tests/FindCubicConvex180ChopsTest.cpp - skia - Git at Google

 /*
  * Copyright 2020 Google Inc.
  *
  * Use of this source code is governed by a BSD-style license that can be
  * found in the LICENSE file.
  */

 #include "include/utils/SkRandom.h"
 #include "src/core/SkGeometry.h"
 #include "src/gpu/tessellate/Tessellation.h"
 #include "tests/Test.h"

 namespace skgpu::tess {

 static bool is_linear(SkPoint p0, SkPoint p1, SkPoint p2) {
     return SkScalarNearlyZero((p0 - p1).cross(p2 - p1));
 }

 static bool is_linear(const SkPoint p[4]) {
     return is_linear(p[0],p[1],p[2]) && is_linear(p[0],p[2],p[3]) && is_linear(p[1],p[2],p[3]);
 }

 static void check_cubic_convex_180(skiatest::Reporter* r, const SkPoint p[4]) {
     bool areCusps = false;
     float inflectT[2], convex180T[2];
     if (int inflectN = SkFindCubicInflections(p, inflectT)) {
         // The curve has inflections. FindCubicConvex180Chops should return the inflection
         // points.
         int convex180N = FindCubicConvex180Chops(p, convex180T, &areCusps);
         REPORTER_ASSERT(r, inflectN == convex180N);
         if (!areCusps) {
             REPORTER_ASSERT(r, inflectN == 1 ||
                             fabsf(inflectT[0] - inflectT[1]) >= SK_ScalarNearlyZero);
         }
         for (int i = 0; i < convex180N; ++i) {
             REPORTER_ASSERT(r, SkScalarNearlyEqual(inflectT[i], convex180T[i]));
         }
     } else {
         float totalRotation = SkMeasureNonInflectCubicRotation(p);
         int convex180N = FindCubicConvex180Chops(p, convex180T, &areCusps);
         SkPoint chops[10];
         SkChopCubicAt(p, chops, convex180T, convex180N);
         float radsSum = 0;
         for (int i = 0; i <= convex180N; ++i) {
             float rads = SkMeasureNonInflectCubicRotation(chops + i*3);
             SkASSERT(rads < SK_ScalarPI + SK_ScalarNearlyZero);
             radsSum += rads;
         }
         if (totalRotation < SK_ScalarPI - SK_ScalarNearlyZero) {
             // The curve should never chop if rotation is <180 degrees.
             REPORTER_ASSERT(r, convex180N == 0);
         } else if (!is_linear(p)) {
             REPORTER_ASSERT(r, SkScalarNearlyEqual(radsSum, totalRotation));
             if (totalRotation > SK_ScalarPI + SK_ScalarNearlyZero) {
                 REPORTER_ASSERT(r, convex180N == 1);
                 // This works because cusps take the "inflection" path above, so we don't get
                 // non-lilnear curves that lose rotation when chopped.
                 REPORTER_ASSERT(r, SkScalarNearlyEqual(
                     SkMeasureNonInflectCubicRotation(chops), SK_ScalarPI));
                 REPORTER_ASSERT(r, SkScalarNearlyEqual(
                     SkMeasureNonInflectCubicRotation(chops + 3), totalRotation - SK_ScalarPI));
             }
             REPORTER_ASSERT(r, !areCusps);
         } else {
             REPORTER_ASSERT(r, areCusps);
         }
     }
 }

 DEF_TEST(FindCubicConvex180Chops, r) {
     // Test all combinations of corners from the square [0,0,1,1]. This covers every cubic type as
     // well as a wide variety of special cases for cusps, lines, loops, and inflections.
     for (int i = 0; i < (1 << 8); ++i) {
         SkPoint p[4] = {SkPoint::Make((i>>0)&1, (i>>1)&1),
                         SkPoint::Make((i>>2)&1, (i>>3)&1),
                         SkPoint::Make((i>>4)&1, (i>>5)&1),
                         SkPoint::Make((i>>6)&1, (i>>7)&1)};
         check_cubic_convex_180(r, p);
     }

     {
         // This cubic has a convex-180 chop at T=1-"epsilon"
         static const uint32_t hexPts[] = {0x3ee0ac74, 0x3f1e061a, 0x3e0fc408, 0x3f457230,
                                           0x3f42ac7c, 0x3f70d76c, 0x3f4e6520, 0x3f6acafa};
         SkPoint p[4];
         memcpy(p, hexPts, sizeof(p));
         check_cubic_convex_180(r, p);
     }

