absl/random/poisson_distribution_test.cc - third_party/github/abseil/abseil-cpp - Git at Google

 // Copyright 2017 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.

 #include "absl/random/poisson_distribution.h"

 #include <algorithm>
 #include <cstddef>
 #include <cstdint>
 #include <iterator>
 #include <random>
 #include <sstream>
 #include <string>
 #include <vector>

 #include "gmock/gmock.h"
 #include "gtest/gtest.h"
 #include "absl/base/macros.h"
 #include "absl/container/flat_hash_map.h"
 #include "absl/log/log.h"
 #include "absl/random/internal/chi_square.h"
 #include "absl/random/internal/distribution_test_util.h"
 #include "absl/random/internal/pcg_engine.h"
 #include "absl/random/internal/sequence_urbg.h"
 #include "absl/random/random.h"
 #include "absl/strings/str_cat.h"
 #include "absl/strings/str_format.h"
 #include "absl/strings/str_replace.h"
 #include "absl/strings/strip.h"

 // Notes about generating poisson variates:
 //
 // It is unlikely that any implementation of std::poisson_distribution
 // will be stable over time and across library implementations. For instance
 // the three different poisson variate generators listed below all differ:
 //
 // https://github.com/ampl/gsl/tree/master/randist/poisson.c
 // * GSL uses a gamma + binomial + knuth method to compute poisson variates.
 //
 // https://github.com/gcc-mirror/gcc/blob/master/libstdc%2B%2B-v3/include/bits/random.tcc
 // * GCC uses the Devroye rejection algorithm, based on
 // Devroye, L. Non-Uniform Random Variates Generation. Springer-Verlag,
 // New York, 1986, Ch. X, Sects. 3.3 & 3.4 (+ Errata!), ~p.511
 //   http://www.nrbook.com/devroye/
 //
 // https://github.com/llvm-mirror/libcxx/blob/master/include/random
 // * CLANG uses a different rejection method, which appears to include a
 // normal-distribution approximation and an exponential distribution to
 // compute the threshold, including a similar factorial approximation to this
 // one, but it is unclear where the algorithm comes from, exactly.
 //

 namespace {

 using absl::random_internal::kChiSquared;

 // The PoissonDistributionInterfaceTest provides a basic test that
 // absl::poisson_distribution conforms to the interface and serialization
 // requirements imposed by [rand.req.dist] for the common integer types.

 template <typename IntType>
 class PoissonDistributionInterfaceTest : public ::testing::Test {};

 using IntTypes = ::testing::Types<int, int8_t, int16_t, int32_t, int64_t,
                                   uint8_t, uint16_t, uint32_t, uint64_t>;
 TYPED_TEST_SUITE(PoissonDistributionInterfaceTest, IntTypes);

 TYPED_TEST(PoissonDistributionInterfaceTest, SerializeTest) {
   using param_type = typename absl::poisson_distribution<TypeParam>::param_type;
   const double kMax =
       std::min(1e10 /* assertion limit */,
                static_cast<double>(std::numeric_limits<TypeParam>::max()));

   const double kParams[] = {
       // Cases around 1.
       1,                         //
       std::nextafter(1.0, 0.0),  // 1 - epsilon
       std::nextafter(1.0, 2.0),  // 1 + epsilon
       // Arbitrary values.
       1e-8, 1e-4,
       0.0000005,  // ~7.2e-7
       0.2,        // ~0.2x
       0.5,        // 0.72
       2,          // ~2.8
       20,         // 3x ~9.6
       100, 1e4, 1e8, 1.5e9, 1e20,
       // Boundary cases.
       std::numeric_limits<double>::max(),
       std::numeric_limits<double>::epsilon(),
       std::nextafter(std::numeric_limits<double>::min(),
                      1.0),                        // min + epsilon
       std::numeric_limits<double>::min(),         // smallest normal
       std::numeric_limits<double>::denorm_min(),  // smallest denorm
       std::numeric_limits<double>::min() / 2,     // denorm
       std::nextafter(std::numeric_limits<double>::min(),
                      0.0),  // denorm_max
   };


   constexpr int kCount = 1000;
   absl::InsecureBitGen gen;
   for (const double m : kParams) {
     const double mean = std::min(kMax, m);
     const param_type param(mean);

     // Validate parameters.
     absl::poisson_distribution<TypeParam> before(mean);
     EXPECT_EQ(before.mean(), param.mean());

     {
       absl::poisson_distribution<TypeParam> via_param(param);
       EXPECT_EQ(via_param, before);
       EXPECT_EQ(via_param.param(), before.param());
     }

     // Smoke test.
     auto sample_min = before.max();
     auto sample_max = before.min();
     for (int i = 0; i < kCount; i++) {
       auto sample = before(gen);
       EXPECT_GE(sample, before.min());
       EXPECT_LE(sample, before.max());
       if (sample > sample_max) sample_max = sample;
       if (sample < sample_min) sample_min = sample;
     }

     LOG(INFO) << "Range {" << param.mean() << "}: " << sample_min << ", "
               << sample_max;

     // Validate stream serialization.
     std::stringstream ss;
     ss << before;

     absl::poisson_distribution<TypeParam> after(3.8);

     EXPECT_NE(before.mean(), after.mean());
     EXPECT_NE(before.param(), after.param());
     EXPECT_NE(before, after);

     ss >> after;

     EXPECT_EQ(before.mean(), after.mean())  //
         << ss.str() << " "                  //
         << (ss.good() ? "good " : "")       //
         << (ss.bad() ? "bad " : "")         //
         << (ss.eof() ? "eof " : "")         //
         << (ss.fail() ? "fail " : "");
   }
 }

