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342 lines
12 KiB
C++
342 lines
12 KiB
C++
// Copyright 2017 The Chromium Authors. All rights reserved.
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// Use of this source code is governed by a BSD-style license that can be
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// found in the LICENSE file.
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#ifndef BASE_NUMERICS_CLAMPED_MATH_IMPL_H_
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#define BASE_NUMERICS_CLAMPED_MATH_IMPL_H_
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#include <stddef.h>
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#include <stdint.h>
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#include <climits>
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#include <cmath>
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#include <cstdlib>
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#include <limits>
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#include <type_traits>
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#include "base/numerics/checked_math.h"
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#include "base/numerics/safe_conversions.h"
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#include "base/numerics/safe_math_shared_impl.h"
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namespace base {
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namespace internal {
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template <typename T,
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typename std::enable_if<std::is_integral<T>::value &&
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std::is_signed<T>::value>::type* = nullptr>
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constexpr T SaturatedNegWrapper(T value) {
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return MustTreatAsConstexpr(value) || !ClampedNegFastOp<T>::is_supported
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? (NegateWrapper(value) != std::numeric_limits<T>::lowest()
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? NegateWrapper(value)
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: std::numeric_limits<T>::max())
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: ClampedNegFastOp<T>::Do(value);
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}
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template <typename T,
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typename std::enable_if<std::is_integral<T>::value &&
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!std::is_signed<T>::value>::type* = nullptr>
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constexpr T SaturatedNegWrapper(T value) {
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return T(0);
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}
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template <
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typename T,
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typename std::enable_if<std::is_floating_point<T>::value>::type* = nullptr>
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constexpr T SaturatedNegWrapper(T value) {
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return -value;
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}
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template <typename T,
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typename std::enable_if<std::is_integral<T>::value>::type* = nullptr>
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constexpr T SaturatedAbsWrapper(T value) {
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// The calculation below is a static identity for unsigned types, but for
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// signed integer types it provides a non-branching, saturated absolute value.
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// This works because SafeUnsignedAbs() returns an unsigned type, which can
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// represent the absolute value of all negative numbers of an equal-width
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// integer type. The call to IsValueNegative() then detects overflow in the
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// special case of numeric_limits<T>::min(), by evaluating the bit pattern as
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// a signed integer value. If it is the overflow case, we end up subtracting
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// one from the unsigned result, thus saturating to numeric_limits<T>::max().
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return static_cast<T>(SafeUnsignedAbs(value) -
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IsValueNegative<T>(SafeUnsignedAbs(value)));
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}
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template <
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typename T,
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typename std::enable_if<std::is_floating_point<T>::value>::type* = nullptr>
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constexpr T SaturatedAbsWrapper(T value) {
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return value < 0 ? -value : value;
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}
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template <typename T, typename U, class Enable = void>
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struct ClampedAddOp {};
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template <typename T, typename U>
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struct ClampedAddOp<T,
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U,
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typename std::enable_if<std::is_integral<T>::value &&
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std::is_integral<U>::value>::type> {
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using result_type = typename MaxExponentPromotion<T, U>::type;
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template <typename V = result_type>
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static constexpr V Do(T x, U y) {
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if (ClampedAddFastOp<T, U>::is_supported)
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return ClampedAddFastOp<T, U>::template Do<V>(x, y);
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static_assert(std::is_same<V, result_type>::value ||
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IsTypeInRangeForNumericType<U, V>::value,
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"The saturation result cannot be determined from the "
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"provided types.");
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const V saturated = CommonMaxOrMin<V>(IsValueNegative(y));
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V result = {};
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return BASE_NUMERICS_LIKELY((CheckedAddOp<T, U>::Do(x, y, &result)))
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? result
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: saturated;
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}
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};
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template <typename T, typename U, class Enable = void>
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struct ClampedSubOp {};
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template <typename T, typename U>
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struct ClampedSubOp<T,
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U,
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typename std::enable_if<std::is_integral<T>::value &&
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std::is_integral<U>::value>::type> {
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using result_type = typename MaxExponentPromotion<T, U>::type;
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template <typename V = result_type>
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static constexpr V Do(T x, U y) {
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// TODO(jschuh) Make this "constexpr if" once we're C++17.
