absl/random/internal/uniform_helper.h - mirrors/cros/chromiumos/third_party/webrtc-apm - Git at Google

 // Copyright 2019 The Abseil Authors.
 //
 // Licensed under the Apache License, Version 2.0 (the "License");
 // you may not use this file except in compliance with the License.
 // You may obtain a copy of the License at
 //
 //      https://www.apache.org/licenses/LICENSE-2.0
 //
 // Unless required by applicable law or agreed to in writing, software
 // distributed under the License is distributed on an "AS IS" BASIS,
 // WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied.
 // See the License for the specific language governing permissions and
 // limitations under the License.
 //
 #ifndef ABSL_RANDOM_INTERNAL_UNIFORM_HELPER_H_
 #define ABSL_RANDOM_INTERNAL_UNIFORM_HELPER_H_

 #include <cmath>
 #include <limits>
 #include <type_traits>

 #include "absl/base/config.h"
 #include "absl/meta/type_traits.h"
 #include "absl/random/internal/traits.h"

 namespace absl {
 ABSL_NAMESPACE_BEGIN

 template <typename IntType>
 class uniform_int_distribution;

 template <typename RealType>
 class uniform_real_distribution;

 // Interval tag types which specify whether the interval is open or closed
 // on either boundary.

 namespace random_internal {
 template <typename T>
 struct TagTypeCompare {};

 template <typename T>
 constexpr bool operator==(TagTypeCompare<T>, TagTypeCompare<T>) {
   // Tags are mono-states. They always compare equal.
   return true;
 }
 template <typename T>
 constexpr bool operator!=(TagTypeCompare<T>, TagTypeCompare<T>) {
   return false;
 }

 }  // namespace random_internal

 struct IntervalClosedClosedTag
     : public random_internal::TagTypeCompare<IntervalClosedClosedTag> {};
 struct IntervalClosedOpenTag
     : public random_internal::TagTypeCompare<IntervalClosedOpenTag> {};
 struct IntervalOpenClosedTag
     : public random_internal::TagTypeCompare<IntervalOpenClosedTag> {};
 struct IntervalOpenOpenTag
     : public random_internal::TagTypeCompare<IntervalOpenOpenTag> {};

 namespace random_internal {

 // In the absence of an explicitly provided return-type, the template
 // "uniform_inferred_return_t<A, B>" is used to derive a suitable type, based on
 // the data-types of the endpoint-arguments {A lo, B hi}.
 //
 // Given endpoints {A lo, B hi}, one of {A, B} will be chosen as the
 // return-type, if one type can be implicitly converted into the other, in a
 // lossless way. The template "is_widening_convertible" implements the
 // compile-time logic for deciding if such a conversion is possible.
 //
 // If no such conversion between {A, B} exists, then the overload for
 // absl::Uniform() will be discarded, and the call will be ill-formed.
 // Return-type for absl::Uniform() when the return-type is inferred.
 template <typename A, typename B>
 using uniform_inferred_return_t =
     absl::enable_if_t<absl::disjunction<is_widening_convertible<A, B>,
                                         is_widening_convertible<B, A>>::value,
                       typename std::conditional<
                           is_widening_convertible<A, B>::value, B, A>::type>;

 // The functions
 //    uniform_lower_bound(tag, a, b)
 // and
 //    uniform_upper_bound(tag, a, b)
 // are used as implementation-details for absl::Uniform().
 //
 // Conceptually,
 //    [a, b] == [uniform_lower_bound(IntervalClosedClosed, a, b),
 //               uniform_upper_bound(IntervalClosedClosed, a, b)]
 //    (a, b) == [uniform_lower_bound(IntervalOpenOpen, a, b),
 //               uniform_upper_bound(IntervalOpenOpen, a, b)]
 //    [a, b) == [uniform_lower_bound(IntervalClosedOpen, a, b),
 //               uniform_upper_bound(IntervalClosedOpen, a, b)]
 //    (a, b] == [uniform_lower_bound(IntervalOpenClosed, a, b),
 //               uniform_upper_bound(IntervalOpenClosed, a, b)]
 //
 template <typename IntType, typename Tag>
 typename absl::enable_if_t<
     absl::conjunction<
         std::is_integral<IntType>,
         absl::disjunction<std::is_same<Tag, IntervalOpenClosedTag>,
                           std::is_same<Tag, IntervalOpenOpenTag>>>::value,
     IntType>
 uniform_lower_bound(Tag, IntType a, IntType) {
   return a < (std::numeric_limits<IntType>::max)() ? (a + 1) : a;
 }