 // See http://www.itl.nist.gov/div898/handbook/eda/section3/eda366j.htm

 class PoissonModel {
  public:
   explicit PoissonModel(double mean) : mean_(mean) {}

   double mean() const { return mean_; }
   double variance() const { return mean_; }
   double stddev() const { return std::sqrt(variance()); }
   double skew() const { return 1.0 / mean_; }
   double kurtosis() const { return 3.0 + 1.0 / mean_; }

   // InitCDF() initializes the CDF for the distribution parameters.
   void InitCDF();

   // The InverseCDF, or the Percent-point function returns x, P(x) < v.
   struct CDF {
     size_t index;
     double pmf;
     double cdf;
   };
   CDF InverseCDF(double p) {
     CDF target{0, 0, p};
     auto it = std::upper_bound(
         std::begin(cdf_), std::end(cdf_), target,
         [](const CDF& a, const CDF& b) { return a.cdf < b.cdf; });
     return *it;
   }

   void LogCDF() {
     LOG(INFO) << "CDF (mean = " << mean_ << ")";
     for (const auto c : cdf_) {
       LOG(INFO) << c.index << ": pmf=" << c.pmf << " cdf=" << c.cdf;
     }
   }

  private:
   const double mean_;

   std::vector<CDF> cdf_;
 };

 // The goal is to compute an InverseCDF function, or percent point function for
 // the poisson distribution, and use that to partition our output into equal
 // range buckets.  However there is no closed form solution for the inverse cdf
 // for poisson distributions (the closest is the incomplete gamma function).
 // Instead, `InitCDF` iteratively computes the PMF and the CDF. This enables
 // searching for the bucket points.
 void PoissonModel::InitCDF() {
   if (!cdf_.empty()) {
     // State already initialized.
     return;
   }
   ABSL_ASSERT(mean_ < 201.0);

   const size_t max_i = 50 * stddev() + mean();
   const double e_neg_mean = std::exp(-mean());
   ABSL_ASSERT(e_neg_mean > 0);

   double d = 1;
   double last_result = e_neg_mean;
   double cumulative = e_neg_mean;
   if (e_neg_mean > 1e-10) {
     cdf_.push_back({0, e_neg_mean, cumulative});
   }
   for (size_t i = 1; i < max_i; i++) {
     d *= (mean() / i);
     double result = e_neg_mean * d;
     cumulative += result;
     if (result < 1e-10 && result < last_result && cumulative > 0.999999) {
       break;
     }
     if (result > 1e-7) {
       cdf_.push_back({i, result, cumulative});
     }
     last_result = result;
   }
   ABSL_ASSERT(!cdf_.empty());
 }

 // PoissonDistributionZTest implements a z-test for the poisson distribution.

 struct ZParam {
   double mean;
   double p_fail;   // Z-Test probability of failure.
   int trials;      // Z-Test trials.
   size_t samples;  // Z-Test samples.
 };

 class PoissonDistributionZTest : public testing::TestWithParam<ZParam>,
                                  public PoissonModel {
  public:
   PoissonDistributionZTest() : PoissonModel(GetParam().mean) {}

   // ZTestImpl provides a basic z-squared test of the mean vs. expected
   // mean for data generated by the poisson distribution.
   template <typename D>
   bool SingleZTest(const double p, const size_t samples);

   // We use a fixed bit generator for distribution accuracy tests.  This allows
   // these tests to be deterministic, while still testing the qualify of the
   // implementation.
   absl::random_internal::pcg64_2018_engine rng_{0x2B7E151628AED2A6};
 };

 template <typename D>
 bool PoissonDistributionZTest::SingleZTest(const double p,
                                            const size_t samples) {
   D dis(mean());

   absl::flat_hash_map<int32_t, int> buckets;
   std::vector<double> data;
   data.reserve(samples);
   for (int j = 0; j < samples; j++) {
     const auto x = dis(rng_);
     buckets[x]++;
     data.push_back(x);
   }

   // The null-hypothesis is that the distribution is a poisson distribution with
   // the provided mean (not estimated from the data).
   const auto m = absl::random_internal::ComputeDistributionMoments(data);
   const double max_err = absl::random_internal::MaxErrorTolerance(p);
   const double z = absl::random_internal::ZScore(mean(), m);
   const bool pass = absl::random_internal::Near("z", z, 0.0, max_err);

   if (!pass) {
     // clang-format off
     LOG(INFO)
         << "p=" << p << " max_err=" << max_err << "\n"
            " mean=" << m.mean << " vs. " << mean() << "\n"
            " stddev=" << std::sqrt(m.variance) << " vs. " << stddev() << "\n"
            " skewness=" << m.skewness << " vs. " << skew() << "\n"
            " kurtosis=" << m.kurtosis << " vs. " << kurtosis() << "\n"
            " z=" << z;
     // clang-format on
   }
   return pass;
 }

 TEST_P(PoissonDistributionZTest, AbslPoissonDistribution) {
   const auto& param = GetParam();
   const int expected_failures =
       std::max(1, static_cast<int>(std::ceil(param.trials * param.p_fail)));
   const double p = absl::random_internal::RequiredSuccessProbability(
       param.p_fail, param.trials);

   int failures = 0;
   for (int i = 0; i < param.trials; i++) {
     failures +=
         SingleZTest<absl::poisson_distribution<int32_t>>(p, param.samples) ? 0
                                                                            : 1;
   }
   EXPECT_LE(failures, expected_failures);
 }

 std::vector<ZParam> GetZParams() {
   // These values have been adjusted from the "exact" computed values to reduce
   // failure rates.
   //
   // It turns out that the actual values are not as close to the expected values
   // as would be ideal.
   return std::vector<ZParam>({
       // Knuth method.
       ZParam{0.5, 0.01, 100, 1000},
       ZParam{1.0, 0.01, 100, 1000},
       ZParam{10.0, 0.01, 100, 5000},
       // Split-knuth method.
       ZParam{20.0, 0.01, 100, 10000},
       ZParam{50.0, 0.01, 100, 10000},
       // Ratio of gaussians method.
       ZParam{51.0, 0.01, 100, 10000},
       ZParam{200.0, 0.05, 10, 100000},
       ZParam{100000.0, 0.05, 10, 1000000},
   });
 }

 std::string ZParamName(const ::testing::TestParamInfo<ZParam>& info) {
   const auto& p = info.param;
   std::string name = absl::StrCat("mean_", absl::SixDigits(p.mean));
   return absl::StrReplaceAll(name, {{"+", "_"}, {"-", "_"}, {".", "_"}});
 }