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if (ClampedSubFastOp<T, U>::is_supported)
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return ClampedSubFastOp<T, U>::template Do<V>(x, y);
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static_assert(std::is_same<V, result_type>::value ||
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IsTypeInRangeForNumericType<U, V>::value,
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"The saturation result cannot be determined from the "
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"provided types.");
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const V saturated = CommonMaxOrMin<V>(!IsValueNegative(y));
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V result = {};
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return BASE_NUMERICS_LIKELY((CheckedSubOp<T, U>::Do(x, y, &result)))
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? result
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: saturated;
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}
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};
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template <typename T, typename U, class Enable = void>
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struct ClampedMulOp {};
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template <typename T, typename U>
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struct ClampedMulOp<T,
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U,
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typename std::enable_if<std::is_integral<T>::value &&
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std::is_integral<U>::value>::type> {
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using result_type = typename MaxExponentPromotion<T, U>::type;
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template <typename V = result_type>
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static constexpr V Do(T x, U y) {
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// TODO(jschuh) Make this "constexpr if" once we're C++17.
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if (ClampedMulFastOp<T, U>::is_supported)
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return ClampedMulFastOp<T, U>::template Do<V>(x, y);
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V result = {};
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const V saturated =
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CommonMaxOrMin<V>(IsValueNegative(x) ^ IsValueNegative(y));
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return BASE_NUMERICS_LIKELY((CheckedMulOp<T, U>::Do(x, y, &result)))
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? result
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: saturated;
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}
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};
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template <typename T, typename U, class Enable = void>
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struct ClampedDivOp {};
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template <typename T, typename U>
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struct ClampedDivOp<T,
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U,
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typename std::enable_if<std::is_integral<T>::value &&
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std::is_integral<U>::value>::type> {
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using result_type = typename MaxExponentPromotion<T, U>::type;
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template <typename V = result_type>
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static constexpr V Do(T x, U y) {
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V result = {};
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if (BASE_NUMERICS_LIKELY((CheckedDivOp<T, U>::Do(x, y, &result))))
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return result;
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// Saturation goes to max, min, or NaN (if x is zero).
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return x ? CommonMaxOrMin<V>(IsValueNegative(x) ^ IsValueNegative(y))
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: SaturationDefaultLimits<V>::NaN();
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}
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};
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template <typename T, typename U, class Enable = void>
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struct ClampedModOp {};
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template <typename T, typename U>
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struct ClampedModOp<T,
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U,
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typename std::enable_if<std::is_integral<T>::value &&
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std::is_integral<U>::value>::type> {
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using result_type = typename MaxExponentPromotion<T, U>::type;
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template <typename V = result_type>
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static constexpr V Do(T x, U y) {
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V result = {};
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return BASE_NUMERICS_LIKELY((CheckedModOp<T, U>::Do(x, y, &result)))
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? result
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: x;
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}
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};
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template <typename T, typename U, class Enable = void>
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struct ClampedLshOp {};
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// Left shift. Non-zero values saturate in the direction of the sign. A zero
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// shifted by any value always results in zero.
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template <typename T, typename U>
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struct ClampedLshOp<T,
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U,
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typename std::enable_if<std::is_integral<T>::value &&
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std::is_integral<U>::value>::type> {
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using result_type = T;
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template <typename V = result_type>
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static constexpr V Do(T x, U shift) {
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static_assert(!std::is_signed<U>::value, "Shift value must be unsigned.");
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if (BASE_NUMERICS_LIKELY(shift < std::numeric_limits<T>::digits)) {
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// Shift as unsigned to avoid undefined behavior.
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V result = static_cast<V>(as_unsigned(x) << shift);
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// If the shift can be reversed, we know it was valid.
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if (BASE_NUMERICS_LIKELY(result >> shift == x))
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return result;
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}
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return x ? CommonMaxOrMin<V>(IsValueNegative(x)) : 0;
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}
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};
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template <typename T, typename U, class Enable = void>
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struct ClampedRshOp {};
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// Right shift. Negative values saturate to -1. Positive or 0 saturates to 0.
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template <typename T, typename U>
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struct ClampedRshOp<T,
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U,
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typename std::enable_if<std::is_integral<T>::value &&
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std::is_integral<U>::value>::type> {
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using result_type = T;
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template <typename V = result_type>
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static constexpr V Do(T x, U shift) {
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static_assert(!std::is_signed<U>::value, "Shift value must be unsigned.");
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// Signed right shift is odd, because it saturates to -1 or 0.