 template <typename FloatType, typename Tag>
 typename absl::enable_if_t<
     absl::conjunction<
         std::is_floating_point<FloatType>,
         absl::disjunction<std::is_same<Tag, IntervalOpenClosedTag>,
                           std::is_same<Tag, IntervalOpenOpenTag>>>::value,
     FloatType>
 uniform_lower_bound(Tag, FloatType a, FloatType b) {
   return std::nextafter(a, b);
 }

 template <typename NumType, typename Tag>
 typename absl::enable_if_t<
     absl::disjunction<std::is_same<Tag, IntervalClosedClosedTag>,
                       std::is_same<Tag, IntervalClosedOpenTag>>::value,
     NumType>
 uniform_lower_bound(Tag, NumType a, NumType) {
   return a;
 }

 template <typename IntType, typename Tag>
 typename absl::enable_if_t<
     absl::conjunction<
         std::is_integral<IntType>,
         absl::disjunction<std::is_same<Tag, IntervalClosedOpenTag>,
                           std::is_same<Tag, IntervalOpenOpenTag>>>::value,
     IntType>
 uniform_upper_bound(Tag, IntType, IntType b) {
   return b > (std::numeric_limits<IntType>::min)() ? (b - 1) : b;
 }

 template <typename FloatType, typename Tag>
 typename absl::enable_if_t<
     absl::conjunction<
         std::is_floating_point<FloatType>,
         absl::disjunction<std::is_same<Tag, IntervalClosedOpenTag>,
                           std::is_same<Tag, IntervalOpenOpenTag>>>::value,
     FloatType>
 uniform_upper_bound(Tag, FloatType, FloatType b) {
   return b;
 }

 template <typename IntType, typename Tag>
 typename absl::enable_if_t<
     absl::conjunction<
         std::is_integral<IntType>,
         absl::disjunction<std::is_same<Tag, IntervalClosedClosedTag>,
                           std::is_same<Tag, IntervalOpenClosedTag>>>::value,
     IntType>
 uniform_upper_bound(Tag, IntType, IntType b) {
   return b;
 }

 template <typename FloatType, typename Tag>
 typename absl::enable_if_t<
     absl::conjunction<
         std::is_floating_point<FloatType>,
         absl::disjunction<std::is_same<Tag, IntervalClosedClosedTag>,
                           std::is_same<Tag, IntervalOpenClosedTag>>>::value,
     FloatType>
 uniform_upper_bound(Tag, FloatType, FloatType b) {
   return std::nextafter(b, (std::numeric_limits<FloatType>::max)());
 }

 // Returns whether the bounds are valid for the underlying distribution.
 // Inputs must have already been resolved via uniform_*_bound calls.
 //
 // The c++ standard constraints in [rand.dist.uni.int] are listed as:
 //    requires: lo <= hi.
 //
 // In the uniform_int_distrubtion, {lo, hi} are closed, closed. Thus:
 // [0, 0] is legal.
 // [0, 0) is not legal, but [0, 1) is, which translates to [0, 0].
 // (0, 1) is not legal, but (0, 2) is, which translates to [1, 1].
 // (0, 0] is not legal, but (0, 1] is, which translates to [1, 1].
 //
 // The c++ standard constraints in [rand.dist.uni.real] are listed as:
 //    requires: lo <= hi.
 //    requires: (hi - lo) <= numeric_limits<T>::max()
 //
 // In the uniform_real_distribution, {lo, hi} are closed, open, Thus:
 // [0, 0] is legal, which is [0, 0+epsilon).
 // [0, 0) is legal.
 // (0, 0) is not legal, but (0-epsilon, 0+epsilon) is.
 // (0, 0] is not legal, but (0, 0+epsilon] is.
 //
 template <typename FloatType>
 absl::enable_if_t<std::is_floating_point<FloatType>::value, bool>
 is_uniform_range_valid(FloatType a, FloatType b) {
   return a <= b && std::isfinite(b - a);
 }

 template <typename IntType>
 absl::enable_if_t<std::is_integral<IntType>::value, bool>
 is_uniform_range_valid(IntType a, IntType b) {
   return a <= b;
 }