 INSTANTIATE_TEST_SUITE_P(All, PoissonDistributionZTest,
                          ::testing::ValuesIn(GetZParams()), ZParamName);

 // The PoissonDistributionChiSquaredTest class provides a basic test framework
 // for variates generated by a conforming poisson_distribution.
 class PoissonDistributionChiSquaredTest : public testing::TestWithParam<double>,
                                           public PoissonModel {
  public:
   PoissonDistributionChiSquaredTest() : PoissonModel(GetParam()) {}

   // The ChiSquaredTestImpl provides a chi-squared goodness of fit test for data
   // generated by the poisson distribution.
   template <typename D>
   double ChiSquaredTestImpl();

  private:
   void InitChiSquaredTest(const double buckets);

   std::vector<size_t> cutoffs_;
   std::vector<double> expected_;

   // We use a fixed bit generator for distribution accuracy tests.  This allows
   // these tests to be deterministic, while still testing the qualify of the
   // implementation.
   absl::random_internal::pcg64_2018_engine rng_{0x2B7E151628AED2A6};
 };

 void PoissonDistributionChiSquaredTest::InitChiSquaredTest(
     const double buckets) {
   if (!cutoffs_.empty() && !expected_.empty()) {
     return;
   }
   InitCDF();

   // The code below finds cuttoffs that yield approximately equally-sized
   // buckets to the extent that it is possible. However for poisson
   // distributions this is particularly challenging for small mean parameters.
   // Track the expected proportion of items in each bucket.
   double last_cdf = 0;
   const double inc = 1.0 / buckets;
   for (double p = inc; p <= 1.0; p += inc) {
     auto result = InverseCDF(p);
     if (!cutoffs_.empty() && cutoffs_.back() == result.index) {
       continue;
     }
     double d = result.cdf - last_cdf;
     cutoffs_.push_back(result.index);
     expected_.push_back(d);
     last_cdf = result.cdf;
   }
   cutoffs_.push_back(std::numeric_limits<size_t>::max());
   expected_.push_back(std::max(0.0, 1.0 - last_cdf));
 }

 template <typename D>
 double PoissonDistributionChiSquaredTest::ChiSquaredTestImpl() {
   const int kSamples = 2000;
   const int kBuckets = 50;

   // The poisson CDF fails for large mean values, since e^-mean exceeds the
   // machine precision. For these cases, using a normal approximation would be
   // appropriate.
   ABSL_ASSERT(mean() <= 200);
   InitChiSquaredTest(kBuckets);

   D dis(mean());

   std::vector<int32_t> counts(cutoffs_.size(), 0);
   for (int j = 0; j < kSamples; j++) {
     const size_t x = dis(rng_);
     auto it = std::lower_bound(std::begin(cutoffs_), std::end(cutoffs_), x);
     counts[std::distance(cutoffs_.begin(), it)]++;
   }

   // Normalize the counts.
   std::vector<int32_t> e(expected_.size(), 0);
   for (int i = 0; i < e.size(); i++) {
     e[i] = kSamples * expected_[i];
   }

   // The null-hypothesis is that the distribution is a poisson distribution with
   // the provided mean (not estimated from the data).
   const int dof = static_cast<int>(counts.size()) - 1;

   // The threshold for logging is 1-in-50.
   const double threshold = absl::random_internal::ChiSquareValue(dof, 0.98);

   const double chi_square = absl::random_internal::ChiSquare(
       std::begin(counts), std::end(counts), std::begin(e), std::end(e));

   const double p = absl::random_internal::ChiSquarePValue(chi_square, dof);

   // Log if the chi_squared value is above the threshold.
   if (chi_square > threshold) {
     LogCDF();

     LOG(INFO) << "VALUES  buckets=" << counts.size()
               << "  samples=" << kSamples;
     for (size_t i = 0; i < counts.size(); i++) {
       LOG(INFO) << cutoffs_[i] << ": " << counts[i] << " vs. E=" << e[i];
     }

     LOG(INFO) << kChiSquared << "(data, dof=" << dof << ") = " << chi_square
               << " (" << p << ")\n"
               << " vs.\n"
               << kChiSquared << " @ 0.98 = " << threshold;
   }
   return p;
 }

 TEST_P(PoissonDistributionChiSquaredTest, AbslPoissonDistribution) {
   const int kTrials = 20;

   // Large values are not yet supported -- this requires estimating the cdf
   // using the normal distribution instead of the poisson in this case.
   ASSERT_LE(mean(), 200.0);
   if (mean() > 200.0) {
     return;
   }

   int failures = 0;
   for (int i = 0; i < kTrials; i++) {
     double p_value = ChiSquaredTestImpl<absl::poisson_distribution<int32_t>>();
     if (p_value < 0.005) {
       failures++;
     }
   }
   // There is a 0.10% chance of producing at least one failure, so raise the
   // failure threshold high enough to allow for a flake rate < 10,000.
   EXPECT_LE(failures, 4);
 }

 INSTANTIATE_TEST_SUITE_P(All, PoissonDistributionChiSquaredTest,
                          ::testing::Values(0.5, 1.0, 2.0, 10.0, 50.0, 51.0,
                                            200.0));

