blob: f065d8fed0973792c672ac7f7ac4b12eed0b938e [file] [log] [blame]
/*
* Copyright 2017 Google Inc.
*
* Use of this source code is governed by a BSD-style license that can be
* found in the LICENSE file.
*/
#include "src/core/SkGaussFilter.h"
#include <cmath>
#include <tuple>
#include <vector>
#include "tests/Test.h"
// one part in a million
static constexpr double kEpsilon = 0.000001;
static double careful_add(int n, double* gauss) {
// Sum smallest to largest to retain precision.
double sum = 0;
for (int i = n - 1; i >= 1; i--) {
sum += 2.0 * gauss[i];
}
sum += gauss[0];
return sum;
}
DEF_TEST(SkGaussFilterCommon, r) {
using Test = std::tuple<double, std::vector<double>>;
auto golden_check = [&](const Test& test) {
double sigma; std::vector<double> golden;
std::tie(sigma, golden) = test;
SkGaussFilter filter{sigma};
double result[SkGaussFilter::kGaussArrayMax];
int n = 0;
for (auto d : filter) {
result[n++] = d;
}
REPORTER_ASSERT(r, static_cast<size_t>(n) == golden.size());
double sum = careful_add(n, result);
REPORTER_ASSERT(r, sum == 1.0);
for (size_t i = 0; i < golden.size(); i++) {
REPORTER_ASSERT(r, std::abs(golden[i] - result[i]) < kEpsilon);
}
};
// The following two sigmas account for about 85% of all sigmas used for masks.
// Golden values generated using Mathematica.
auto tests = {
// GaussianMatrix[{{Automatic}, {.788675}}]
Test{0.788675, {0.593605, 0.176225, 0.0269721}},
// GaussianMatrix[{{4}, {1.07735}}, Method -> "Bessel"]
Test{1.07735, {0.429537, 0.214955, 0.059143, 0.0111337}},
};
for (auto& test : tests) {
golden_check(test);
}
}
DEF_TEST(SkGaussFilterSweep, r) {
// The double just before 2.0.
const double maxSigma = nextafter(2.0, 0.0);
auto check = [&](double sigma) {
SkGaussFilter filter{sigma};
double result[SkGaussFilter::kGaussArrayMax];
int n = 0;
for (auto d : filter) {
result[n++] = d;
}
REPORTER_ASSERT(r, n <= SkGaussFilter::kGaussArrayMax);
double sum = careful_add(n, result);
REPORTER_ASSERT(r, sum == 1.0);
};
for (double sigma = 0.0; sigma < 2.0; sigma += 0.1) {
check(sigma);
}
check(maxSigma);
}