1 // Copyright 2017 The Abseil Authors.
2 //
3 // Licensed under the Apache License, Version 2.0 (the "License");
4 // you may not use this file except in compliance with the License.
5 // You may obtain a copy of the License at
6 //
7 // https://www.apache.org/licenses/LICENSE-2.0
8 //
9 // Unless required by applicable law or agreed to in writing, software
10 // distributed under the License is distributed on an "AS IS" BASIS,
11 // WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied.
12 // See the License for the specific language governing permissions and
13 // limitations under the License.
14
15 #include "absl/random/zipf_distribution.h"
16
17 #include <algorithm>
18 #include <cstddef>
19 #include <cstdint>
20 #include <iterator>
21 #include <random>
22 #include <string>
23 #include <utility>
24 #include <vector>
25
26 #include "gmock/gmock.h"
27 #include "gtest/gtest.h"
28 #include "absl/base/internal/raw_logging.h"
29 #include "absl/random/internal/chi_square.h"
30 #include "absl/random/internal/sequence_urbg.h"
31 #include "absl/random/random.h"
32 #include "absl/strings/str_cat.h"
33 #include "absl/strings/str_replace.h"
34 #include "absl/strings/strip.h"
35
36 namespace {
37
38 using ::absl::random_internal::kChiSquared;
39 using ::testing::ElementsAre;
40
41 template <typename IntType>
42 class ZipfDistributionTypedTest : public ::testing::Test {};
43
44 using IntTypes = ::testing::Types<int, int8_t, int16_t, int32_t, int64_t,
45 uint8_t, uint16_t, uint32_t, uint64_t>;
46 TYPED_TEST_CASE(ZipfDistributionTypedTest, IntTypes);
47
TYPED_TEST(ZipfDistributionTypedTest,SerializeTest)48 TYPED_TEST(ZipfDistributionTypedTest, SerializeTest) {
49 using param_type = typename absl::zipf_distribution<TypeParam>::param_type;
50
51 constexpr int kCount = 1000;
52 absl::InsecureBitGen gen;
53 for (const auto& param : {
54 param_type(),
55 param_type(32),
56 param_type(100, 3, 2),
57 param_type(std::numeric_limits<TypeParam>::max(), 4, 3),
58 param_type(std::numeric_limits<TypeParam>::max() / 2),
59 }) {
60 // Validate parameters.
61 const auto k = param.k();
62 const auto q = param.q();
63 const auto v = param.v();
64
65 absl::zipf_distribution<TypeParam> before(k, q, v);
66 EXPECT_EQ(before.k(), param.k());
67 EXPECT_EQ(before.q(), param.q());
68 EXPECT_EQ(before.v(), param.v());
69
70 {
71 absl::zipf_distribution<TypeParam> via_param(param);
72 EXPECT_EQ(via_param, before);
73 }
74
75 // Validate stream serialization.
76 std::stringstream ss;
77 ss << before;
78 absl::zipf_distribution<TypeParam> after(4, 5.5, 4.4);
79
80 EXPECT_NE(before.k(), after.k());
81 EXPECT_NE(before.q(), after.q());
82 EXPECT_NE(before.v(), after.v());
83 EXPECT_NE(before.param(), after.param());
84 EXPECT_NE(before, after);
85
86 ss >> after;
87
88 EXPECT_EQ(before.k(), after.k());
89 EXPECT_EQ(before.q(), after.q());
90 EXPECT_EQ(before.v(), after.v());
91 EXPECT_EQ(before.param(), after.param());
92 EXPECT_EQ(before, after);
93
94 // Smoke test.
95 auto sample_min = after.max();
96 auto sample_max = after.min();
97 for (int i = 0; i < kCount; i++) {
98 auto sample = after(gen);
99 EXPECT_GE(sample, after.min());
100 EXPECT_LE(sample, after.max());
101 if (sample > sample_max) sample_max = sample;
102 if (sample < sample_min) sample_min = sample;
103 }
104 ABSL_INTERNAL_LOG(INFO,
105 absl::StrCat("Range: ", +sample_min, ", ", +sample_max));
106 }
107 }
108
109 class ZipfModel {
110 public:
ZipfModel(size_t k,double q,double v)111 ZipfModel(size_t k, double q, double v) : k_(k), q_(q), v_(v) {}
112
mean() const113 double mean() const { return mean_; }
114
115 // For the other moments of the Zipf distribution, see, for example,
116 // http://mathworld.wolfram.com/ZipfDistribution.html
117
118 // PMF(k) = (1 / k^s) / H(N,s)
119 // Returns the probability that any single invocation returns k.