 // NOTE: absl::poisson_distribution is not guaranteed to be stable.
 TEST(PoissonDistributionTest, StabilityTest) {
   using testing::ElementsAre;
   // absl::poisson_distribution stability relies on stability of
   // std::exp, std::log, std::sqrt, std::ceil, std::floor, and
   // absl::FastUniformBits, absl::StirlingLogFactorial, absl::RandU64ToDouble.
   absl::random_internal::sequence_urbg urbg({
       0x035b0dc7e0a18acfull, 0x06cebe0d2653682eull, 0x0061e9b23861596bull,
       0x0003eb76f6f7f755ull, 0xFFCEA50FDB2F953Bull, 0xC332DDEFBE6C5AA5ull,
       0x6558218568AB9702ull, 0x2AEF7DAD5B6E2F84ull, 0x1521B62829076170ull,
       0xECDD4775619F1510ull, 0x13CCA830EB61BD96ull, 0x0334FE1EAA0363CFull,
       0xB5735C904C70A239ull, 0xD59E9E0BCBAADE14ull, 0xEECC86BC60622CA7ull,
       0x4864f22c059bf29eull, 0x247856d8b862665cull, 0xe46e86e9a1337e10ull,
       0xd8c8541f3519b133ull, 0xe75b5162c567b9e4ull, 0xf732e5ded7009c5bull,
       0xb170b98353121eacull, 0x1ec2e8986d2362caull, 0x814c8e35fe9a961aull,
       0x0c3cd59c9b638a02ull, 0xcb3bb6478a07715cull, 0x1224e62c978bbc7full,
       0x671ef2cb04e81f6eull, 0x3c1cbd811eaf1808ull, 0x1bbc23cfa8fac721ull,
       0xa4c2cda65e596a51ull, 0xb77216fad37adf91ull, 0x836d794457c08849ull,
       0xe083df03475f49d7ull, 0xbc9feb512e6b0d6cull, 0xb12d74fdd718c8c5ull,
       0x12ff09653bfbe4caull, 0x8dd03a105bc4ee7eull, 0x5738341045ba0d85ull,
       0xf3fd722dc65ad09eull, 0xfa14fd21ea2a5705ull, 0xffe6ea4d6edb0c73ull,
       0xD07E9EFE2BF11FB4ull, 0x95DBDA4DAE909198ull, 0xEAAD8E716B93D5A0ull,
       0xD08ED1D0AFC725E0ull, 0x8E3C5B2F8E7594B7ull, 0x8FF6E2FBF2122B64ull,
       0x8888B812900DF01Cull, 0x4FAD5EA0688FC31Cull, 0xD1CFF191B3A8C1ADull,
       0x2F2F2218BE0E1777ull, 0xEA752DFE8B021FA1ull, 0xE5A0CC0FB56F74E8ull,
       0x18ACF3D6CE89E299ull, 0xB4A84FE0FD13E0B7ull, 0x7CC43B81D2ADA8D9ull,
       0x165FA26680957705ull, 0x93CC7314211A1477ull, 0xE6AD206577B5FA86ull,
       0xC75442F5FB9D35CFull, 0xEBCDAF0C7B3E89A0ull, 0xD6411BD3AE1E7E49ull,
       0x00250E2D2071B35Eull, 0x226800BB57B8E0AFull, 0x2464369BF009B91Eull,
       0x5563911D59DFA6AAull, 0x78C14389D95A537Full, 0x207D5BA202E5B9C5ull,
       0x832603766295CFA9ull, 0x11C819684E734A41ull, 0xB3472DCA7B14A94Aull,
   });

   std::vector<int> output(10);

   // Method 1.
   {
     absl::poisson_distribution<int> dist(5);
     std::generate(std::begin(output), std::end(output),
                   [&] { return dist(urbg); });
   }
   EXPECT_THAT(output,  // mean = 4.2
               ElementsAre(1, 0, 0, 4, 2, 10, 3, 3, 7, 12));

   // Method 2.
   {
     urbg.reset();
     absl::poisson_distribution<int> dist(25);
     std::generate(std::begin(output), std::end(output),
                   [&] { return dist(urbg); });
   }
   EXPECT_THAT(output,  // mean = 19.8
               ElementsAre(9, 35, 18, 10, 35, 18, 10, 35, 18, 10));

   // Method 3.
   {
     urbg.reset();
     absl::poisson_distribution<int> dist(121);
     std::generate(std::begin(output), std::end(output),
                   [&] { return dist(urbg); });
   }
   EXPECT_THAT(output,  // mean = 124.1
               ElementsAre(161, 122, 129, 124, 112, 112, 117, 120, 130, 114));
 }

 TEST(PoissonDistributionTest, AlgorithmExpectedValue_1) {
   // This tests small values of the Knuth method.
   // The underlying uniform distribution will generate exactly 0.5.
   absl::random_internal::sequence_urbg urbg({0x8000000000000001ull});
   absl::poisson_distribution<int> dist(5);
   EXPECT_EQ(7, dist(urbg));
 }

 TEST(PoissonDistributionTest, AlgorithmExpectedValue_2) {
   // This tests larger values of the Knuth method.
   // The underlying uniform distribution will generate exactly 0.5.
   absl::random_internal::sequence_urbg urbg({0x8000000000000001ull});
   absl::poisson_distribution<int> dist(25);
   EXPECT_EQ(36, dist(urbg));
 }

 TEST(PoissonDistributionTest, AlgorithmExpectedValue_3) {
   // This variant uses the ratio of uniforms method.
   absl::random_internal::sequence_urbg urbg(
       {0x7fffffffffffffffull, 0x8000000000000000ull});

   absl::poisson_distribution<int> dist(121);
   EXPECT_EQ(121, dist(urbg));
 }

 }  // namespace
	// Copyright 2017 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.