 // UniformDistribution selects either absl::uniform_int_distribution
 // or absl::uniform_real_distribution depending on the NumType parameter.
 template <typename NumType>
 using UniformDistribution =
     typename std::conditional<std::is_integral<NumType>::value,
                               absl::uniform_int_distribution<NumType>,
                               absl::uniform_real_distribution<NumType>>::type;

 // UniformDistributionWrapper is used as the underlying distribution type
 // by the absl::Uniform template function. It selects the proper Abseil
 // uniform distribution and provides constructor overloads that match the
 // expected parameter order as well as adjusting distribtuion bounds based
 // on the tag.
 template <typename NumType>
 struct UniformDistributionWrapper : public UniformDistribution<NumType> {
   template <typename TagType>
   explicit UniformDistributionWrapper(TagType, NumType lo, NumType hi)
       : UniformDistribution<NumType>(
             uniform_lower_bound<NumType>(TagType{}, lo, hi),
             uniform_upper_bound<NumType>(TagType{}, lo, hi)) {}

   explicit UniformDistributionWrapper(NumType lo, NumType hi)
       : UniformDistribution<NumType>(
             uniform_lower_bound<NumType>(IntervalClosedOpenTag(), lo, hi),
             uniform_upper_bound<NumType>(IntervalClosedOpenTag(), lo, hi)) {}

   explicit UniformDistributionWrapper()
       : UniformDistribution<NumType>(std::numeric_limits<NumType>::lowest(),
                                      (std::numeric_limits<NumType>::max)()) {}
 };

 }  // namespace random_internal
 ABSL_NAMESPACE_END
 }  // namespace absl

 #endif  // ABSL_RANDOM_INTERNAL_UNIFORM_HELPER_H_
	// Copyright 2019 The Abseil Authors.
	//
	// Licensed under the Apache License, Version 2.0 (the "License");
	// you may not use this file except in compliance with the License.
	// You may obtain a copy of the License at
	//
	// https://www.apache.org/licenses/LICENSE-2.0
	//
	// Unless required by applicable law or agreed to in writing, software
	// distributed under the License is distributed on an "AS IS" BASIS,
	// WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied.
	// See the License for the specific language governing permissions and
	// limitations under the License.
	//
	#ifndef ABSL_RANDOM_INTERNAL_UNIFORM_HELPER_H_
	#define ABSL_RANDOM_INTERNAL_UNIFORM_HELPER_H_

	#include <cmath>
	#include <limits>
	#include <type_traits>

	#include "absl/base/config.h"
	#include "absl/meta/type_traits.h"
	#include "absl/random/internal/traits.h"

	namespace absl {
	ABSL_NAMESPACE_BEGIN

	template <typename IntType>
	class uniform_int_distribution;

	template <typename RealType>
	class uniform_real_distribution;

	// Interval tag types which specify whether the interval is open or closed
	// on either boundary.

	namespace random_internal {
	template <typename T>
	struct TagTypeCompare {};

	template <typename T>
	constexpr bool operator==(TagTypeCompare<T>, TagTypeCompare<T>) {
	// Tags are mono-states. They always compare equal.
	return true;
	}
	template <typename T>
	constexpr bool operator!=(TagTypeCompare<T>, TagTypeCompare<T>) {
	return false;
	}

