From 747b62f119668e2c4d8622242fbc4b581c34084e Mon Sep 17 00:00:00 2001 From: "Duncan P. N. Exon Smith" Date: Mon, 23 Jun 2014 23:57:12 +0000 Subject: BFI: Change language from "exponent" to "scale" git-svn-id: https://llvm.org/svn/llvm-project/llvm/trunk@211557 91177308-0d34-0410-b5e6-96231b3b80d8 --- include/llvm/Analysis/BlockFrequencyInfoImpl.h | 104 ++++++++++++------------- 1 file changed, 51 insertions(+), 53 deletions(-) (limited to 'include') diff --git a/include/llvm/Analysis/BlockFrequencyInfoImpl.h b/include/llvm/Analysis/BlockFrequencyInfoImpl.h index ffba30781f..618b6e3366 100644 --- a/include/llvm/Analysis/BlockFrequencyInfoImpl.h +++ b/include/llvm/Analysis/BlockFrequencyInfoImpl.h @@ -42,8 +42,8 @@ namespace llvm { class ScaledNumberBase { public: - static const int32_t MaxExponent = 16383; - static const int32_t MinExponent = -16382; + static const int32_t MaxScale = 16383; + static const int32_t MinScale = -16382; static const int DefaultPrecision = 10; static void dump(uint64_t D, int16_t E, int Width); @@ -78,7 +78,7 @@ public: /// metrics. /// /// The number is split into a signed scale and unsigned digits. The number -/// represented is \c getDigits()*2^getExponent(). In this way, the digits are +/// represented is \c getDigits()*2^getScale(). In this way, the digits are /// much like the mantissa in the x87 long double, but there is no canonical /// form so the same number can be represented by many bit representations. /// @@ -106,7 +106,7 @@ public: /// both implemented, and both interpret negative shifts as positive shifts in /// the opposite direction. /// -/// Exponents are limited to the range accepted by x87 long double. This makes +/// Scales are limited to the range accepted by x87 long double. This makes /// it trivial to add functionality to convert to APFloat (this is already /// relied on for the implementation of printing). /// @@ -130,23 +130,23 @@ private: private: DigitsType Digits; - int16_t Exponent; + int16_t Scale; public: - ScaledNumber() : Digits(0), Exponent(0) {} + ScaledNumber() : Digits(0), Scale(0) {} - ScaledNumber(DigitsType Digits, int16_t Exponent) - : Digits(Digits), Exponent(Exponent) {} + ScaledNumber(DigitsType Digits, int16_t Scale) + : Digits(Digits), Scale(Scale) {} private: ScaledNumber(const std::pair &X) - : Digits(X.first), Exponent(X.second) {} + : Digits(X.first), Scale(X.second) {} public: static ScaledNumber getZero() { return ScaledNumber(0, 0); } static ScaledNumber getOne() { return ScaledNumber(1, 0); } static ScaledNumber getLargest() { - return ScaledNumber(DigitsLimits::max(), MaxExponent); + return ScaledNumber(DigitsLimits::max(), MaxScale); } static ScaledNumber getFloat(uint64_t N) { return adjustToWidth(N, 0); } static ScaledNumber getInverseFloat(uint64_t N) { @@ -156,7 +156,7 @@ public: return getQuotient(N, D); } - int16_t getExponent() const { return Exponent; } + int16_t getScale() const { return Scale; } DigitsType getDigits() const { return Digits; } /// \brief Convert to the given integer type. @@ -168,28 +168,26 @@ public: bool isZero() const { return !Digits; } bool isLargest() const { return *this == getLargest(); } bool isOne() const { - if (Exponent > 0 || Exponent <= -Width) + if (Scale > 0 || Scale <= -Width) return false; - return Digits == DigitsType(1) << -Exponent; + return