| /* Copyright 2015 The TensorFlow Authors. All Rights Reserved. |
| |
| 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 |
| |
| http://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 TENSORFLOW_CORE_LIB_RANDOM_RANDOM_DISTRIBUTIONS_H_ |
| #define TENSORFLOW_CORE_LIB_RANDOM_RANDOM_DISTRIBUTIONS_H_ |
| |
| #define _USE_MATH_DEFINES |
| #include <math.h> |
| #include <cmath> |
| #undef _USE_MATH_DEFINES |
| |
| #include <string.h> |
| #include <algorithm> |
| #include <type_traits> |
| |
| #include <tensorflow/core/lib/bfloat16/bfloat16.h> |
| #include <unsupported/Eigen/CXX11/Tensor> |
| |
| #include "philox_random.h" |
| |
| namespace tensorflow { |
| namespace random { |
| |
| // Helper function to convert a 16-bit integer to a half between [0..1). |
| PHILOX_DEVICE_INLINE Eigen::half Uint16ToHalf(uint16 x); |
| // Helper function to convert a 16-bit integer to a bfloat16 between [0..1). |
| PHILOX_DEVICE_INLINE bfloat16 Uint16ToGfloat16(uint16 x); |
| // Helper function to convert a 32-bit integer to a float between [0..1). |
| PHILOX_DEVICE_INLINE float Uint32ToFloat(uint32 x); |
| // Helper function to convert two 32-bit integers to a double between [0..1). |
| PHILOX_DEVICE_INLINE double Uint64ToDouble(uint32 x0, uint32 x1); |
| |
| // Computes a + b. Requires that the result is representable in the destination |
| // type and that b is not maximal (i.e. b + 1 is not 0). Notably, the addend b |
| // need *not* be representable in that type. (The condition on b excludes the |
| // extremal case INT_MIN + UINT_MAX = INT_MAX, which this function cannot |
| // compute.) |
| template <typename Int> |
| PHILOX_DEVICE_INLINE Int SignedAdd(Int a, typename std::make_unsigned<Int>::type b) { |
| // Implementation note: both b_div_2 and b - b_div_2 are positive and |
| // representatble as Int. |
| auto b_div_2 = b >> 1; |
| return a + static_cast<Int>(b_div_2) + static_cast<Int>(b - b_div_2); |
| } |
| |
| // A class that generates uniform distribution random numbers from the |
| // underlying random integer generator. |
| // Arguments: |
| // Generator: a generator type that returns a number of uint32 upon each |
| // invocation. It needs to define kResultElementCount for the |
| // sample count for each invocation, and ResultType for the |
| // actual returned sample type. |
| // RealType: the data type of the real numbers that will be returned by the |
| // distribution. This could be either float or double for now. |
| // This class is meant to be implemented through specialization. The default |
| // is not defined by design. |
| template <class Generator, typename RealType> |
| class UniformDistribution; |
| |
| template <class Generator> |
| class UniformDistribution<Generator, Eigen::half> { |
| public: |
| // The number of elements that will be returned. |
| static const int kResultElementCount = Generator::kResultElementCount; |
| // Cost of generation of a single element (in cycles). |
| static const int kElementCost = 3; |
| // Indicate that this distribution may take variable number of samples |
| // during the runtime. |
| static const bool kVariableSamplesPerOutput = false; |
| typedef Array<Eigen::half, kResultElementCount> ResultType; |
| typedef Eigen::half ResultElementType; |
| |
| PHILOX_DEVICE_INLINE |
| ResultType operator()(Generator* gen) { |
| typename Generator::ResultType sample = (*gen)(); |
| ResultType result; |
| for (int i = 0; i < kResultElementCount; ++i) { |
| result[i] = Uint16ToHalf(sample[i]); // Truncate the upper 16 bits. |
| } |
| return result; |
| } |
| }; |
| |
| template <class Generator> |
| class UniformDistribution<Generator, bfloat16> { |
| public: |
| // The number of elements that will be returned. |
| static const int kResultElementCount = Generator::kResultElementCount; |
| // Cost of generation of a single element (in cycles). |
| static const int kElementCost = 3; |
| // Indicate that this distribution may take variable number of samples |