PMF(size_t i)120 double PMF(size_t i) { return i >= hnq_.size() ? 0.0 : hnq_[i] / sum_hnq_; }
121
122 // CDF = H(k, s) / H(N,s)
CDF(size_t i)123 double CDF(size_t i) {
124 if (i >= hnq_.size()) {
125 return 1.0;
126 }
127 auto it = std::begin(hnq_);
128 double h = 0.0;
129 for (const auto end = it; it != end; it++) {
130 h += *it;
131 }
132 return h / sum_hnq_;
133 }
134
135 // The InverseCDF returns the k values which bound p on the upper and lower
136 // bound. Since there is no closed-form solution, this is implemented as a
137 // bisction of the cdf.
InverseCDF(double p)138 std::pair<size_t, size_t> InverseCDF(double p) {
139 size_t min = 0;
140 size_t max = hnq_.size();
141 while (max > min + 1) {
142 size_t target = (max + min) >> 1;
143 double x = CDF(target);
144 if (x > p) {
145 max = target;
146 } else {
147 min = target;
148 }
149 }
150 return {min, max};
151 }
152
153 // Compute the probability totals, which are based on the generalized harmonic
154 // number, H(N,s).
155 // H(N,s) == SUM(k=1..N, 1 / k^s)
156 //
157 // In the limit, H(N,s) == zetac(s) + 1.
158 //
159 // NOTE: The mean of a zipf distribution could be computed here as well.
160 // Mean := H(N, s-1) / H(N,s).
161 // Given the parameter v = 1, this gives the following function:
162 // (Hn(100, 1) - Hn(1,1)) / (Hn(100,2) - Hn(1,2)) = 6.5944
163 //
Init()164 void Init() {
165 if (!hnq_.empty()) {
166 return;
167 }
168 hnq_.clear();
169 hnq_.reserve(std::min(k_, size_t{1000}));
170
171 sum_hnq_ = 0;
172 double qm1 = q_ - 1.0;
173 double sum_hnq_m1 = 0;
174 for (size_t i = 0; i < k_; i++) {
175 // Partial n-th generalized harmonic number
176 const double x = v_ + i;
177
178 // H(n, q-1)
179 const double hnqm1 =
180 (q_ == 2.0) ? (1.0 / x)
181 : (q_ == 3.0) ? (1.0 / (x * x)) : std::pow(x, -qm1);
182 sum_hnq_m1 += hnqm1;
183
184 // H(n, q)
185 const double hnq =
186 (q_ == 2.0) ? (1.0 / (x * x))
187 : (q_ == 3.0) ? (1.0 / (x * x * x)) : std::pow(x, -q_);
188 sum_hnq_ += hnq;
189 hnq_.push_back(hnq);
190 if (i > 1000 && hnq <= 1e-10) {
191 // The harmonic number is too small.
192 break;
193 }
194 }
195 assert(sum_hnq_ > 0);
196 mean_ = sum_hnq_m1 / sum_hnq_;
197 }
198
199 private:
200 const size_t k_;
201 const double q_;
202 const double v_;
203
204 double mean_;
205 std::vector<double> hnq_;
206 double sum_hnq_;
207 };
208
209 using zipf_u64 = absl::zipf_distribution<uint64_t>;
210
211 class ZipfTest : public testing::TestWithParam<zipf_u64::param_type>,
212 public ZipfModel {
213 public:
ZipfTest()214 ZipfTest() : ZipfModel(GetParam().k(), GetParam().q(), GetParam().v()) {}
215
216 absl::InsecureBitGen rng_;
217 };
218
TEST_P(ZipfTest,ChiSquaredTest)219 TEST_P(ZipfTest, ChiSquaredTest) {
220 const auto& param = GetParam();
221 Init();
222
223 size_t trials = 10000;
224
225 // Find the split-points for the buckets.
226 std::vector<size_t> points;
227 std::vector<double> expected;
228 {
229 double last_cdf = 0.0;
230 double min_p = 1.0;
231 for (double p = 0.01; p < 1.0; p += 0.01) {
232 auto x = InverseCDF(p);
233 if (points.empty() || points.back() < x.second) {
234 const double p = CDF(x.second);
235 points.push_back(x.second);
236 double q = p - last_cdf;
237 expected.push_back(q);
238 last_cdf = p;
239 if (q < min_p) {
240 min_p = q;
241 }
242 }
243 }
244 if (last_cdf < 0.999) {
245 points.push_back(std::numeric_limits<size_t>::max());
246 double q = 1.0 - last_cdf;
247 expected.push_back(q);
248 if (q < min_p) {
249 min_p = q;
250 }
251 } else {
252 points.back() = std::numeric_limits<size_t>::max();
253 expected.back() += (1.0 - last_cdf);
254 }
255 // The Chi-Squared score is not completely scale-invariant; it works best
256 // when the small values are in the small digits.
257 trials = static_cast<size_t>(8.0 / min_p);
258 }
259 ASSERT_GT(points.size(), 0);
260
261 // Generate n variates and fill the counts vector with the count of their
262 // occurrences.