	#include "absl/random/poisson_distribution.h"

	#include <algorithm>
	#include <cstddef>
	#include <cstdint>
	#include <iterator>
	#include <random>
	#include <sstream>
	#include <string>
	#include <vector>

	#include "gmock/gmock.h"
	#include "gtest/gtest.h"
	#include "absl/base/macros.h"
	#include "absl/container/flat_hash_map.h"
	#include "absl/log/log.h"
	#include "absl/random/internal/chi_square.h"
	#include "absl/random/internal/distribution_test_util.h"
	#include "absl/random/internal/pcg_engine.h"
	#include "absl/random/internal/sequence_urbg.h"
	#include "absl/random/random.h"
	#include "absl/strings/str_cat.h"
	#include "absl/strings/str_format.h"
	#include "absl/strings/str_replace.h"
	#include "absl/strings/strip.h"

	// Notes about generating poisson variates:
	//
	// It is unlikely that any implementation of std::poisson_distribution
	// will be stable over time and across library implementations. For instance
	// the three different poisson variate generators listed below all differ:
	//
	// https://github.com/ampl/gsl/tree/master/randist/poisson.c
	// * GSL uses a gamma + binomial + knuth method to compute poisson variates.
	//
	// https://github.com/gcc-mirror/gcc/blob/master/libstdc%2B%2B-v3/include/bits/random.tcc
	// * GCC uses the Devroye rejection algorithm, based on
	// Devroye, L. Non-Uniform Random Variates Generation. Springer-Verlag,
	// New York, 1986, Ch. X, Sects. 3.3 & 3.4 (+ Errata!), ~p.511
	// http://www.nrbook.com/devroye/
	//
	// https://github.com/llvm-mirror/libcxx/blob/master/include/random
	// * CLANG uses a different rejection method, which appears to include a
	// normal-distribution approximation and an exponential distribution to
	// compute the threshold, including a similar factorial approximation to this
	// one, but it is unclear where the algorithm comes from, exactly.
	//

	namespace {

	using absl::random_internal::kChiSquared;

	// The PoissonDistributionInterfaceTest provides a basic test that
	// absl::poisson_distribution conforms to the interface and serialization
	// requirements imposed by [rand.req.dist] for the common integer types.

	template <typename IntType>
	class PoissonDistributionInterfaceTest : public ::testing::Test {};

	using IntTypes = ::testing::Types<int, int8_t, int16_t, int32_t, int64_t,
	uint8_t, uint16_t, uint32_t, uint64_t>;
	TYPED_TEST_SUITE(PoissonDistributionInterfaceTest, IntTypes);

	TYPED_TEST(PoissonDistributionInterfaceTest, SerializeTest) {
	using param_type = typename absl::poisson_distribution<TypeParam>::param_type;
	const double kMax =
	std::min(1e10 /* assertion limit */,
	static_cast<double>(std::numeric_limits<TypeParam>::max()));

	const double kParams[] = {
	// Cases around 1.
	1, //
	std::nextafter(1.0, 0.0), // 1 - epsilon
	std::nextafter(1.0, 2.0), // 1 + epsilon
	// Arbitrary values.
	1e-8, 1e-4,
	0.0000005, // ~7.2e-7
	0.2, // ~0.2x
	0.5, // 0.72
	2, // ~2.8
	20, // 3x ~9.6
	100, 1e4, 1e8, 1.5e9, 1e20,
	// Boundary cases.
	std::numeric_limits<double>::max(),
	std::numeric_limits<double>::epsilon(),
	std::nextafter(std::numeric_limits<double>::min(),
	1.0), // min + epsilon
	std::numeric_limits<double>::min(), // smallest normal
	std::numeric_limits<double>::denorm_min(), // smallest denorm
	std::numeric_limits<double>::min() / 2, // denorm
	std::nextafter(std::numeric_limits<double>::min(),
	0.0), // denorm_max
	};


	constexpr int kCount = 1000;
	absl::InsecureBitGen gen;
	for (const double m : kParams) {
	const double mean = std::min(kMax, m);
	const param_type param(mean);

	// Validate parameters.
	absl::poisson_distribution<TypeParam> before(mean);
	EXPECT_EQ(before.mean(), param.mean());

	{
	absl::poisson_distribution<TypeParam> via_param(param);
	EXPECT_EQ(via_param, before);
	EXPECT_EQ(via_param.param(), before.param());
	}

	// Smoke test.
	auto sample_min = before.max();
	auto sample_max = before.min();
	for (int i = 0; i < kCount; i++) {
	auto sample = before(gen);
	EXPECT_GE(sample, before.min());
	EXPECT_LE(sample, before.max());
	if (sample > sample_max) sample_max = sample;
	if (sample < sample_min) sample_min = sample;
	}

	LOG(INFO) << "Range {" << param.mean() << "}: " << sample_min << ", "
	<< sample_max;

	// Validate stream serialization.
	std::stringstream ss;
	ss << before;

	absl::poisson_distribution<TypeParam> after(3.8);

	EXPECT_NE(before.mean(), after.mean());
	EXPECT_NE(before.param(), after.param());
	EXPECT_NE(before, after);

	ss >> after;

	EXPECT_EQ(before.mean(), after.mean()) //
	<< ss.str() << " " //
	<< (ss.good() ? "good " : "") //
	<< (ss.bad() ? "bad " : "") //
	<< (ss.eof() ? "eof " : "") //
	<< (ss.fail() ? "fail " : "");
	}
	}