| // during the runtime. |
| static const bool kVariableSamplesPerOutput = false; |
| typedef Array<bfloat16, kResultElementCount> ResultType; |
| typedef bfloat16 ResultElementType; |
| |
| PHILOX_DEVICE_INLINE |
| ResultType operator()(Generator* gen) { |
| typename Generator::ResultType sample = (*gen)(); |
| ResultType result; |
| for (int i = 0; i < kResultElementCount; ++i) { |
| result[i] = Uint16ToGfloat16(sample[i]); |
| } |
| return result; |
| } |
| }; |
| |
| template <class Generator> |
| class UniformDistribution<Generator, float> { |
| public: |
| // The number of elements that will be returned. |
| static const int kResultElementCount = Generator::kResultElementCount; |
| // Cost of generation of a single element (in cycles). |
| static const int kElementCost = 3; |
| // Indicate that this distribution may take variable number of samples |
| // during the runtime. |
| static const bool kVariableSamplesPerOutput = false; |
| typedef Array<float, kResultElementCount> ResultType; |
| typedef float ResultElementType; |
| |
| PHILOX_DEVICE_INLINE |
| ResultType operator()(Generator* gen) { |
| typename Generator::ResultType sample = (*gen)(); |
| ResultType result; |
| for (int i = 0; i < kResultElementCount; ++i) { |
| result[i] = Uint32ToFloat(sample[i]); |
| } |
| return result; |
| } |
| }; |
| |
| template <class Generator> |
| class UniformDistribution<Generator, double> { |
| public: |
| // The number of elements that will be returned. |
| static const int kResultElementCount = Generator::kResultElementCount / 2; |
| // Cost of generation of a single element (in cycles). |
| static const int kElementCost = 3; |
| // Indicate that this distribution may take variable number of samples |
| // during the runtime. |
| static const bool kVariableSamplesPerOutput = false; |
| typedef Array<double, kResultElementCount> ResultType; |
| typedef double ResultElementType; |
| |
| PHILOX_DEVICE_INLINE |
| ResultType operator()(Generator* gen) { |
| typename Generator::ResultType sample = (*gen)(); |
| ResultType result; |
| for (int i = 0; i < kResultElementCount; ++i) { |
| result[i] = Uint64ToDouble(sample[2 * i], sample[2 * i + 1]); |
| } |
| return result; |
| } |
| }; |
| |
| template <class Generator> |
| class UniformDistribution<Generator, int32> { |
| public: |
| // The number of elements that will be returned. |
| static const int kResultElementCount = Generator::kResultElementCount; |
| // Cost of generation of a single element (in cycles). |
| static const int kElementCost = 3; |
| // Indicate that this distribution may take variable number of samples |
| // during the runtime. |
| static const bool kVariableSamplesPerOutput = false; |
| typedef Array<int32, kResultElementCount> ResultType; |
| typedef int32 ResultElementType; |
| |
| // Must have lo < hi |
| UniformDistribution(int32 lo, int32 hi) |
| : lo_(lo), range_(static_cast<uint32>(hi) - static_cast<uint32>(lo)) {} |
| |
| PHILOX_DEVICE_INLINE |
| ResultType operator()(Generator* gen) { |
| typename Generator::ResultType sample = (*gen)(); |
| ResultType result; |
| for (int i = 0; i < kResultElementCount; ++i) { |
| result[i] = SignedAdd(lo_, sample[i] % range_); |
| } |
| return result; |
| } |
| |
| private: |
| // Note that lo_ is intentionally signed while range_ is intentionally |
| // unsigned. This is because hi - lo can overflow signed integers if |
| // lo < 0 < hi, but always fits in unsigned. |
| int32 lo_; |
| uint32 range_; |
| }; |
| |
| template <class Generator> |
| class UniformDistribution<Generator, int64> { |
| public: |
| // The number of elements that will be returned. |
| static const int kResultElementCount = Generator::kResultElementCount / 2; |
| // Cost of generation of a single element (in cycles). |
| static const int kElementCost = 3; |
| // Indicate that this distribution may take variable number of samples |
| // during the runtime. |