	} // namespace random_internal

	struct IntervalClosedClosedTag
	: public random_internal::TagTypeCompare<IntervalClosedClosedTag> {};
	struct IntervalClosedOpenTag
	: public random_internal::TagTypeCompare<IntervalClosedOpenTag> {};
	struct IntervalOpenClosedTag
	: public random_internal::TagTypeCompare<IntervalOpenClosedTag> {};
	struct IntervalOpenOpenTag
	: public random_internal::TagTypeCompare<IntervalOpenOpenTag> {};

	namespace random_internal {

	// In the absence of an explicitly provided return-type, the template
	// "uniform_inferred_return_t<A, B>" is used to derive a suitable type, based on
	// the data-types of the endpoint-arguments {A lo, B hi}.
	//
	// Given endpoints {A lo, B hi}, one of {A, B} will be chosen as the
	// return-type, if one type can be implicitly converted into the other, in a
	// lossless way. The template "is_widening_convertible" implements the
	// compile-time logic for deciding if such a conversion is possible.
	//
	// If no such conversion between {A, B} exists, then the overload for
	// absl::Uniform() will be discarded, and the call will be ill-formed.
	// Return-type for absl::Uniform() when the return-type is inferred.
	template <typename A, typename B>
	using uniform_inferred_return_t =
	absl::enable_if_t<absl::disjunction<is_widening_convertible<A, B>,
	is_widening_convertible<B, A>>::value,
	typename std::conditional<
	is_widening_convertible<A, B>::value, B, A>::type>;

	// The functions
	// uniform_lower_bound(tag, a, b)
	// and
	// uniform_upper_bound(tag, a, b)
	// are used as implementation-details for absl::Uniform().
	//
	// Conceptually,
	// [a, b] == [uniform_lower_bound(IntervalClosedClosed, a, b),
	// uniform_upper_bound(IntervalClosedClosed, a, b)]
	// (a, b) == [uniform_lower_bound(IntervalOpenOpen, a, b),
	// uniform_upper_bound(IntervalOpenOpen, a, b)]
	// [a, b) == [uniform_lower_bound(IntervalClosedOpen, a, b),
	// uniform_upper_bound(IntervalClosedOpen, a, b)]
	// (a, b] == [uniform_lower_bound(IntervalOpenClosed, a, b),
	// uniform_upper_bound(IntervalOpenClosed, a, b)]
	//
	template <typename IntType, typename Tag>
	typename absl::enable_if_t<
	absl::conjunction<
	std::is_integral<IntType>,
	absl::disjunction<std::is_same<Tag, IntervalOpenClosedTag>,
	std::is_same<Tag, IntervalOpenOpenTag>>>::value,
	IntType>
	uniform_lower_bound(Tag, IntType a, IntType) {
	return a < (std::numeric_limits<IntType>::max)() ? (a + 1) : a;
	}

	template <typename FloatType, typename Tag>
	typename absl::enable_if_t<
	absl::conjunction<
	std::is_floating_point<FloatType>,
	absl::disjunction<std::is_same<Tag, IntervalOpenClosedTag>,
	std::is_same<Tag, IntervalOpenOpenTag>>>::value,
	FloatType>
	uniform_lower_bound(Tag, FloatType a, FloatType b) {
	return std::nextafter(a, b);
	}

	template <typename NumType, typename Tag>
	typename absl::enable_if_t<
	absl::disjunction<std::is_same<Tag, IntervalClosedClosedTag>,
	std::is_same<Tag, IntervalClosedOpenTag>>::value,
	NumType>
	uniform_lower_bound(Tag, NumType a, NumType) {
	return a;
	}

	template <typename IntType, typename Tag>
	typename absl::enable_if_t<
	absl::conjunction<
	std::is_integral<IntType>,
	absl::disjunction<std::is_same<Tag, IntervalClosedOpenTag>,
	std::is_same<Tag, IntervalOpenOpenTag>>>::value,
	IntType>
	uniform_upper_bound(Tag, IntType, IntType b) {
	return b > (std::numeric_limits<IntType>::min)() ? (b - 1) : b;
	}

	template <typename FloatType, typename Tag>
	typename absl::enable_if_t<
	absl::conjunction<
	std::is_floating_point<FloatType>,
	absl::disjunction<std::is_same<Tag, IntervalClosedOpenTag>,
	std::is_same<Tag, IntervalOpenOpenTag>>>::value,
	FloatType>
	uniform_upper_bound(Tag, FloatType, FloatType b) {
	return b;
	}