Digits == DigitsType(1) << -Scale; } /// \brief The log base 2, rounded. /// /// Get the lg of the scalar. lg 0 is defined to be INT32_MIN. - int32_t lg() const { return ScaledNumbers::getLg(Digits, Exponent); } + int32_t lg() const { return ScaledNumbers::getLg(Digits, Scale); } /// \brief The log base 2, rounded towards INT32_MIN. /// /// Get the lg floor. lg 0 is defined to be INT32_MIN. - int32_t lgFloor() const { - return ScaledNumbers::getLgFloor(Digits, Exponent); - } + int32_t lgFloor() const { return ScaledNumbers::getLgFloor(Digits, Scale); } /// \brief The log base 2, rounded towards INT32_MAX. /// /// Get the lg ceiling. lg 0 is defined to be INT32_MIN. int32_t lgCeiling() const { - return ScaledNumbers::getLgCeiling(Digits, Exponent); + return ScaledNumbers::getLgCeiling(Digits, Scale); } bool operator==(const ScaledNumber &X) const { return compare(X) == 0; } @@ -221,7 +219,7 @@ public: /// 65432198.7654... => 65432198.77 /// 5432198.7654... => 5432198.765 std::string toString(unsigned Precision = DefaultPrecision) { - return ScaledNumberBase::toString(Digits, Exponent, Width, Precision); + return ScaledNumberBase::toString(Digits, Scale, Width, Precision); } /// \brief Print a decimal representation. @@ -229,21 +227,21 @@ public: /// Print a string. See toString for documentation. raw_ostream &print(raw_ostream &OS, unsigned Precision = DefaultPrecision) const { - return ScaledNumberBase::print(OS, Digits, Exponent, Width, Precision); + return ScaledNumberBase::print(OS, Digits, Scale, Width, Precision); } - void dump() const { return ScaledNumberBase::dump(Digits, Exponent, Width); } + void dump() const { return ScaledNumberBase::dump(Digits, Scale, Width); } ScaledNumber &operator+=(const ScaledNumber &X) { - std::tie(Digits, Exponent) = - ScaledNumbers::getSum(Digits, Exponent, X.Digits, X.Exponent); - // Check for exponent past MaxExponent. - if (Exponent > MaxExponent) + std::tie(Digits, Scale) = + ScaledNumbers::getSum(Digits, Scale, X.Digits, X.Scale); + // Check for exponent past MaxScale. + if (Scale > MaxScale) *this = getLargest(); return *this; } ScaledNumber &operator-=(const ScaledNumber &X) { - std::tie(Digits, Exponent) = - ScaledNumbers::getDifference(Digits, Exponent, X.Digits, X.Exponent); + std::tie(Digits, Scale) = + ScaledNumbers::getDifference(Digits, Scale, X.Digits, X.Scale); return *this; } ScaledNumber &operator*=(const ScaledNumber &X); @@ -268,8 +266,8 @@ private: /// /// The value that compares smaller will lose precision, and possibly become /// \a isZero(). - ScaledNumber matchExponents(ScaledNumber X) { - ScaledNumbers::matchScales(Digits, Exponent, X.Digits, X.Exponent); + ScaledNumber matchScales(ScaledNumber X) { + ScaledNumbers::matchScales(Digits, Scale, X.Digits, X.Scale); return X; } @@ -294,7 +292,7 @@ public: } int compare(const ScaledNumber &X) const { - return ScaledNumbers::compare(Digits, Exponent, X.Digits, X.Exponent); + return ScaledNumbers::compare(Digits, Scale, X.Digits, X.Scale); } int compareTo(uint64_t N) const { ScaledNumber Float = getFloat(N); @@ -331,10 +329,10 @@ private: /// /// Should only be called for \c Shift close to zero. /// - /// \pre Shift >= MinExponent && Shift + 64 <= MaxExponent. + /// \pre Shift >= MinScale && Shift + 64 <= MaxScale. static ScaledNumber