = rewriter.create<arith::MulFOp>(
loc, zero,
rewriter.create<arith::SubFOp>(loc, rhsRealIsInfWithSignTimesLhsImag,
rhsImagIsInfWithSignTimesLhsReal));
Value realAbsSmallerThanImagAbs = rewriter.create<arith::CmpFOp>(
loc, arith::CmpFPredicate::OLT, rhsRealAbs, rhsImagAbs);
Value resultReal = rewriter.create<arith::SelectOp>(
loc, realAbsSmallerThanImagAbs, resultReal1, resultReal2);
Value resultImag = rewriter.create<arith::SelectOp>(
loc, realAbsSmallerThanImagAbs, resultImag1, resultImag2);
Value resultRealSpecialCase3 = rewriter.create<arith::SelectOp>(
loc, finiteNumInfiniteDenom, resultReal4, resultReal);
Value resultImagSpecialCase3 = rewriter.create<arith::SelectOp>(
loc, finiteNumInfiniteDenom, resultImag4, resultImag);
Value resultRealSpecialCase2 = rewriter.create<arith::SelectOp>(
loc, infNumFiniteDenom, resultReal3, resultRealSpecialCase3);
Value resultImagSpecialCase2 = rewriter.create<arith::SelectOp>(
loc, infNumFiniteDenom, resultImag3, resultImagSpecialCase3);
Value resultRealSpecialCase1 = rewriter.create<arith::SelectOp>(
loc, resultIsInfinity, infinityResultReal, resultRealSpecialCase2);
Value resultImagSpecialCase1 = rewriter.create<arith::SelectOp>(
loc, resultIsInfinity, infinityResultImag, resultImagSpecialCase2);
Value resultRealIsNaN = rewriter.create<arith::CmpFOp>(
loc, arith::CmpFPredicate::UNO, resultReal, zero);
Value resultImagIsNaN = rewriter.create<arith::CmpFOp>(
loc, arith::CmpFPredicate::UNO, resultImag, zero);
Value resultIsNaN =
rewriter.create<arith::AndIOp>(loc, resultRealIsNaN, resultImagIsNaN);
Value resultRealWithSpecialCases = rewriter.create<arith::SelectOp>(
loc, resultIsNaN, resultRealSpecialCase1, resultReal);
Value resultImagWithSpecialCases = rewriter.create<arith::SelectOp>(
loc, resultIsNaN, resultImagSpecialCase1, resultImag);
rewriter.replaceOpWithNewOp<complex::CreateOp>(
op, type, resultRealWithSpecialCases, resultImagWithSpecialCases);
return success();
}
};
struct ExpOpConversion : public OpConversionPattern<complex::ExpOp> {
using OpConversionPattern<complex::ExpOp>::OpConversionPattern;
LogicalResult
matchAndRewrite(complex::ExpOp op, OpAdaptor adaptor,
ConversionPatternRewriter &rewriter) const override {
auto loc = op.getLoc();
auto type = adaptor.getComplex().getType().cast<ComplexType>();
auto elementType = type.getElementType().cast<FloatType>();
Value real =
rewriter.create<complex::ReOp>(loc, elementType, adaptor.getComplex());
Value imag =
rewriter.create<complex::ImOp>(loc, elementType, adaptor.getComplex());
Value expReal = rewriter.create<math::ExpOp>(loc, real);
Value cosImag = rewriter.create<math::CosOp>(loc, imag);
Value resultReal = rewriter.create<arith::MulFOp>(loc, expReal, cosImag);
Value sinImag = rewriter.create<math::SinOp>(loc, imag);
Value resultImag = rewriter.create<arith::MulFOp>(loc, expReal, sinImag);
rewriter.replaceOpWithNewOp<complex::CreateOp>(op, type, resultReal,
resultImag);
return success();
}
};
struct LogOpConversion : public OpConversionPattern<complex::LogOp> {
using OpConversionPattern<complex::LogOp>::OpConversionPattern;
LogicalResult
matchAndRewrite(complex::LogOp op, OpAdaptor adaptor,
ConversionPatternRewriter &rewriter) const override {