	template <typename IntType, typename Tag>
	typename absl::enable_if_t<
	absl::conjunction<
	std::is_integral<IntType>,
	absl::disjunction<std::is_same<Tag, IntervalClosedClosedTag>,
	std::is_same<Tag, IntervalOpenClosedTag>>>::value,
	IntType>
	uniform_upper_bound(Tag, IntType, IntType b) {
	return b;
	}

	template <typename FloatType, typename Tag>
	typename absl::enable_if_t<
	absl::conjunction<
	std::is_floating_point<FloatType>,
	absl::disjunction<std::is_same<Tag, IntervalClosedClosedTag>,
	std::is_same<Tag, IntervalOpenClosedTag>>>::value,
	FloatType>
	uniform_upper_bound(Tag, FloatType, FloatType b) {
	return std::nextafter(b, (std::numeric_limits<FloatType>::max)());
	}

	// Returns whether the bounds are valid for the underlying distribution.
	// Inputs must have already been resolved via uniform_*_bound calls.
	//
	// The c++ standard constraints in [rand.dist.uni.int] are listed as:
	// requires: lo <= hi.
	//
	// In the uniform_int_distrubtion, {lo, hi} are closed, closed. Thus:
	// [0, 0] is legal.
	// [0, 0) is not legal, but [0, 1) is, which translates to [0, 0].
	// (0, 1) is not legal, but (0, 2) is, which translates to [1, 1].
	// (0, 0] is not legal, but (0, 1] is, which translates to [1, 1].
	//
	// The c++ standard constraints in [rand.dist.uni.real] are listed as:
	// requires: lo <= hi.
	// requires: (hi - lo) <= numeric_limits<T>::max()
	//
	// In the uniform_real_distribution, {lo, hi} are closed, open, Thus:
	// [0, 0] is legal, which is [0, 0+epsilon).
	// [0, 0) is legal.
	// (0, 0) is not legal, but (0-epsilon, 0+epsilon) is.
	// (0, 0] is not legal, but (0, 0+epsilon] is.
	//
	template <typename FloatType>
	absl::enable_if_t<std::is_floating_point<FloatType>::value, bool>
	is_uniform_range_valid(FloatType a, FloatType b) {
	return a <= b && std::isfinite(b - a);
	}

	template <typename IntType>
	absl::enable_if_t<std::is_integral<IntType>::value, bool>
	is_uniform_range_valid(IntType a, IntType b) {
	return a <= b;
	}

	// UniformDistribution selects either absl::uniform_int_distribution
	// or absl::uniform_real_distribution depending on the NumType parameter.
	template <typename NumType>
	using UniformDistribution =
	typename std::conditional<std::is_integral<NumType>::value,
	absl::uniform_int_distribution<NumType>,
	absl::uniform_real_distribution<NumType>>::type;

	// UniformDistributionWrapper is used as the underlying distribution type
	// by the absl::Uniform template function. It selects the proper Abseil
	// uniform distribution and provides constructor overloads that match the
	// expected parameter order as well as adjusting distribtuion bounds based
	// on the tag.
	template <typename NumType>
	struct UniformDistributionWrapper : public UniformDistribution<NumType> {
	template <typename TagType>
	explicit UniformDistributionWrapper(TagType, NumType lo, NumType hi)
	: UniformDistribution<NumType>(
	uniform_lower_bound<NumType>(TagType{}, lo, hi),
	uniform_upper_bound<NumType>(TagType{}, lo, hi)) {}

	explicit UniformDistributionWrapper(NumType lo, NumType hi)
	: UniformDistribution<NumType>(
	uniform_lower_bound<NumType>(IntervalClosedOpenTag(), lo, hi),
	uniform_upper_bound<NumType>(IntervalClosedOpenTag(), lo, hi)) {}

	explicit UniformDistributionWrapper()
	: UniformDistribution<NumType>(std::numeric_limits<NumType>::lowest(),
	(std::numeric_limits<NumType>::max)()) {}
	};

	} // namespace random_internal
	ABSL_NAMESPACE_END
	} // namespace absl

	#endif // ABSL_RANDOM_INTERNAL_UNIFORM_HELPER_H_