	// See http://www.itl.nist.gov/div898/handbook/eda/section3/eda366j.htm

	class PoissonModel {
	public:
	explicit PoissonModel(double mean) : mean_(mean) {}

	double mean() const { return mean_; }
	double variance() const { return mean_; }
	double stddev() const { return std::sqrt(variance()); }
	double skew() const { return 1.0 / mean_; }
	double kurtosis() const { return 3.0 + 1.0 / mean_; }

	// InitCDF() initializes the CDF for the distribution parameters.
	void InitCDF();

	// The InverseCDF, or the Percent-point function returns x, P(x) < v.
	struct CDF {
	size_t index;
	double pmf;
	double cdf;
	};
	CDF InverseCDF(double p) {
	CDF target{0, 0, p};
	auto it = std::upper_bound(
	std::begin(cdf_), std::end(cdf_), target,
	[](const CDF& a, const CDF& b) { return a.cdf < b.cdf; });
	return *it;
	}

	void LogCDF() {
	LOG(INFO) << "CDF (mean = " << mean_ << ")";
	for (const auto c : cdf_) {
	LOG(INFO) << c.index << ": pmf=" << c.pmf << " cdf=" << c.cdf;
	}
	}

	private:
	const double mean_;

	std::vector<CDF> cdf_;
	};

	// The goal is to compute an InverseCDF function, or percent point function for
	// the poisson distribution, and use that to partition our output into equal
	// range buckets. However there is no closed form solution for the inverse cdf
	// for poisson distributions (the closest is the incomplete gamma function).
	// Instead, `InitCDF` iteratively computes the PMF and the CDF. This enables
	// searching for the bucket points.
	void PoissonModel::InitCDF() {
	if (!cdf_.empty()) {
	// State already initialized.
	return;
	}
	ABSL_ASSERT(mean_ < 201.0);

	const size_t max_i = 50 * stddev() + mean();
	const double e_neg_mean = std::exp(-mean());
	ABSL_ASSERT(e_neg_mean > 0);

	double d = 1;
	double last_result = e_neg_mean;
	double cumulative = e_neg_mean;
	if (e_neg_mean > 1e-10) {
	cdf_.push_back({0, e_neg_mean, cumulative});
	}
	for (size_t i = 1; i < max_i; i++) {
	d *= (mean() / i);
	double result = e_neg_mean * d;
	cumulative += result;
	if (result < 1e-10 && result < last_result && cumulative > 0.999999) {
	break;
	}
	if (result > 1e-7) {
	cdf_.push_back({i, result, cumulative});
	}
	last_result = result;
	}
	ABSL_ASSERT(!cdf_.empty());
	}

	// PoissonDistributionZTest implements a z-test for the poisson distribution.

	struct ZParam {
	double mean;
	double p_fail; // Z-Test probability of failure.
	int trials; // Z-Test trials.
	size_t samples; // Z-Test samples.
	};

	class PoissonDistributionZTest : public testing::TestWithParam<ZParam>,
	public PoissonModel {
	public:
	PoissonDistributionZTest() : PoissonModel(GetParam().mean) {}

	// ZTestImpl provides a basic z-squared test of the mean vs. expected
	// mean for data generated by the poisson distribution.
	template <typename D>
	bool SingleZTest(const double p, const size_t samples);

	// We use a fixed bit generator for distribution accuracy tests. This allows
	// these tests to be deterministic, while still testing the qualify of the
	// implementation.
	absl::random_internal::pcg64_2018_engine rng_{0x2B7E151628AED2A6};
	};

	template <typename D>
	bool PoissonDistributionZTest::SingleZTest(const double p,
	const size_t samples) {
	D dis(mean());

	absl::flat_hash_map<int32_t, int> buckets;
	std::vector<double> data;
	data.reserve(samples);
	for (int j = 0; j < samples; j++) {
	const auto x = dis(rng_);
	buckets[x]++;
	data.push_back(x);
	}

	// The null-hypothesis is that the distribution is a poisson distribution with
	// the provided mean (not estimated from the data).
	const auto m = absl::random_internal::ComputeDistributionMoments(data);
	const double max_err = absl::random_internal::MaxErrorTolerance(p);
	const double z = absl::random_internal::ZScore(mean(), m);
	const bool pass = absl::random_internal::Near("z", z, 0.0, max_err);

	if (!pass) {
	// clang-format off
	LOG(INFO)
	<< "p=" << p << " max_err=" << max_err << "\n"
	" mean=" << m.mean << " vs. " << mean() << "\n"
	" stddev=" << std::sqrt(m.variance) << " vs. " << stddev() << "\n"
	" skewness=" << m.skewness << " vs. " << skew() << "\n"
	" kurtosis=" << m.kurtosis << " vs. " << kurtosis() << "\n"
	" z=" << z;
	// clang-format on
	}
	return pass;
	}

	TEST_P(PoissonDistributionZTest, AbslPoissonDistribution) {
	const auto& param = GetParam();
	const int expected_failures =
	std::max(1, static_cast<int>(std::ceil(param.trials * param.p_fail)));
	const double p = absl::random_internal::RequiredSuccessProbability(
	param.p_fail, param.trials);

	int failures = 0;
	for (int i = 0; i < param.trials; i++) {
	failures +=
	SingleZTest<absl::poisson_distribution<int32_t>>(p, param.samples) ? 0
	: 1;
	}
	EXPECT_LE(failures, expected_failures);
	}

	std::vector<ZParam> GetZParams() {
	// These values have been adjusted from the "exact" computed values to reduce
	// failure rates.
	//
	// It turns out that the actual values are not as close to the expected values
	// as would be ideal.
	return std::vector<ZParam>({
	// Knuth method.
	ZParam{0.5, 0.01, 100, 1000},
	ZParam{1.0, 0.01, 100, 1000},
	ZParam{10.0, 0.01, 100, 5000},
	// Split-knuth method.
	ZParam{20.0, 0.01, 100, 10000},
	ZParam{50.0, 0.01, 100, 10000},
	// Ratio of gaussians method.
	ZParam{51.0, 0.01, 100, 10000},
	ZParam{200.0, 0.05, 10, 100000},
	ZParam{100000.0, 0.05, 10, 1000000},
	});
	}

	std::string ZParamName(const ::testing::TestParamInfo<ZParam>& info) {
	const auto& p = info.param;
	std::string name = absl::StrCat("mean_", absl::SixDigits(p.mean));
	return absl::StrReplaceAll(name, {{"+", "_"}, {"-", "_"}, {".", "_"}});
	}