auto type = adaptor.getComplex().getType().cast<ComplexType>();
auto elementType = type.getElementType().cast<FloatType>();
mlir::ImplicitLocOpBuilder b(op.getLoc(), rewriter);
Value abs = b.create<complex::AbsOp>(elementType, adaptor.getComplex());
Value resultReal = b.create<math::LogOp>(elementType, abs);
Value real = b.create<complex::ReOp>(elementType, adaptor.getComplex());
Value imag = b.create<complex::ImOp>(elementType, adaptor.getComplex());
Value resultImag = b.create<math::Atan2Op>(elementType, imag, real);
rewriter.replaceOpWithNewOp<complex::CreateOp>(op, type, resultReal,
resultImag);
return success();
}
};
struct Log1pOpConversion : public OpConversionPattern<complex::Log1pOp> {
using OpConversionPattern<complex::Log1pOp>::OpConversionPattern;
LogicalResult
matchAndRewrite(complex::Log1pOp op, OpAdaptor adaptor,
ConversionPatternRewriter &rewriter) const override {
auto type = adaptor.getComplex().getType().cast<ComplexType>();
auto elementType = type.getElementType().cast<FloatType>();
mlir::ImplicitLocOpBuilder b(op.getLoc(), rewriter);
Value real = b.create<complex::ReOp>(elementType, adaptor.getComplex());
Value imag = b.create<complex::ImOp>(elementType, adaptor.getComplex());
Value one = b.create<arith::ConstantOp>(elementType,
b.getFloatAttr(elementType, 1));
Value realPlusOne = b.create<arith::AddFOp>(real, one);
Value newComplex = b.create<complex::CreateOp>(type, realPlusOne, imag);
rewriter.replaceOpWithNewOp<complex::LogOp>(op, type, newComplex);
return success();
}
};
struct MulOpConversion : public OpConversionPattern<complex::MulOp> {
using OpConversionPattern<complex::MulOp>::OpConversionPattern;
LogicalResult
matchAndRewrite(complex::MulOp op, OpAdaptor adaptor,
ConversionPatternRewriter &rewriter) const override {
mlir::ImplicitLocOpBuilder b(op.getLoc(), rewriter);
auto type = adaptor.getLhs().getType().cast<ComplexType>();
auto elementType = type.getElementType().cast<FloatType>();
Value lhsReal = b.create<complex::ReOp>(elementType, adaptor.getLhs());
Value lhsRealAbs = b.create<math::AbsOp>(lhsReal);
Value lhsImag = b.create<complex::ImOp>(elementType, adaptor.getLhs());
Value lhsImagAbs = b.create<math::AbsOp>(lhsImag);
Value rhsReal = b.create<complex::ReOp>(elementType, adaptor.getRhs());
Value rhsRealAbs = b.create<math::AbsOp>(rhsReal);
Value rhsImag = b.create<complex::ImOp>(elementType, adaptor.getRhs());
Value rhsImagAbs = b.create<math::AbsOp>(rhsImag);
Value lhsRealTimesRhsReal = b.create<arith::MulFOp>(lhsReal, rhsReal);
Value lhsRealTimesRhsRealAbs = b.create<math::AbsOp>(lhsRealTimesRhsReal);
Value lhsImagTimesRhsImag = b.create<arith::MulFOp>(lhsImag, rhsImag);
Value lhsImagTimesRhsImagAbs = b.create<math::AbsOp>(lhsImagTimesRhsImag);
Value real =
b.create<arith::SubFOp>(lhsRealTimesRhsReal, lhsImagTimesRhsImag);
Value lhsImagTimesRhsReal = b.create<arith::MulFOp>(lhsImag, rhsReal);
Value lhsImagTimesRhsRealAbs = b.create<math::AbsOp>(lhsImagTimesRhsReal);
Value lhsRealTimesRhsImag = b.create<arith::MulFOp>(lhsReal, rhsImag);
Value lhsRealTimesRhsImagAbs = b.create<math::AbsOp>(lhsRealTimesRhsImag);
Value imag =
b.create<arith::AddFOp>(lhsImagTimesRhsReal, lhsRealTimesRhsImag);
// Handle cases where the "naive" calculation results in NaN values.