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const V saturated = as_unsigned(V(0)) - IsValueNegative(x);
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return BASE_NUMERICS_LIKELY(shift < IntegerBitsPlusSign<T>::value)
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? saturated_cast<V>(x >> shift)
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: saturated;
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}
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};
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template <typename T, typename U, class Enable = void>
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struct ClampedAndOp {};
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template <typename T, typename U>
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struct ClampedAndOp<T,
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U,
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typename std::enable_if<std::is_integral<T>::value &&
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std::is_integral<U>::value>::type> {
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using result_type = typename std::make_unsigned<
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typename MaxExponentPromotion<T, U>::type>::type;
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template <typename V>
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static constexpr V Do(T x, U y) {
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return static_cast<result_type>(x) & static_cast<result_type>(y);
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}
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};
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template <typename T, typename U, class Enable = void>
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struct ClampedOrOp {};
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// For simplicity we promote to unsigned integers.
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template <typename T, typename U>
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struct ClampedOrOp<T,
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U,
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typename std::enable_if<std::is_integral<T>::value &&
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std::is_integral<U>::value>::type> {
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using result_type = typename std::make_unsigned<
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typename MaxExponentPromotion<T, U>::type>::type;
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template <typename V>
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static constexpr V Do(T x, U y) {
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return static_cast<result_type>(x) | static_cast<result_type>(y);
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}
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};
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template <typename T, typename U, class Enable = void>
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struct ClampedXorOp {};
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// For simplicity we support only unsigned integers.
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template <typename T, typename U>
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struct ClampedXorOp<T,
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U,
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typename std::enable_if<std::is_integral<T>::value &&
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std::is_integral<U>::value>::type> {
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using result_type = typename std::make_unsigned<
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typename MaxExponentPromotion<T, U>::type>::type;
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template <typename V>
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static constexpr V Do(T x, U y) {
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return static_cast<result_type>(x) ^ static_cast<result_type>(y);
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}
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};
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template <typename T, typename U, class Enable = void>
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struct ClampedMaxOp {};
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template <typename T, typename U>
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struct ClampedMaxOp<
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T,
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U,
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typename std::enable_if<std::is_arithmetic<T>::value &&
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std::is_arithmetic<U>::value>::type> {
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using result_type = typename MaxExponentPromotion<T, U>::type;
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template <typename V = result_type>
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static constexpr V Do(T x, U y) {
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return IsGreater<T, U>::Test(x, y) ? saturated_cast<V>(x)
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: saturated_cast<V>(y);
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}
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};
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template <typename T, typename U, class Enable = void>
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struct ClampedMinOp {};
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template <typename T, typename U>
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struct ClampedMinOp<
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T,
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U,
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typename std::enable_if<std::is_arithmetic<T>::value &&
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std::is_arithmetic<U>::value>::type> {
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using result_type = typename LowestValuePromotion<T, U>::type;
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template <typename V = result_type>
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static constexpr V Do(T x, U y) {
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return IsLess<T, U>::Test(x, y) ? saturated_cast<V>(x)
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: saturated_cast<V>(y);
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}
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};
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// This is just boilerplate that wraps the standard floating point arithmetic.
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// A macro isn't the nicest solution, but it beats rewriting these repeatedly.
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#define BASE_FLOAT_ARITHMETIC_OPS(NAME, OP) \
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template <typename T, typename U> \
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struct Clamped##NAME##Op< \
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T, U, \
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typename std::enable_if<std::is_floating_point<T>::value || \
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std::is_floating_point<U>::value>::type> { \
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using result_type = typename MaxExponentPromotion<T, U>::type; \
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template <typename V = result_type> \
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static constexpr V Do(T x, U y) { \
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return saturated_cast<V>(x OP y); \
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} \
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};
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BASE_FLOAT_ARITHMETIC_OPS(Add, +)
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BASE_FLOAT_ARITHMETIC_OPS(Sub, -)
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BASE_FLOAT_ARITHMETIC_OPS(Mul, *)
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BASE_FLOAT_ARITHMETIC_OPS(Div, /)
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#undef BASE_FLOAT_ARITHMETIC_OPS
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} // namespace internal
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} // namespace base
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#endif // BASE_NUMERICS_CLAMPED_MATH_IMPL_H_
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