	INSTANTIATE_TEST_SUITE_P(All, PoissonDistributionZTest,
	::testing::ValuesIn(GetZParams()), ZParamName);

	// The PoissonDistributionChiSquaredTest class provides a basic test framework
	// for variates generated by a conforming poisson_distribution.
	class PoissonDistributionChiSquaredTest : public testing::TestWithParam<double>,
	public PoissonModel {
	public:
	PoissonDistributionChiSquaredTest() : PoissonModel(GetParam()) {}

	// The ChiSquaredTestImpl provides a chi-squared goodness of fit test for data
	// generated by the poisson distribution.
	template <typename D>
	double ChiSquaredTestImpl();

	private:
	void InitChiSquaredTest(const double buckets);

	std::vector<size_t> cutoffs_;
	std::vector<double> expected_;

	// We use a fixed bit generator for distribution accuracy tests. This allows
	// these tests to be deterministic, while still testing the qualify of the
	// implementation.
	absl::random_internal::pcg64_2018_engine rng_{0x2B7E151628AED2A6};
	};

	void PoissonDistributionChiSquaredTest::InitChiSquaredTest(
	const double buckets) {
	if (!cutoffs_.empty() && !expected_.empty()) {
	return;
	}
	InitCDF();

	// The code below finds cuttoffs that yield approximately equally-sized
	// buckets to the extent that it is possible. However for poisson
	// distributions this is particularly challenging for small mean parameters.
	// Track the expected proportion of items in each bucket.
	double last_cdf = 0;
	const double inc = 1.0 / buckets;
	for (double p = inc; p <= 1.0; p += inc) {
	auto result = InverseCDF(p);
	if (!cutoffs_.empty() && cutoffs_.back() == result.index) {
	continue;
	}
	double d = result.cdf - last_cdf;
	cutoffs_.push_back(result.index);
	expected_.push_back(d);
	last_cdf = result.cdf;
	}
	cutoffs_.push_back(std::numeric_limits<size_t>::max());
	expected_.push_back(std::max(0.0, 1.0 - last_cdf));
	}

	template <typename D>
	double PoissonDistributionChiSquaredTest::ChiSquaredTestImpl() {
	const int kSamples = 2000;
	const int kBuckets = 50;

	// The poisson CDF fails for large mean values, since e^-mean exceeds the
	// machine precision. For these cases, using a normal approximation would be
	// appropriate.
	ABSL_ASSERT(mean() <= 200);
	InitChiSquaredTest(kBuckets);

	D dis(mean());

	std::vector<int32_t> counts(cutoffs_.size(), 0);
	for (int j = 0; j < kSamples; j++) {
	const size_t x = dis(rng_);
	auto it = std::lower_bound(std::begin(cutoffs_), std::end(cutoffs_), x);
	counts[std::distance(cutoffs_.begin(), it)]++;
	}

	// Normalize the counts.
	std::vector<int32_t> e(expected_.size(), 0);
	for (int i = 0; i < e.size(); i++) {
	e[i] = kSamples * expected_[i];
	}

	// The null-hypothesis is that the distribution is a poisson distribution with
	// the provided mean (not estimated from the data).
	const int dof = static_cast<int>(counts.size()) - 1;

	// The threshold for logging is 1-in-50.
	const double threshold = absl::random_internal::ChiSquareValue(dof, 0.98);

	const double chi_square = absl::random_internal::ChiSquare(
	std::begin(counts), std::end(counts), std::begin(e), std::end(e));

	const double p = absl::random_internal::ChiSquarePValue(chi_square, dof);

	// Log if the chi_squared value is above the threshold.
	if (chi_square > threshold) {
	LogCDF();

	LOG(INFO) << "VALUES buckets=" << counts.size()
	<< " samples=" << kSamples;
	for (size_t i = 0; i < counts.size(); i++) {
	LOG(INFO) << cutoffs_[i] << ": " << counts[i] << " vs. E=" << e[i];
	}

	LOG(INFO) << kChiSquared << "(data, dof=" << dof << ") = " << chi_square
	<< " (" << p << ")\n"
	<< " vs.\n"
	<< kChiSquared << " @ 0.98 = " << threshold;
	}
	return p;
	}

	TEST_P(PoissonDistributionChiSquaredTest, AbslPoissonDistribution) {
	const int kTrials = 20;

	// Large values are not yet supported -- this requires estimating the cdf
	// using the normal distribution instead of the poisson in this case.
	ASSERT_LE(mean(), 200.0);
	if (mean() > 200.0) {
	return;
	}

	int failures = 0;
	for (int i = 0; i < kTrials; i++) {
	double p_value = ChiSquaredTestImpl<absl::poisson_distribution<int32_t>>();
	if (p_value < 0.005) {
	failures++;
	}
	}
	// There is a 0.10% chance of producing at least one failure, so raise the
	// failure threshold high enough to allow for a flake rate < 10,000.
	EXPECT_LE(failures, 4);
	}

	INSTANTIATE_TEST_SUITE_P(All, PoissonDistributionChiSquaredTest,
	::testing::Values(0.5, 1.0, 2.0, 10.0, 50.0, 51.0,
	200.0));