263 std::vector<int64_t> buckets(points.size(), 0);
264 double avg = 0;
265 {
266 zipf_u64 dis(param);
267 for (size_t i = 0; i < trials; i++) {
268 uint64_t x = dis(rng_);
269 ASSERT_LE(x, dis.max());
270 ASSERT_GE(x, dis.min());
271 avg += static_cast<double>(x);
272 auto it = std::upper_bound(std::begin(points), std::end(points),
273 static_cast<size_t>(x));
274 buckets[std::distance(std::begin(points), it)]++;
275 }
276 avg = avg / static_cast<double>(trials);
277 }
278
279 // Validate the output using the Chi-Squared test.
280 for (auto& e : expected) {
281 e *= trials;
282 }
283
284 // The null-hypothesis is that the distribution is a poisson distribution with
285 // the provided mean (not estimated from the data).
286 const int dof = static_cast<int>(expected.size()) - 1;
287
288 // NOTE: This test runs about 15x per invocation, so a value of 0.9995 is
289 // approximately correct for a test suite failure rate of 1 in 100. In
290 // practice we see failures slightly higher than that.
291 const double threshold = absl::random_internal::ChiSquareValue(dof, 0.9999);
292
293 const double chi_square = absl::random_internal::ChiSquare(
294 std::begin(buckets), std::end(buckets), std::begin(expected),
295 std::end(expected));
296
297 const double p_actual =
298 absl::random_internal::ChiSquarePValue(chi_square, dof);
299
300 // Log if the chi_squared value is above the threshold.
301 if (chi_square > threshold) {
302 ABSL_INTERNAL_LOG(INFO, "values");
303 for (size_t i = 0; i < expected.size(); i++) {
304 ABSL_INTERNAL_LOG(INFO, absl::StrCat(points[i], ": ", buckets[i],
305 " vs. E=", expected[i]));
306 }
307 ABSL_INTERNAL_LOG(INFO, absl::StrCat("trials ", trials));
308 ABSL_INTERNAL_LOG(INFO,
309 absl::StrCat("mean ", avg, " vs. expected ", mean()));
310 ABSL_INTERNAL_LOG(INFO, absl::StrCat(kChiSquared, "(data, ", dof, ") = ",
311 chi_square, " (", p_actual, ")"));
312 ABSL_INTERNAL_LOG(INFO,
313 absl::StrCat(kChiSquared, " @ 0.9995 = ", threshold));
314 FAIL() << kChiSquared << " value of " << chi_square
315 << " is above the threshold.";
316 }
317 }
318
GenParams()319 std::vector<zipf_u64::param_type> GenParams() {
320 using param = zipf_u64::param_type;
321 const auto k = param().k();
322 const auto q = param().q();
323 const auto v = param().v();
324 const uint64_t k2 = 1 << 10;
325 return std::vector<zipf_u64::param_type>{
326 // Default
327 param(k, q, v),
328 // vary K
329 param(4, q, v), param(1 << 4, q, v), param(k2, q, v),
330 // vary V
331 param(k2, q, 0.5), param(k2, q, 1.5), param(k2, q, 2.5), param(k2, q, 10),
332 // vary Q
333 param(k2, 1.5, v), param(k2, 3, v), param(k2, 5, v), param(k2, 10, v),
334 // Vary V & Q
335 param(k2, 1.5, 0.5), param(k2, 3, 1.5), param(k, 10, 10)};
336 }
337
ParamName(const::testing::TestParamInfo<zipf_u64::param_type> & info)338 std::string ParamName(
339 const ::testing::TestParamInfo<zipf_u64::param_type>& info) {
340 const auto& p = info.param;
341 std::string name = absl::StrCat("k_", p.k(), "__q_", absl::SixDigits(p.q()),
342 "__v_", absl::SixDigits(p.v()));
343 return absl::StrReplaceAll(name, {{"+", "_"}, {"-", "_"}, {".", "_"}});
344 }
345
346 INSTANTIATE_TEST_SUITE_P(All, ZipfTest, ::testing::ValuesIn(GenParams()),
347 ParamName);
348
349 // NOTE: absl::zipf_distribution is not guaranteed to be stable.