     // Now test an exact quadratic.
     SkPoint quad[4] = {{0,0}, {2,2}, {4,2}, {6,0}};
     float T[2];
     bool areCusps;
     REPORTER_ASSERT(r, FindCubicConvex180Chops(quad, T, &areCusps) == 0);

     // Now test that cusps and near-cusps get flagged as cusps.
     SkPoint cusp[4] = {{0,0}, {1,1}, {1,0}, {0,1}};
     REPORTER_ASSERT(r, FindCubicConvex180Chops(cusp, T, &areCusps) == 1);
     REPORTER_ASSERT(r, areCusps == true);

     // Find the height of the right side of "cusp" at which the distance between its inflection
     // points is kEpsilon (in parametric space).
     constexpr static double kEpsilon = 1.0 / (1 << 11);
     constexpr static double kEpsilonSquared = kEpsilon * kEpsilon;
     double h = (1 - kEpsilonSquared) / (3 * kEpsilonSquared + 1);
     double dy = (1 - h) / 2;
     cusp[1].fY = (float)(1 - dy);
     cusp[2].fY = (float)(0 + dy);
     REPORTER_ASSERT(r, SkFindCubicInflections(cusp, T) == 2);
     REPORTER_ASSERT(r, SkScalarNearlyEqual(T[1] - T[0], (float)kEpsilon, (float)kEpsilonSquared));

     // Ensure two inflection points barely more than kEpsilon apart do not get flagged as cusps.
     cusp[1].fY = (float)(1 - 1.1 * dy);
     cusp[2].fY = (float)(0 + 1.1 * dy);
     REPORTER_ASSERT(r, FindCubicConvex180Chops(cusp, T, &areCusps) == 2);
     REPORTER_ASSERT(r, areCusps == false);

     // Ensure two inflection points barely less than kEpsilon apart do get flagged as cusps.
     cusp[1].fY = (float)(1 - .9 * dy);
     cusp[2].fY = (float)(0 + .9 * dy);
     REPORTER_ASSERT(r, FindCubicConvex180Chops(cusp, T, &areCusps) == 1);
     REPORTER_ASSERT(r, areCusps == true);
 }

 }  // namespace skgpu::tess
	/*
	* Copyright 2020 Google Inc.
	*
	* Use of this source code is governed by a BSD-style license that can be
	* found in the LICENSE file.
	*/

	#include "include/utils/SkRandom.h"
	#include "src/core/SkGeometry.h"
	#include "src/gpu/tessellate/Tessellation.h"
	#include "tests/Test.h"

	namespace skgpu::tess {

	static bool is_linear(SkPoint p0, SkPoint p1, SkPoint p2) {
	return SkScalarNearlyZero((p0 - p1).cross(p2 - p1));
	}

	static bool is_linear(const SkPoint p[4]) {
	return is_linear(p[0],p[1],p[2]) && is_linear(p[0],p[2],p[3]) && is_linear(p[1],p[2],p[3]);
	}

	static void check_cubic_convex_180(skiatest::Reporter* r, const SkPoint p[4]) {
	bool areCusps = false;
	float inflectT[2], convex180T[2];
	if (int inflectN = SkFindCubicInflections(p, inflectT)) {
	// The curve has inflections. FindCubicConvex180Chops should return the inflection
	// points.
	int convex180N = FindCubicConvex180Chops(p, convex180T, &areCusps);
	REPORTER_ASSERT(r, inflectN == convex180N);
	if (!areCusps) {
	REPORTER_ASSERT(r, inflectN == 1 \|\|
	fabsf(inflectT[0] - inflectT[1]) >= SK_ScalarNearlyZero);
	}
	for (int i = 0; i < convex180N; ++i) {
	REPORTER_ASSERT(r, SkScalarNearlyEqual(inflectT[i], convex180T[i]));
	}
	} else {
	float totalRotation = SkMeasureNonInflectCubicRotation(p);
	int convex180N = FindCubicConvex180Chops(p, convex180T, &areCusps);
	SkPoint chops[10];
	SkChopCubicAt(p, chops, convex180T, convex180N);
	float radsSum = 0;
	for (int i = 0; i <= convex180N; ++i) {
	float rads = SkMeasureNonInflectCubicRotation(chops + i*3);
	SkASSERT(rads < SK_ScalarPI + SK_ScalarNearlyZero);
	radsSum += rads;
	}
	if (totalRotation < SK_ScalarPI - SK_ScalarNearlyZero) {
	// The curve should never chop if rotation is <180 degrees.
	REPORTER_ASSERT(r, convex180N == 0);
	} else if (!is_linear(p)) {
	REPORTER_ASSERT(r, SkScalarNearlyEqual(radsSum, totalRotation));
	if (totalRotation > SK_ScalarPI + SK_ScalarNearlyZero) {
	REPORTER_ASSERT(r, convex180N == 1);
	// This works because cusps take the "inflection" path above, so we don't get
	// non-lilnear curves that lose rotation when chopped.
	REPORTER_ASSERT(r, SkScalarNearlyEqual(
	SkMeasureNonInflectCubicRotation(chops), SK_ScalarPI));
	REPORTER_ASSERT(r, SkScalarNearlyEqual(
	SkMeasureNonInflectCubicRotation(chops + 3), totalRotation - SK_ScalarPI));
	}
	REPORTER_ASSERT(r, !areCusps);
	} else {
	REPORTER_ASSERT(r, areCusps);
	}
	}
	}