| static const bool kVariableSamplesPerOutput = false; |
| typedef Array<int64, kResultElementCount> ResultType; |
| typedef int64 ResultElementType; |
| |
| // Must have lo < hi |
| UniformDistribution(int64 lo, int64 hi) |
| : lo_(lo), range_(static_cast<uint64>(hi) - static_cast<uint64>(lo)) {} |
| |
| PHILOX_DEVICE_INLINE |
| ResultType operator()(Generator* gen) { |
| typename Generator::ResultType sample = (*gen)(); |
| ResultType result; |
| for (int i = 0; i < kResultElementCount; ++i) { |
| auto bits = sample[2 * i] | static_cast<uint64>(sample[2 * i + 1]) << 32; |
| result[i] = SignedAdd(lo_, bits % range_); |
| } |
| return result; |
| } |
| |
| private: |
| // Note that lo_ is intentionally signed while range_ is intentionally |
| // unsigned. This is because hi - lo can overflow signed integers if |
| // lo < 0 < hi, but always fits in unsigned. |
| int64 lo_; |
| uint64 range_; |
| }; |
| |
| // A class that adapts the underlying native multiple samples to return a single |
| // sample at a time. |
| template <class Generator> |
| class SingleSampleAdapter { |
| public: |
| // The number of elements that will be returned. |
| static const int kResultElementCount = 1; |
| // The number of elements that will be returned by the underlying generator. |
| static const int kNativeElementCount = Generator::kResultElementCount; |
| typedef typename Generator::ResultElementType ResultType; |
| typedef typename Generator::ResultElementType ResultElementType; |
| |
| PHILOX_DEVICE_INLINE |
| explicit SingleSampleAdapter(Generator* gen) |
| : generator_(gen), used_result_index_(Generator::kResultElementCount) {} |
| |
| PHILOX_DEVICE_INLINE |
| ResultType operator()() { |
| if (used_result_index_ == Generator::kResultElementCount) { |
| unused_results_ = (*generator_)(); |
| used_result_index_ = 0; |
| } |
| |
| return unused_results_[used_result_index_++]; |
| } |
| |
| PHILOX_DEVICE_INLINE |
| void Skip(uint64 num_skips) { |
| if (!num_skips) { |
| return; |
| } |
| int num_unused_results = kNativeElementCount - used_result_index_; |
| if (num_skips <= num_unused_results) { |
| used_result_index_ += num_skips; |
| return; |
| } |
| num_skips -= num_unused_results; |
| used_result_index_ = kNativeElementCount; |
| SkipFromGenerator(num_skips / kNativeElementCount); |
| num_skips = num_skips % kNativeElementCount; |
| if (num_skips) { |
| unused_results_ = (*generator_)(); |
| used_result_index_ = num_skips; |
| } |
| } |
| |
| private: |
| // This implementation iteratively skips over `num_skips` samples |
| // from `generator_`. There is an O(1) implementation for PhiloxRandom |
| // in random_distributions.cc. |
| PHILOX_DEVICE_INLINE |
| void SkipFromGenerator(uint64 num_skips) { |
| while (num_skips--) { |
| (*generator_)(); |
| } |
| } |
| |
| Generator* generator_; |
| typename Generator::ResultType unused_results_; |
| int used_result_index_; |
| }; |
| |
| // A class that generates unit normal distribution random numbers from the |
| // underlying random integer generator. |
| // Arguments: |
| // Generator: a generator type that returns a number of uint32 upon each |
| // each invocation. It needs to define kResultElementCount for the |
| // sample count for each invocation, and ResultType for actual |
| // returned sample type. |
| // RealType: the data type of the real numbers that will be returned by the |
| // distribution. This could be either float or double for now. |
| // This class is meant to be implemented through specialization. The default |
| // is not defined by design. |
| template <class Generator, typename RealType> |
| class NormalDistribution; |
| |
| PHILOX_DEVICE_INLINE |
| void BoxMullerFloat(uint32 x0, uint32 x1, float* f0, float* f1); |
| |
| PHILOX_DEVICE_INLINE |
| void BoxMullerDouble(uint32 x0, uint32 x1, uint32 x2, uint32 x3, double* d0, double* d1); |
| |
| // Exactly like the float version, except that we convert to half afterwards; |