TEST(ZipfDistributionTest,StabilityTest)350 TEST(ZipfDistributionTest, StabilityTest) {
351 // absl::zipf_distribution stability relies on
352 // absl::uniform_real_distribution, std::log, std::exp, std::log1p
353 absl::random_internal::sequence_urbg urbg(
354 {0x0003eb76f6f7f755ull, 0xFFCEA50FDB2F953Bull, 0xC332DDEFBE6C5AA5ull,
355 0x6558218568AB9702ull, 0x2AEF7DAD5B6E2F84ull, 0x1521B62829076170ull,
356 0xECDD4775619F1510ull, 0x13CCA830EB61BD96ull, 0x0334FE1EAA0363CFull,
357 0xB5735C904C70A239ull, 0xD59E9E0BCBAADE14ull, 0xEECC86BC60622CA7ull});
358
359 std::vector<int> output(10);
360
361 {
362 absl::zipf_distribution<int32_t> dist;
363 std::generate(std::begin(output), std::end(output),
364 [&] { return dist(urbg); });
365 EXPECT_THAT(output, ElementsAre(10031, 0, 0, 3, 6, 0, 7, 47, 0, 0));
366 }
367 urbg.reset();
368 {
369 absl::zipf_distribution<int32_t> dist(std::numeric_limits<int32_t>::max(),
370 3.3);
371 std::generate(std::begin(output), std::end(output),
372 [&] { return dist(urbg); });
373 EXPECT_THAT(output, ElementsAre(44, 0, 0, 0, 0, 1, 0, 1, 3, 0));
374 }
375 }
376
TEST(ZipfDistributionTest,AlgorithmBounds)377 TEST(ZipfDistributionTest, AlgorithmBounds) {
378 absl::zipf_distribution<int32_t> dist;
379
380 // Small values from absl::uniform_real_distribution map to larger Zipf
381 // distribution values.
382 const std::pair<uint64_t, int32_t> kInputs[] = {
383 {0xffffffffffffffff, 0x0}, {0x7fffffffffffffff, 0x0},
384 {0x3ffffffffffffffb, 0x1}, {0x1ffffffffffffffd, 0x4},
385 {0xffffffffffffffe, 0x9}, {0x7ffffffffffffff, 0x12},
386 {0x3ffffffffffffff, 0x25}, {0x1ffffffffffffff, 0x4c},
387 {0xffffffffffffff, 0x99}, {0x7fffffffffffff, 0x132},
388 {0x3fffffffffffff, 0x265}, {0x1fffffffffffff, 0x4cc},
389 {0xfffffffffffff, 0x999}, {0x7ffffffffffff, 0x1332},
390 {0x3ffffffffffff, 0x2665}, {0x1ffffffffffff, 0x4ccc},
391 {0xffffffffffff, 0x9998}, {0x7fffffffffff, 0x1332f},
392 {0x3fffffffffff, 0x2665a}, {0x1fffffffffff, 0x4cc9e},
393 {0xfffffffffff, 0x998e0}, {0x7ffffffffff, 0x133051},
394 {0x3ffffffffff, 0x265ae4}, {0x1ffffffffff, 0x4c9ed3},
395 {0xffffffffff, 0x98e223}, {0x7fffffffff, 0x13058c4},
396 {0x3fffffffff, 0x25b178e}, {0x1fffffffff, 0x4a062b2},
397 {0xfffffffff, 0x8ee23b8}, {0x7ffffffff, 0x10b21642},
398 {0x3ffffffff, 0x1d89d89d}, {0x1ffffffff, 0x2fffffff},
399 {0xffffffff, 0x45d1745d}, {0x7fffffff, 0x5a5a5a5a},
400 {0x3fffffff, 0x69ee5846}, {0x1fffffff, 0x73ecade3},
401 {0xfffffff, 0x79a9d260}, {0x7ffffff, 0x7cc0532b},
402 {0x3ffffff, 0x7e5ad146}, {0x1ffffff, 0x7f2c0bec},
403 {0xffffff, 0x7f95adef}, {0x7fffff, 0x7fcac0da},
404 {0x3fffff, 0x7fe55ae2}, {0x1fffff, 0x7ff2ac0e},
405 {0xfffff, 0x7ff955ae}, {0x7ffff, 0x7ffcaac1},
406 {0x3ffff, 0x7ffe555b}, {0x1ffff, 0x7fff2aac},
407 {0xffff, 0x7fff9556}, {0x7fff, 0x7fffcaab},
408 {0x3fff, 0x7fffe555}, {0x1fff, 0x7ffff2ab},
409 {0xfff, 0x7ffff955}, {0x7ff, 0x7ffffcab},
410 {0x3ff, 0x7ffffe55}, {0x1ff, 0x7fffff2b},
411 {0xff, 0x7fffff95}, {0x7f, 0x7fffffcb},
412 {0x3f, 0x7fffffe5}, {0x1f, 0x7ffffff3},
413 {0xf, 0x7ffffff9}, {0x7, 0x7ffffffd},
414 {0x3, 0x7ffffffe}, {0x1, 0x7fffffff},
415 };
416
417 for (const auto& instance : kInputs) {
418 absl::random_internal::sequence_urbg urbg({instance.first});
419 EXPECT_EQ(instance.second, dist(urbg));
420 }
421 }
422
423 } // namespace
424