Value realIsNan =
b.create<arith::CmpFOp>(arith::CmpFPredicate::UNO, real, real);
Value imagIsNan =
b.create<arith::CmpFOp>(arith::CmpFPredicate::UNO, imag, imag);
Value isNan = b.create<arith::AndIOp>(realIsNan, imagIsNan);
Value inf = b.create<arith::ConstantOp>(
elementType,
b.getFloatAttr(elementType,
APFloat::getInf(elementType.getFloatSemantics())));
// Case 1. `lhsReal` or `lhsImag` are infinite.
Value lhsRealIsInf =
b.create<arith::CmpFOp>(arith::CmpFPredicate::OEQ, lhsRealAbs, inf);
Value lhsImagIsInf =
b.create<arith::CmpFOp>(arith::CmpFPredicate::OEQ, lhsImagAbs, inf);
Value lhsIsInf = b.create<arith::OrIOp>(lhsRealIsInf, lhsImagIsInf);
Value rhsRealIsNan =
b.create<arith::CmpFOp>(arith::CmpFPredicate::UNO, rhsReal, rhsReal);
Value rhsImagIsNan =
b.create<arith::CmpFOp>(arith::CmpFPredicate::UNO, rhsImag, rhsImag);
Value zero =
b.create<arith::ConstantOp>(elementType, b.getZeroAttr(elementType));
Value one = b.create<arith::ConstantOp>(elementType,
b.getFloatAttr(elementType, 1));
Value lhsRealIsInfFloat =
b.create<arith::SelectOp>(lhsRealIsInf, one, zero);
lhsReal = b.create<arith::SelectOp>(
lhsIsInf, b.create<math::CopySignOp>(lhsRealIsInfFloat, lhsReal),
lhsReal);
Value lhsImagIsInfFloat =
b.create<arith::SelectOp>(lhsImagIsInf, one, zero);
lhsImag = b.create<arith::SelectOp>(
lhsIsInf, b.create<math::CopySignOp>(lhsImagIsInfFloat, lhsImag),
lhsImag);
Value lhsIsInfAndRhsRealIsNan =
b.create<arith::AndIOp>(lhsIsInf, rhsRealIsNan);
rhsReal = b.create<arith::SelectOp>(
lhsIsInfAndRhsRealIsNan, b.create<math::CopySignOp>(zero, rhsReal),
rhsReal);
Value lhsIsInfAndRhsImagIsNan =
b.create<arith::AndIOp>(lhsIsInf, rhsImagIsNan);
rhsImag = b.create<arith::SelectOp>(
lhsIsInfAndRhsImagIsNan, b.create<math::CopySignOp>(zero, rhsImag),
rhsImag);
// Case 2. `rhsReal` or `rhsImag` are infinite.
Value rhsRealIsInf =
b.create<arith::CmpFOp>(arith::CmpFPredicate::OEQ, rhsRealAbs, inf);
Value rhsImagIsInf =
b.create<arith::CmpFOp>(arith::CmpFPredicate::OEQ, rhsImagAbs, inf);
Value rhsIsInf = b.create<arith::OrIOp>(rhsRealIsInf, rhsImagIsInf);
Value lhsRealIsNan =
b.create<arith::CmpFOp>(arith::CmpFPredicate::UNO, lhsReal, lhsReal);
Value lhsImagIsNan =
b.create<arith::CmpFOp>(arith::CmpFPredicate::UNO, lhsImag, lhsImag);
Value rhsRealIsInfFloat =
b.create<arith::SelectOp>(rhsRealIsInf, one, zero);
rhsReal = b.create<arith::SelectOp>(
rhsIsInf, b.create<math::CopySignOp>(rhsRealIsInfFloat, rhsReal),
rhsReal);
Value rhsImagIsInfFloat =
b.create<arith::SelectOp>(rhsImagIsInf, one, zero);
rhsImag = b.create<arith::SelectOp>(
rhsIsInf, b.create<math::CopySignOp>(rhsImagIsInfFloat, rhsImag),
rhsImag);
Value rhsIsInfAndLhsRealIsNan =
b.create<arith::AndIOp>(rhsIsInf, lhsRealIsNan);
lhsReal = b.create<arith::SelectOp>(
rhsIsInfAndLhsRealIsNan, b.create<math::CopySignOp>(zero, lhsReal),
lhsReal);
Value rhsIsInfAndLhsImagIsNan =
b.create<arith::AndIOp>(rhsIsInf, lhsImagIsNan);
lhsImag = b.create<arith::SelectOp>(
rhsIsInfAndLhsImagIsNan, b.create<math::CopySignOp>(zero, lhsImag),
lhsImag);
Value recalc = b.create<arith::OrIOp>(lhsIsInf, rhsIsInf);
// Case 3. One of the pairwise products of left hand side with right hand
// side is infinite.
