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// 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.
#include "absl/base/internal/exponential_biased.h"
#include <stddef.h>
#include <cmath>
#include <cstdint>
#include <vector>
#include "gmock/gmock.h"
#include "gtest/gtest.h"
#include "absl/strings/str_cat.h"
using ::testing::Ge;
namespace absl {
ABSL_NAMESPACE_BEGIN
namespace base_internal {
MATCHER_P2(IsBetween, a, b,
absl::StrCat(std::string(negation ? "isn't" : "is"), " between ", a,
" and ", b)) {
return a <= arg && arg <= b;
}
// Tests of the quality of the random numbers generated
// This uses the Anderson Darling test for uniformity.
// See "Evaluating the Anderson-Darling Distribution" by Marsaglia
// for details.
// Short cut version of ADinf(z), z>0 (from Marsaglia)
// This returns the p-value for Anderson Darling statistic in
// the limit as n-> infinity. For finite n, apply the error fix below.
double AndersonDarlingInf(double z) {
if (z < 2) {
return exp(-1.2337141 / z) / sqrt(z) *
(2.00012 +
(0.247105 -
(0.0649821 - (0.0347962 - (0.011672 - 0.00168691 * z) * z) * z) *
z) *
z);
}
return exp(
-exp(1.0776 -
(2.30695 -
(0.43424 - (0.082433 - (0.008056 - 0.0003146 * z) * z) * z) * z) *
z));
}
// Corrects the approximation error in AndersonDarlingInf for small values of n
// Add this to AndersonDarlingInf to get a better approximation
// (from Marsaglia)
double AndersonDarlingErrFix(int n, double x) {
if (x > 0.8) {
return (-130.2137 +
(745.2337 -
(1705.091 - (1950.646 - (1116.360 - 255.7844 * x) * x) * x) * x) *
x) /
n;
}
double cutoff = 0.01265 + 0.1757 / n;
if (x < cutoff) {
double t = x / cutoff;
t = sqrt(t) * (1 - t) * (49 * t - 102);
return t * (0.0037 / (n * n) + 0.00078 / n + 0.00006) / n;
} else {
double t = (x - cutoff) / (0.8 - cutoff);
t = -0.00022633 +
(6.54034 - (14.6538 - (14.458 - (8.259 - 1.91864 * t) * t) * t) * t) *
t;
return t * (0.04213 + 0.01365 / n) / n;
}
}
// Returns the AndersonDarling p-value given n and the value of the statistic
double AndersonDarlingPValue(int n, double z) {
double ad = AndersonDarlingInf(z);
double errfix = AndersonDarlingErrFix(n, ad);
return ad + errfix;
}
double AndersonDarlingStatistic(const std::vector<double>& random_sample) {
int n = random_sample.size();
double ad_sum = 0;
for (int i = 0; i < n; i++) {
ad_sum += (2 * i + 1) *
std::log(random_sample[i] * (1 - random_sample[n - 1 - i]));
}
double ad_statistic = -n - 1 / static_cast<double>(n) * ad_sum;
return ad_statistic;
}
// Tests if the array of doubles is uniformly distributed.
// Returns the p-value of the Anderson Darling Statistic
// for the given set of sorted random doubles
// See "Evaluating the Anderson-Darling Distribution" by
// Marsaglia and Marsaglia for details.
double AndersonDarlingTest(const std::vector<double>& random_sample) {
double ad_statistic = AndersonDarlingStatistic(random_sample);
double p = AndersonDarlingPValue(random_sample.size(), ad_statistic);
return p;
}
TEST(ExponentialBiasedTest, CoinTossDemoWithGetSkipCount) {
ExponentialBiased eb;
for (int runs = 0; runs < 10; ++runs) {
for (int flips = eb.GetSkipCount(1); flips > 0; --flips) {
printf("head...");
}
printf("tail\n");
}
int heads = 0;
for (int i = 0; i < 10000000; i += 1 + eb.GetSkipCount(1)) {
++heads;
}
printf("Heads = %d (%f%%)\n", heads, 100.0 * heads / 10000000);
}
TEST(ExponentialBiasedTest, SampleDemoWithStride) {
ExponentialBiased eb;
int stride = eb.GetStride(10);
int samples = 0;
for (int i = 0; i < 10000000; ++i) {
if (--stride == 0) {
++samples;
stride = eb.GetStride(10);
}
}
printf("Samples = %d (%f%%)\n", samples, 100.0 * samples / 10000000);
}
// Testing that NextRandom generates uniform random numbers. Applies the
// Anderson-Darling test for uniformity
TEST(ExponentialBiasedTest, TestNextRandom) {
for (auto n : std::vector<int>({
10, // Check short-range correlation
100, 1000,
10000 // Make sure there's no systemic error
})) {
uint64_t x = 1;
// This assumes that the prng returns 48 bit numbers
uint64_t max_prng_value = static_cast<uint64_t>(1) << 48;
// Initialize.
for (int i = 1; i <= 20; i++) {
x = ExponentialBiased::NextRandom(x);
}
std::vector<uint64_t> int_random_sample(n);
// Collect samples
for (int i = 0; i < n; i++) {
int_random_sample[i] = x;
x = ExponentialBiased::NextRandom(x);
}
// First sort them...
std::sort(int_random_sample.begin(), int_random_sample.end());
std::vector<double> random_sample(n);
// Convert them to uniform randoms (in the range [0,1])
for (int i = 0; i < n; i++) {
random_sample[i] =
static_cast<double>(int_random_sample[i]) / max_prng_value;
}
// Now compute the Anderson-Darling statistic
double ad_pvalue = AndersonDarlingTest(random_sample);
EXPECT_GT(std::min(ad_pvalue, 1 - ad_pvalue), 0.0001)
<< "prng is not uniform: n = " << n << " p = " << ad_pvalue;
}
}
// The generator needs to be available as a thread_local and as a static
// variable.
TEST(ExponentialBiasedTest, InitializationModes) {
ABSL_CONST_INIT static ExponentialBiased eb_static;
EXPECT_THAT(eb_static.GetSkipCount(2), Ge(0));
#ifdef ABSL_HAVE_THREAD_LOCAL
thread_local ExponentialBiased eb_thread;
EXPECT_THAT(eb_thread.GetSkipCount(2), Ge(0));
#endif
ExponentialBiased eb_stack;
EXPECT_THAT(eb_stack.GetSkipCount(2), Ge(0));
}
} // namespace base_internal
ABSL_NAMESPACE_END
} // namespace absl
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