| // since we don't have half-precision sin/cos even on GPUs, there's nothing to |
| // gain from working in half internally. |
| template <class Generator> |
| class NormalDistribution<Generator, Eigen::half> { |
| public: |
| // The number of elements that will be returned. |
| static const int kResultElementCount = Generator::kResultElementCount; |
| // Cost of generation of a single element (in cycles). |
| static const int kElementCost = 70; |
| // Indicate that this distribution may take variable number of samples |
| // during the runtime. |
| static const bool kVariableSamplesPerOutput = false; |
| typedef Array<Eigen::half, kResultElementCount> ResultType; |
| typedef Eigen::half ResultElementType; |
| |
| PHILOX_DEVICE_INLINE |
| ResultType operator()(Generator* gen) { |
| typename Generator::ResultType sample = (*gen)(); |
| ResultType result; |
| for (int i = 0; i < kResultElementCount; i += 2) { |
| float f[2]; |
| BoxMullerFloat(sample[i], sample[i + 1], &f[0], &f[1]); |
| result[i] = Eigen::half(f[0]); |
| result[i + 1] = Eigen::half(f[1]); |
| } |
| return result; |
| } |
| }; |
| |
| template <class Generator> |
| class NormalDistribution<Generator, bfloat16> { |
| public: |
| // The number of elements that will be returned. |
| static const int kResultElementCount = Generator::kResultElementCount; |
| // Cost of generation of a single element (in cycles). |
| static const int kElementCost = 70; |
| // Indicate that this distribution may take variable number of samples |
| // during the runtime. |
| static const bool kVariableSamplesPerOutput = false; |
| typedef Array<bfloat16, kResultElementCount> ResultType; |
| typedef bfloat16 ResultElementType; |
| |
| PHILOX_DEVICE_INLINE |
| ResultType operator()(Generator* gen) { |
| typename Generator::ResultType sample = (*gen)(); |
| ResultType result; |
| static_assert(kResultElementCount % 2 == 0, "kResultElementCount should be an even number"); |
| for (int i = 0; i < kResultElementCount; i += 2) { |
| float f[2]; |
| // Box-Muller transform requires processing 2 elements at a time. |
| BoxMullerFloat(sample[i], sample[i + 1], &f[0], &f[1]); |
| result[i] = bfloat16(f[0]); |
| result[i + 1] = bfloat16(f[1]); |
| } |
| return result; |
| } |
| }; |
| |
| template <class Generator> |
| class NormalDistribution<Generator, float> { |
| public: |
| // The number of elements that will be returned. |
| static const int kResultElementCount = Generator::kResultElementCount; |
| // Cost of generation of a single element (in cycles). |
| static const int kElementCost = 70; |
| // Indicate that this distribution may take variable number of samples |
| // during the runtime. |
| static const bool kVariableSamplesPerOutput = false; |
| typedef Array<float, kResultElementCount> ResultType; |
| typedef float ResultElementType; |
| |
| PHILOX_DEVICE_INLINE |
| ResultType operator()(Generator* gen) { |
| typename Generator::ResultType sample = (*gen)(); |
| ResultType result; |
| for (int i = 0; i < kResultElementCount; i += 2) { |
| BoxMullerFloat(sample[i], sample[i + 1], &result[i], &result[i + 1]); |
| } |
| return result; |
| } |
| }; |
| |
| template <class Generator> |
| class NormalDistribution<Generator, double> { |
| public: |
| // The number of elements that will be returned. |
| static const int kResultElementCount = Generator::kResultElementCount / 2; |
| // Cost of generation of a single element (in cycles). |
| static const int kElementCost = 70; |
| // Indicate that this distribution may take variable number of samples |
| // during the runtime. |
| static const bool kVariableSamplesPerOutput = false; |
| typedef Array<double, kResultElementCount> ResultType; |
| typedef double ResultElementType; |
| |
| PHILOX_DEVICE_INLINE |
| ResultType operator()(Generator* gen) { |
| typename Generator::ResultType sample = (*gen)(); |
| ResultType result; |
| for (int i = 0; i < kResultElementCount; i += 2) { |
| const int i2 = 2 * i; |