Value lhsRealTimesRhsRealIsInf = b.create<arith::CmpFOp>(
arith::CmpFPredicate::OEQ, lhsRealTimesRhsRealAbs, inf);
Value lhsImagTimesRhsImagIsInf = b.create<arith::CmpFOp>(
arith::CmpFPredicate::OEQ, lhsImagTimesRhsImagAbs, inf);
Value isSpecialCase = b.create<arith::OrIOp>(lhsRealTimesRhsRealIsInf,
lhsImagTimesRhsImagIsInf);
Value lhsRealTimesRhsImagIsInf = b.create<arith::CmpFOp>(
arith::CmpFPredicate::OEQ, lhsRealTimesRhsImagAbs, inf);
isSpecialCase =
b.create<arith::OrIOp>(isSpecialCase, lhsRealTimesRhsImagIsInf);
Value lhsImagTimesRhsRealIsInf = b.create<arith::CmpFOp>(
arith::CmpFPredicate::OEQ, lhsImagTimesRhsRealAbs, inf);
isSpecialCase =
b.create<arith::OrIOp>(isSpecialCase, lhsImagTimesRhsRealIsInf);
Type i1Type = b.getI1Type();
Value notRecalc = b.create<arith::XOrIOp>(
recalc,
b.create<arith::ConstantOp>(i1Type, b.getIntegerAttr(i1Type, 1)));
isSpecialCase = b.create<arith::AndIOp>(isSpecialCase, notRecalc);
Value isSpecialCaseAndLhsRealIsNan =
b.create<arith::AndIOp>(isSpecialCase, lhsRealIsNan);
lhsReal = b.create<arith::SelectOp>(
isSpecialCaseAndLhsRealIsNan, b.create<math::CopySignOp>(zero, lhsReal),
lhsReal);
Value isSpecialCaseAndLhsImagIsNan =
b.create<arith::AndIOp>(isSpecialCase, lhsImagIsNan);
lhsImag = b.create<arith::SelectOp>(
isSpecialCaseAndLhsImagIsNan, b.create<math::CopySignOp>(zero, lhsImag),
lhsImag);
Value isSpecialCaseAndRhsRealIsNan =
b.create<arith::AndIOp>(isSpecialCase, rhsRealIsNan);
rhsReal = b.create<arith::SelectOp>(
isSpecialCaseAndRhsRealIsNan, b.create<math::CopySignOp>(zero, rhsReal),
rhsReal);
Value isSpecialCaseAndRhsImagIsNan =
b.create<arith::AndIOp>(isSpecialCase, rhsImagIsNan);
rhsImag = b.create<arith::SelectOp>(
isSpecialCaseAndRhsImagIsNan, b.create<math::CopySignOp>(zero, rhsImag),
rhsImag);
recalc = b.create<arith::OrIOp>(recalc, isSpecialCase);
recalc = b.create<arith::AndIOp>(isNan, recalc);
// Recalculate real part.
lhsRealTimesRhsReal = b.create<arith::MulFOp>(lhsReal, rhsReal);
lhsImagTimesRhsImag = b.create<arith::MulFOp>(lhsImag, rhsImag);
Value newReal =
b.create<arith::SubFOp>(lhsRealTimesRhsReal, lhsImagTimesRhsImag);
real = b.create<arith::SelectOp>(
recalc, b.create<arith::MulFOp>(inf, newReal), real);
// Recalculate imag part.
