skia2/tests/RandomTest.cpp
commit-bot@chromium.org e0e7cfe44b Change old PRG to be SkLCGRandom; change new one to SkRandom
The goal here is to get people to start using the new random number
generator, while leaving the old one in place so we don't have to 
rebaseline GMs.

R=reed@google.com, bsalomon@google.com

Author: jvanverth@google.com

Review URL: https://chromiumcodereview.appspot.com/23576015

git-svn-id: http://skia.googlecode.com/svn/trunk@11169 2bbb7eff-a529-9590-31e7-b0007b416f81
2013-09-09 20:09:12 +00:00

197 lines
5.8 KiB
C++

/*
* Copyright 2013 Google Inc.
*
* Use of this source code is governed by a BSD-style license that can be
* found in the LICENSE file.
*/
#include "Test.h"
#include "SkRandom.h"
#include "SkTSort.h"
static bool anderson_darling_test(double p[32]) {
// Min and max Anderson-Darling values allowable for k=32
const double kADMin32 = 0.202; // p-value of ~0.1
const double kADMax32 = 3.89; // p-value of ~0.99
// sort p values
SkTQSort<double>(p, p + 31);
// and compute Anderson-Darling statistic to ensure these are uniform
double s = 0.0;
for(int k = 0; k < 32; k++) {
double v = p[k]*(1.0 - p[31-k]);
if (v < 1.0e-30) {
v = 1.0e-30;
}
s += (2.0*(k+1)-1.0)*log(v);
}
double a2 = -32.0 - 0.03125*s;
return (kADMin32 < a2 && a2 < kADMax32);
}
static bool chi_square_test(int bins[256], int e) {
// Min and max chisquare values allowable
const double kChiSqMin256 = 206.3179; // probability of chance = 0.99 with k=256
const double kChiSqMax256 = 311.5603; // probability of chance = 0.01 with k=256
// compute chi-square
double chi2 = 0.0;
for (int j = 0; j < 256; ++j) {
double delta = bins[j] - e;
chi2 += delta*delta/e;
}
return (kChiSqMin256 < chi2 && chi2 < kChiSqMax256);
}
// Approximation to the normal distribution CDF
// From Waissi and Rossin, 1996
static double normal_cdf(double z) {
double t = ((-0.0004406*z*z* + 0.0418198)*z*z + 0.9)*z;
t *= -1.77245385091; // -sqrt(PI)
double p = 1.0/(1.0 + exp(t));
return p;
}
static void test_random_byte(skiatest::Reporter* reporter, int shift) {
int bins[256];
memset(bins, 0, sizeof(int)*256);
SkRandom rand;
for (int i = 0; i < 256*10000; ++i) {
bins[(rand.nextU() >> shift) & 0xff]++;
}
REPORTER_ASSERT(reporter, chi_square_test(bins, 10000));
}
static void test_random_float(skiatest::Reporter* reporter) {
int bins[256];
memset(bins, 0, sizeof(int)*256);
SkRandom rand;
for (int i = 0; i < 256*10000; ++i) {
float f = rand.nextF();
REPORTER_ASSERT(reporter, 0.0f <= f && f < 1.0f);
bins[(int)(f*256.f)]++;
}
REPORTER_ASSERT(reporter, chi_square_test(bins, 10000));
double p[32];
for (int j = 0; j < 32; ++j) {
float f = rand.nextF();
REPORTER_ASSERT(reporter, 0.0f <= f && f < 1.0f);
p[j] = f;
}
REPORTER_ASSERT(reporter, anderson_darling_test(p));
}
// This is a test taken from tuftests by Marsaglia and Tsang. The idea here is that
// we are using the random bit generated from a single shift position to generate
// "strings" of 16 bits in length, shifting the string and adding a new bit with each
// iteration. We track the numbers generated. The ones that we don't generate will
// have a normal distribution with mean ~24108 and standard deviation ~127. By
// creating a z-score (# of deviations from the mean) for one iteration of this step
// we can determine its probability.
//
// The original test used 26 bit strings, but is somewhat slow. This version uses 16
// bits which is less rigorous but much faster to generate.
static double test_single_gorilla(skiatest::Reporter* reporter, int shift) {
const int kWordWidth = 16;
const double kMean = 24108.0;
const double kStandardDeviation = 127.0;
const int kN = (1 << kWordWidth);
const int kNumEntries = kN >> 5; // dividing by 32
unsigned int entries[kNumEntries];
SkRandom rand;
memset(entries, 0, sizeof(unsigned int)*kNumEntries);
// pre-seed our string value
int value = 0;
for (int i = 0; i < kWordWidth-1; ++i) {
value <<= 1;
unsigned int rnd = rand.nextU();
value |= ((rnd >> shift) & 0x1);
}
// now make some strings and track them
for (int i = 0; i < kN; ++i) {
value <<= 1;
unsigned int rnd = rand.nextU();
value |= ((rnd >> shift) & 0x1);
int index = value & (kNumEntries-1);
SkASSERT(index < kNumEntries);
int entry_shift = (value >> (kWordWidth-5)) & 0x1f;
entries[index] |= (0x1 << entry_shift);
}
// count entries
int total = 0;
for (int i = 0; i < kNumEntries; ++i) {
unsigned int entry = entries[i];
while (entry) {
total += (entry & 0x1);
entry >>= 1;
}
}
// convert counts to normal distribution z-score
double z = ((kN-total)-kMean)/kStandardDeviation;
// compute probability from normal distibution CDF
double p = normal_cdf(z);
REPORTER_ASSERT(reporter, 0.01 < p && p < 0.99);
return p;
}
static void test_gorilla(skiatest::Reporter* reporter) {
double p[32];
for (int bit_position = 0; bit_position < 32; ++bit_position) {
p[bit_position] = test_single_gorilla(reporter, bit_position);
}
REPORTER_ASSERT(reporter, anderson_darling_test(p));
}
static void test_range(skiatest::Reporter* reporter) {
SkRandom rand;
// just to make sure we don't crash in this case
(void) rand.nextRangeU(0, 0xffffffff);
// check a case to see if it's uniform
int bins[256];
memset(bins, 0, sizeof(int)*256);
for (int i = 0; i < 256*10000; ++i) {
unsigned int u = rand.nextRangeU(17, 17+255);
REPORTER_ASSERT(reporter, 17 <= u && u <= 17+255);
bins[u - 17]++;
}
REPORTER_ASSERT(reporter, chi_square_test(bins, 10000));
}
static void TestRandom(skiatest::Reporter* reporter) {
// check uniform distributions of each byte in 32-bit word
test_random_byte(reporter, 0);
test_random_byte(reporter, 8);
test_random_byte(reporter, 16);
test_random_byte(reporter, 24);
test_random_float(reporter);
test_gorilla(reporter);
test_range(reporter);
}
#include "TestClassDef.h"
DEFINE_TESTCLASS("Random", RandomTestClass, TestRandom)