| BoxMullerDouble(sample[i2], sample[i2 + 1], sample[i2 + 2], sample[i2 + 3], &result[i], |
| &result[i + 1]); |
| } |
| return result; |
| } |
| }; |
| |
| // A class that returns standard normal distribution between |
| // [-kTruncateValue, kTruncateValue]. |
| // Arguments: |
| // Generator: a generator type that returns a number of uint32 upon each |
| // each invocation. It needs to define kResultElementCount for the |
| // sample count for each invocation, and ResultType for actual |
| // returned sample type. |
| // RealType: the data type of the real numbers that will be returned by the |
| // distribution. This could be either float or double for now. |
| // This class is meant to be implemented through specialization. The default |
| // is not defined by design. |
| template <class SingleSampleGenerator, typename RealType> |
| class TruncatedNormalDistribution; |
| |
| // Exactly like the float version, except that we convert to half afterwards; |
| // since we don't have half-precision sin/cos even on GPUs, there's nothing to |
| // gain from working in half internally. |
| template <class SingleSampleGenerator> |
| class TruncatedNormalDistribution<SingleSampleGenerator, Eigen::half> { |
| public: |
| // The number of elements that will be returned. |
| static const int kResultElementCount = SingleSampleGenerator::kNativeElementCount; |
| // Cost of generation of a single element (in cycles). |
| static const int kElementCost = 90; |
| // Indicate that this distribution may take variable number of samples |
| // during the runtime. |
| static const bool kVariableSamplesPerOutput = true; |
| // The threshold where the normal distribution is truncated. |
| const float kTruncateValue = 2.0f; |
| |
| typedef Array<Eigen::half, kResultElementCount> ResultType; |
| typedef Eigen::half ResultElementType; |
| |
| PHILOX_DEVICE_INLINE |
| ResultType operator()(SingleSampleGenerator* gen) { |
| ResultType results; |
| int index = 0; |
| while (true) { |
| // Repeatedly take samples from the normal distribution, until we have |
| // the desired number of elements that fall within the pre-defined cutoff |
| // threshold. |
| const uint32 x0 = (*gen)(); |
| const uint32 x1 = (*gen)(); |
| float f[2]; |
| BoxMullerFloat(x0, x1, &f[0], &f[1]); |
| |
| for (int i = 0; i < 2; ++i) { |
| if (Eigen::numext::abs(f[i]) < kTruncateValue) { |
| results[index++] = Eigen::half(f[i]); |
| if (index >= kResultElementCount) { |
| return results; |
| } |
| } |
| } |
| } |
| } |
| }; |
| |
| template <class SingleSampleGenerator> |
| class TruncatedNormalDistribution<SingleSampleGenerator, bfloat16> { |
| public: |
| // The number of elements that will be returned. |
| static const int kResultElementCount = SingleSampleGenerator::kNativeElementCount; |
| // Cost of generation of a single element (in cycles). |
| static const int kElementCost = 90; |
| // Indicate that this distribution may take variable number of samples |
| // during the runtime. |
| static const bool kVariableSamplesPerOutput = true; |
| // The threshold where the normal distribution is truncated. |
| const float kTruncateValue = 2.0f; |
| |
| typedef Array<bfloat16, kResultElementCount> ResultType; |
| typedef bfloat16 ResultElementType; |
| |
| PHILOX_DEVICE_INLINE |
| ResultType operator()(SingleSampleGenerator* gen) { |
| ResultType results; |
| int index = 0; |
| while (true) { |
| // Repeatedly take samples from the normal distribution, until we have |
| // the desired number of elements that fall within the pre-defined cutoff |
| // threshold. |
| const uint32 x0 = (*gen)(); |
| const uint32 x1 = (*gen)(); |
| float f[2]; |
| BoxMullerFloat(x0, x1, &f[0], &f[1]); |
| |
| for (int i = 0; i < 2; ++i) { |
| if (Eigen::numext::abs(f[i]) < kTruncateValue) { |
| results[index++] = bfloat16(f[i]); |
| if (index >= kResultElementCount) { |
| return results; |
| } |
| } |
| } |
| } |
| } |
| }; |
| |
| // Partial specialization for float. |