lhsImagTimesRhsReal = b.create<arith::MulFOp>(lhsImag, rhsReal);
lhsRealTimesRhsImag = b.create<arith::MulFOp>(lhsReal, rhsImag);
Value newImag =
b.create<arith::AddFOp>(lhsImagTimesRhsReal, lhsRealTimesRhsImag);
imag = b.create<arith::SelectOp>(
recalc, b.create<arith::MulFOp>(inf, newImag), imag);
rewriter.replaceOpWithNewOp<complex::CreateOp>(op, type, real, imag);
return success();
}
};
struct NegOpConversion : public OpConversionPattern<complex::NegOp> {
using OpConversionPattern<complex::NegOp>::OpConversionPattern;
LogicalResult
matchAndRewrite(complex::NegOp op, OpAdaptor adaptor,
ConversionPatternRewriter &rewriter) const override {
auto loc = op.getLoc();
auto type = adaptor.getComplex().getType().cast<ComplexType>();
auto elementType = type.getElementType().cast<FloatType>();
Value real =
rewriter.create<complex::ReOp>(loc, elementType, adaptor.getComplex());
Value imag =
rewriter.create<complex::ImOp>(loc, elementType, adaptor.getComplex());
Value negReal = rewriter.create<arith::NegFOp>(loc, real);
Value negImag = rewriter.create<arith::NegFOp>(loc, imag);
rewriter.replaceOpWithNewOp<complex::CreateOp>(op, type, negReal, negImag);
return success();
}
};
struct SignOpConversion : public OpConversionPattern<complex::SignOp> {
using OpConversionPattern<complex::SignOp>::OpConversionPattern;
LogicalResult
matchAndRewrite(complex::SignOp op, OpAdaptor adaptor,
ConversionPatternRewriter &rewriter) const override {
auto type = adaptor.getComplex().getType().cast<ComplexType>();
auto elementType = type.getElementType().cast<FloatType>();
mlir::ImplicitLocOpBuilder b(op.getLoc(), rewriter);
Value real = b.create<complex::ReOp>(elementType, adaptor.getComplex());
Value imag = b.create<complex::ImOp>(elementType, adaptor.getComplex());
Value zero =
b.create<arith::ConstantOp>(elementType, b.getZeroAttr(elementType));
Value realIsZero =
b.create<arith::CmpFOp>(arith::CmpFPredicate::OEQ, real, zero);
Value imagIsZero =
b.create<arith::CmpFOp>(arith::CmpFPredicate::OEQ, imag, zero);
Value isZero = b.create<arith::AndIOp>(realIsZero, imagIsZero);
auto abs = b.create<complex::AbsOp>(elementType, adaptor.getComplex());
Value realSign = b.create<arith::DivFOp>(real, abs);
Value imagSign = b.create<arith::DivFOp>(imag, abs);
Value sign = b.create<complex::CreateOp>(type, realSign, imagSign);
rewriter.replaceOpWithNewOp<arith::SelectOp>(op, isZero,
adaptor.getComplex(), sign);
return success();
}
};
} // namespace
void mlir::populateComplexToStandardConversionPatterns(
RewritePatternSet &patterns) {
// clang-format off
patterns.add<
AbsOpConversion,
ComparisonOpConversion<complex::EqualOp, arith::CmpFPredicate::OEQ>,
ComparisonOpConversion<complex::NotEqualOp, arith::CmpFPredicate::UNE>,
BinaryComplexOpConversion<complex::AddOp, arith::AddFOp>,
BinaryComplexOpConversion<complex::SubOp, arith::SubFOp>,
DivOpConversion,
ExpOpConversion,
LogOpConversion,
Log1pOpConversion,
MulOpConversion,
NegOpConversion,
SignOpConversion>(patterns.getContext());
// clang-format on
}
namespace {
struct ConvertComplexToStandardPass
: public ConvertComplexToStandardBase<ConvertComplexToStandardPass> {
void runOnOperation() override;
};
void ConvertComplexToStandardPass::runOnOperation() {
auto function = getOperation();
// Convert to the Standard dialect using the converter defined above.
RewritePatternSet patterns(&getContext());
populateComplexToStandardConversionPatterns(patterns);
ConversionTarget target(getContext());
target.addLegalDialect<arith::ArithmeticDialect, func::FuncDialect,
math::MathDialect>();
target.addLegalOp<complex::CreateOp, complex::ImOp, complex::ReOp>();
if (failed(applyPartialConversion(function, target, std::move(patterns))))
signalPassFailure();
}
} // namespace
std::unique_ptr<OperationPass<FuncOp>>
mlir::createConvertComplexToStandardPass() {
return std::make_unique<ConvertComplexToStandardPass>();
}