	// NOTE: absl::poisson_distribution is not guaranteed to be stable.
	TEST(PoissonDistributionTest, StabilityTest) {
	using testing::ElementsAre;
	// absl::poisson_distribution stability relies on stability of
	// std::exp, std::log, std::sqrt, std::ceil, std::floor, and
	// absl::FastUniformBits, absl::StirlingLogFactorial, absl::RandU64ToDouble.
	absl::random_internal::sequence_urbg urbg({
	0x035b0dc7e0a18acfull, 0x06cebe0d2653682eull, 0x0061e9b23861596bull,
	0x0003eb76f6f7f755ull, 0xFFCEA50FDB2F953Bull, 0xC332DDEFBE6C5AA5ull,
	0x6558218568AB9702ull, 0x2AEF7DAD5B6E2F84ull, 0x1521B62829076170ull,
	0xECDD4775619F1510ull, 0x13CCA830EB61BD96ull, 0x0334FE1EAA0363CFull,
	0xB5735C904C70A239ull, 0xD59E9E0BCBAADE14ull, 0xEECC86BC60622CA7ull,
	0x4864f22c059bf29eull, 0x247856d8b862665cull, 0xe46e86e9a1337e10ull,
	0xd8c8541f3519b133ull, 0xe75b5162c567b9e4ull, 0xf732e5ded7009c5bull,
	0xb170b98353121eacull, 0x1ec2e8986d2362caull, 0x814c8e35fe9a961aull,
	0x0c3cd59c9b638a02ull, 0xcb3bb6478a07715cull, 0x1224e62c978bbc7full,
	0x671ef2cb04e81f6eull, 0x3c1cbd811eaf1808ull, 0x1bbc23cfa8fac721ull,
	0xa4c2cda65e596a51ull, 0xb77216fad37adf91ull, 0x836d794457c08849ull,
	0xe083df03475f49d7ull, 0xbc9feb512e6b0d6cull, 0xb12d74fdd718c8c5ull,
	0x12ff09653bfbe4caull, 0x8dd03a105bc4ee7eull, 0x5738341045ba0d85ull,
	0xf3fd722dc65ad09eull, 0xfa14fd21ea2a5705ull, 0xffe6ea4d6edb0c73ull,
	0xD07E9EFE2BF11FB4ull, 0x95DBDA4DAE909198ull, 0xEAAD8E716B93D5A0ull,
	0xD08ED1D0AFC725E0ull, 0x8E3C5B2F8E7594B7ull, 0x8FF6E2FBF2122B64ull,
	0x8888B812900DF01Cull, 0x4FAD5EA0688FC31Cull, 0xD1CFF191B3A8C1ADull,
	0x2F2F2218BE0E1777ull, 0xEA752DFE8B021FA1ull, 0xE5A0CC0FB56F74E8ull,
	0x18ACF3D6CE89E299ull, 0xB4A84FE0FD13E0B7ull, 0x7CC43B81D2ADA8D9ull,
	0x165FA26680957705ull, 0x93CC7314211A1477ull, 0xE6AD206577B5FA86ull,
	0xC75442F5FB9D35CFull, 0xEBCDAF0C7B3E89A0ull, 0xD6411BD3AE1E7E49ull,
	0x00250E2D2071B35Eull, 0x226800BB57B8E0AFull, 0x2464369BF009B91Eull,
	0x5563911D59DFA6AAull, 0x78C14389D95A537Full, 0x207D5BA202E5B9C5ull,
	0x832603766295CFA9ull, 0x11C819684E734A41ull, 0xB3472DCA7B14A94Aull,
	});

	std::vector<int> output(10);

	// Method 1.
	{
	absl::poisson_distribution<int> dist(5);
	std::generate(std::begin(output), std::end(output),
	[&] { return dist(urbg); });
	}
	EXPECT_THAT(output, // mean = 4.2
	ElementsAre(1, 0, 0, 4, 2, 10, 3, 3, 7, 12));

	// Method 2.
	{
	urbg.reset();
	absl::poisson_distribution<int> dist(25);
	std::generate(std::begin(output), std::end(output),
	[&] { return dist(urbg); });
	}
	EXPECT_THAT(output, // mean = 19.8
	ElementsAre(9, 35, 18, 10, 35, 18, 10, 35, 18, 10));

	// Method 3.
	{
	urbg.reset();
	absl::poisson_distribution<int> dist(121);
	std::generate(std::begin(output), std::end(output),
	[&] { return dist(urbg); });
	}
	EXPECT_THAT(output, // mean = 124.1
	ElementsAre(161, 122, 129, 124, 112, 112, 117, 120, 130, 114));
	}

	TEST(PoissonDistributionTest, AlgorithmExpectedValue_1) {
	// This tests small values of the Knuth method.
	// The underlying uniform distribution will generate exactly 0.5.
	absl::random_internal::sequence_urbg urbg({0x8000000000000001ull});
	absl::poisson_distribution<int> dist(5);
	EXPECT_EQ(7, dist(urbg));
	}

	TEST(PoissonDistributionTest, AlgorithmExpectedValue_2) {
	// This tests larger values of the Knuth method.
	// The underlying uniform distribution will generate exactly 0.5.
	absl::random_internal::sequence_urbg urbg({0x8000000000000001ull});
	absl::poisson_distribution<int> dist(25);
	EXPECT_EQ(36, dist(urbg));
	}

	TEST(PoissonDistributionTest, AlgorithmExpectedValue_3) {
	// This variant uses the ratio of uniforms method.
	absl::random_internal::sequence_urbg urbg(
	{0x7fffffffffffffffull, 0x8000000000000000ull});

	absl::poisson_distribution<int> dist(121);
	EXPECT_EQ(121, dist(urbg));
	}

	} // namespace