| template <class SingleSampleGenerator> |
| class TruncatedNormalDistribution<SingleSampleGenerator, float> { |
| public: |
| // The number of elements that will be returned. |
| static const int kResultElementCount = SingleSampleGenerator::kNativeElementCount; |
| // Cost of generation of a single element (in cycles). |
| static const int kElementCost = 90; |
| // Indicate that this distribution may take variable number of samples |
| // during the runtime. |
| static const bool kVariableSamplesPerOutput = true; |
| // The threshold where the normal distribution is truncated. |
| const float kTruncateValue = 2.0f; |
| |
| typedef Array<float, kResultElementCount> ResultType; |
| typedef float ResultElementType; |
| |
| PHILOX_DEVICE_INLINE |
| ResultType operator()(SingleSampleGenerator* gen) { |
| ResultType results; |
| int index = 0; |
| while (true) { |
| // Repeatedly take samples from the normal distribution, until we have |
| // the desired number of elements that fall within the pre-defined cutoff |
| // threshold. |
| const uint32 x0 = (*gen)(); |
| const uint32 x1 = (*gen)(); |
| float f[2]; |
| BoxMullerFloat(x0, x1, &f[0], &f[1]); |
| |
| for (int i = 0; i < 2; ++i) { |
| if (Eigen::numext::abs(f[i]) < kTruncateValue) { |
| results[index++] = f[i]; |
| if (index >= kResultElementCount) { |
| return results; |
| } |
| } |
| } |
| } |
| } |
| }; |
| |
| // Partial specialization for double. |
| template <class SingleSampleGenerator> |
| class TruncatedNormalDistribution<SingleSampleGenerator, double> { |
| public: |
| // The number of elements that will be returned. |
| static const int kResultElementCount = (SingleSampleGenerator::kNativeElementCount > 1) |
| ? SingleSampleGenerator::kNativeElementCount / 2 |
| : 1; |
| // Cost of generation of a single element (in cycles). |
| static const int kElementCost = 90; |
| // Indicate that this distribution may take variable number of samples |
| // during the runtime. |
| static const bool kVariableSamplesPerOutput = true; |
| typedef Array<double, kResultElementCount> ResultType; |
| typedef double ResultElementType; |
| const double kTruncateValue = 2.0; |
| |
| PHILOX_DEVICE_INLINE |
| ResultType operator()(SingleSampleGenerator* gen) { |
| ResultType results; |
| int index = 0; |
| while (1) { |
| const uint32 x0 = (*gen)(); |
| const uint32 x1 = (*gen)(); |
| const uint32 x2 = (*gen)(); |
| const uint32 x3 = (*gen)(); |
| double d[2]; |
| BoxMullerDouble(x0, x1, x2, x3, &d[0], &d[1]); |
| |
| for (int i = 0; i < 2; ++i) { |
| if (Eigen::numext::abs(d[i]) < kTruncateValue) { |
| results[index++] = d[i]; |
| if (index >= kResultElementCount) { |
| return results; |
| } |
| } |
| } |
| } |
| } |
| }; |
| |
| // Helper function to convert two 32-bit uniform integers to two floats |
| // under the unit normal distribution. |
| PHILOX_DEVICE_INLINE |
| void BoxMullerFloat(uint32 x0, uint32 x1, float* f0, float* f1) { |
| // This function implements the Box-Muller transform: |
| // http://en.wikipedia.org/wiki/Box%E2%80%93Muller_transform#Basic_form |
| // Do not send a really small number to log(). |
| // We cannot mark "epsilon" as "static const" because NVCC would complain |
| const float epsilon = 1.0e-7f; |
| float u1 = Uint32ToFloat(x0); |
| if (u1 < epsilon) { |
| u1 = epsilon; |
| } |
| const float v1 = 2.0f * M_PI * Uint32ToFloat(x1); |
| const float u2 = Eigen::numext::sqrt(-2.0f * Eigen::numext::log(u1)); |
| #if defined(TENSORFLOW_USE_SYCL) || !defined(__linux__) |
| *f0 = Eigen::numext::sin(v1); |
| *f1 = Eigen::numext::cos(v1); |
| #else |
| sincosf(v1, f0, f1); |
| #endif |
| *f0 *= u2; |
| *f1 *= u2; |
| } |
| |
| // Helper function to convert four 32-bit uniform integers to two doubles |
| // under the unit normal distribution. |
| PHILOX_DEVICE_INLINE |
| void BoxMullerDouble(uint32 x0, uint32 x1, uint32 x2, uint32 x3, double* d0, double* d1) { |
| // This function implements the Box-Muller transform: |