adjustToWidth(uint64_t N, int32_t Shift) { - assert(Shift >= MinExponent && "Shift should be close to 0"); - assert(Shift <= MaxExponent - 64 && "Shift should be close to 0"); + assert(Shift >= MinScale && "Shift should be close to 0"); + assert(Shift <= MaxScale - 64 && "Shift should be close to 0"); auto Adjusted = ScaledNumbers::getAdjusted(N, Shift); return Adjusted; } @@ -344,7 +342,7 @@ private: if (P.isLargest()) return P; - return ScaledNumbers::getRounded(P.Digits, P.Exponent, Round); + return ScaledNumbers::getRounded(P.Digits, P.Scale, Round); } }; @@ -396,7 +394,7 @@ uint64_t ScaledNumber::scale(uint64_t N) const { return (getFloat(N) * *this).template toInt(); // Defer to the 64-bit version. - return ScaledNumber(Digits, Exponent).scale(N); + return ScaledNumber(Digits, Scale).scale(N); } template @@ -409,13 +407,13 @@ IntT ScaledNumber::toInt() const { return Limits::max(); IntT N = Digits; - if (Exponent > 0) { - assert(size_t(Exponent) < sizeof(IntT) * 8); - return N << Exponent; + if (Scale > 0) { + assert(size_t(Scale) < sizeof(IntT) * 8); + return N << Scale; } - if (Exponent < 0) { - assert(size_t(-Exponent) < sizeof(IntT) * 8); - return N >> -Exponent; + if (Scale < 0) { + assert(size_t(-Scale) < sizeof(IntT) * 8); + return N >> -Scale; } return N; } @@ -429,13 +427,13 @@ operator*=(const ScaledNumber &X) { return *this = X; // Save the exponents. - int32_t Exponents = int32_t(Exponent) + int32_t(X.Exponent); + int32_t Scales = int32_t(Scale) + int32_t(X.Scale); // Get the raw product. *this = getProduct(Digits, X.Digits); // Combine with exponents. - return *this <<= Exponents; + return *this <<= Scales; } template ScaledNumber &ScaledNumber:: @@ -446,13 +444,13 @@ operator/=(const ScaledNumber &X) { return *this = getLargest(); // Save the exponents. - int32_t Exponents = int32_t(Exponent) - int32_t(X.Exponent); + int32_t Scales = int32_t(Scale) - int32_t(X.Scale); // Get the raw quotient. *this = getQuotient(Digits, X.Digits); // Combine with exponents. - return *this <<= Exponents; + return *this <<= Scales; } template void ScaledNumber::shiftLeft(int32_t Shift) { if (!Shift || isZero()) @@ -464,9 +462,9 @@ template void ScaledNumber::shiftLeft(int32_t Shift) { } // Shift as much as we can in the exponent. - int32_t ExponentShift = std::min(Shift, MaxExponent - Exponent); - Exponent += ExponentShift; - if (ExponentShift == Shift) + int32_t ScaleShift = std::min(Shift, MaxScale - Scale); + Scale += ScaleShift; + if (ScaleShift == Shift) return; // Check this late, since it's rare. @@ -474,7 +472,7 @@ template void ScaledNumber::shiftLeft(int32_t Shift) { return; // Shift the digits themselves. - Shift -= ExponentShift; + Shift -= ScaleShift; if (Shift > countLeadingZerosWidth(Digits)) { // Saturate. *this = getLargest(); @@ -495,13 +493,13 @@ template void ScaledNumber::shiftRight(int32_t Shift) { } // Shift as much as we can in the exponent. - int32_t ExponentShift = std::min(Shift, Exponent - MinExponent); - Exponent -= ExponentShift; - if (ExponentShift == Shift) + int32_t ScaleShift = std::min(Shift, Scale - MinScale); + Scale -= ScaleShift; + if (ScaleShift == Shift) return; // Shift the digits themselves. - Shift -= ExponentShift; + Shift -= ScaleShift; if (Shift >= Width) { // Saturate. *this = getZero(); -- cgit v1.2.3