	DEF_TEST(FindCubicConvex180Chops, r) {
	// Test all combinations of corners from the square [0,0,1,1]. This covers every cubic type as
	// well as a wide variety of special cases for cusps, lines, loops, and inflections.
	for (int i = 0; i < (1 << 8); ++i) {
	SkPoint p[4] = {SkPoint::Make((i>>0)&1, (i>>1)&1),
	SkPoint::Make((i>>2)&1, (i>>3)&1),
	SkPoint::Make((i>>4)&1, (i>>5)&1),
	SkPoint::Make((i>>6)&1, (i>>7)&1)};
	check_cubic_convex_180(r, p);
	}

	{
	// This cubic has a convex-180 chop at T=1-"epsilon"
	static const uint32_t hexPts[] = {0x3ee0ac74, 0x3f1e061a, 0x3e0fc408, 0x3f457230,
	0x3f42ac7c, 0x3f70d76c, 0x3f4e6520, 0x3f6acafa};
	SkPoint p[4];
	memcpy(p, hexPts, sizeof(p));
	check_cubic_convex_180(r, p);
	}

	// Now test an exact quadratic.
	SkPoint quad[4] = {{0,0}, {2,2}, {4,2}, {6,0}};
	float T[2];
	bool areCusps;
	REPORTER_ASSERT(r, FindCubicConvex180Chops(quad, T, &areCusps) == 0);

	// Now test that cusps and near-cusps get flagged as cusps.
	SkPoint cusp[4] = {{0,0}, {1,1}, {1,0}, {0,1}};
	REPORTER_ASSERT(r, FindCubicConvex180Chops(cusp, T, &areCusps) == 1);
	REPORTER_ASSERT(r, areCusps == true);

	// Find the height of the right side of "cusp" at which the distance between its inflection
	// points is kEpsilon (in parametric space).
	constexpr static double kEpsilon = 1.0 / (1 << 11);
	constexpr static double kEpsilonSquared = kEpsilon * kEpsilon;
	double h = (1 - kEpsilonSquared) / (3 * kEpsilonSquared + 1);
	double dy = (1 - h) / 2;
	cusp[1].fY = (float)(1 - dy);
	cusp[2].fY = (float)(0 + dy);
	REPORTER_ASSERT(r, SkFindCubicInflections(cusp, T) == 2);
	REPORTER_ASSERT(r, SkScalarNearlyEqual(T[1] - T[0], (float)kEpsilon, (float)kEpsilonSquared));

	// Ensure two inflection points barely more than kEpsilon apart do not get flagged as cusps.
	cusp[1].fY = (float)(1 - 1.1 * dy);
	cusp[2].fY = (float)(0 + 1.1 * dy);
	REPORTER_ASSERT(r, FindCubicConvex180Chops(cusp, T, &areCusps) == 2);
	REPORTER_ASSERT(r, areCusps == false);

	// Ensure two inflection points barely less than kEpsilon apart do get flagged as cusps.
	cusp[1].fY = (float)(1 - .9 * dy);
	cusp[2].fY = (float)(0 + .9 * dy);
	REPORTER_ASSERT(r, FindCubicConvex180Chops(cusp, T, &areCusps) == 1);
	REPORTER_ASSERT(r, areCusps == true);
	}

	} // namespace skgpu::tess