| // http://en.wikipedia.org/wiki/Box%E2%80%93Muller_transform#Basic_form |
| // Do not send a really small number to log(). |
| // We cannot mark "epsilon" as "static const" because NVCC would complain |
| const double epsilon = 1.0e-7; |
| double u1 = Uint64ToDouble(x0, x1); |
| if (u1 < epsilon) { |
| u1 = epsilon; |
| } |
| const double v1 = 2 * M_PI * Uint64ToDouble(x2, x3); |
| const double u2 = Eigen::numext::sqrt(-2.0 * Eigen::numext::log(u1)); |
| #if defined(TENSORFLOW_USE_SYCL) || !defined(__linux__) |
| *d0 = Eigen::numext::sin(v1); |
| *d1 = Eigen::numext::cos(v1); |
| #else |
| sincos(v1, d0, d1); |
| #endif |
| *d0 *= u2; |
| *d1 *= u2; |
| } |
| |
| // Helper function to convert an 16-bit integer to a half between [0..1). |
| PHILOX_DEVICE_INLINE Eigen::half Uint16ToHalf(uint16 x) { |
| // IEEE754 halfs are formatted as follows (MSB first): |
| // sign(1) exponent(5) mantissa(10) |
| // Conceptually construct the following: |
| // sign == 0 |
| // exponent == 15 -- an excess 15 representation of a zero exponent |
| // mantissa == 10 random bits |
| const uint16 man = x & 0x3ffu; // 10 bit mantissa |
| const uint16 exp = static_cast<uint16>(15); |
| const uint16 val = (exp << 10) | man; |
| |
| Eigen::half result; |
| result.x = val; |
| return result - Eigen::half(1.0); |
| } |
| |
| // Helper function to convert an 16-bit integer to a bfloat16 between [0..1). |
| // This can create a uniform distribution of values between [0..1). |
| PHILOX_DEVICE_INLINE bfloat16 Uint16ToGfloat16(uint16 x) { |
| // bfloat are formatted as follows (MSB first): |
| // sign(1) exponent(8) mantissa(7) |
| // Conceptually construct the following: |
| // sign == 0 |
| // exponent == 127 -- an excess 127 representation of a zero exponent |
| // mantissa == 7 random bits |
| const uint16 man = x & 0x7fu; // 7 bit mantissa |
| const uint16 exp = static_cast<uint16>(127); |
| const uint16 val = (exp << 7) | man; |
| |
| bfloat16 result; |
| memcpy(&result, &val, sizeof(val)); |
| // The mantissa has an implicit leading 1, so the above code creates a value |
| // in [1, 2). The minus will not cause a rounding that makes the result 1. |
| // Instead it will just be close to 1. |
| return result - bfloat16(1.0); |
| } |
| |
| // Helper function to convert an 32-bit integer to a float between [0..1). |
| PHILOX_DEVICE_INLINE float Uint32ToFloat(uint32 x) { |
| // IEEE754 floats are formatted as follows (MSB first): |
| // sign(1) exponent(8) mantissa(23) |
| // Conceptually construct the following: |
| // sign == 0 |
| // exponent == 127 -- an excess 127 representation of a zero exponent |
| // mantissa == 23 random bits |
| const uint32 man = x & 0x7fffffu; // 23 bit mantissa |
| const uint32 exp = static_cast<uint32>(127); |
| const uint32 val = (exp << 23) | man; |
| |
| // Assumes that endian-ness is same for float and uint32. |
| float result; |
| memcpy(&result, &val, sizeof(val)); |
| return result - 1.0f; |
| } |
| |
| // Helper function to convert two 32-bit integers to a double between [0..1). |
| PHILOX_DEVICE_INLINE double Uint64ToDouble(uint32 x0, uint32 x1) { |
| // IEEE754 doubles are formatted as follows (MSB first): |
| // sign(1) exponent(11) mantissa(52) |
| // Conceptually construct the following: |
| // sign == 0 |
| // exponent == 1023 -- an excess 1023 representation of a zero exponent |
| // mantissa == 52 random bits |
| const uint32 mhi = x0 & 0xfffffu; // upper 20 bits of mantissa |
| const uint32 mlo = x1; // lower 32 bits of mantissa |
| const uint64 man = (static_cast<uint64>(mhi) << 32) | mlo; // mantissa |
| const uint64 exp = static_cast<uint64>(1023); |
| const uint64 val = (exp << 52) | man; |
| // Assumes that endian-ness is same for double and uint64. |
| double result; |
| memcpy(&result, &val, sizeof(val)); |
| return result - 1.0; |
| } |
| |
| } // namespace random |
| } // namespace tensorflow |
| |
| #endif // TENSORFLOW_CORE_LIB_RANDOM_RANDOM_DISTRIBUTIONS_H_ |
