src/utils/SkCurveMeasure.cpp - platform/external/skia - Gitiles

 /*
  * Copyright 2016 Google Inc.
  *
  * Use of this source code is governed by a BSD-style license that can be
  * found in the LICENSE file.
  */

 #include "SkCurveMeasure.h"
 #include "SkGeometry.h"

 // for abs
 #include <cmath>

 #define UNIMPLEMENTED SkDEBUGF(("%s:%d unimplemented\n", __FILE__, __LINE__))

 /// Used inside SkCurveMeasure::getTime's Newton's iteration
 static inline SkPoint evaluate(const SkPoint pts[4], SkSegType segType,
                                SkScalar t) {
     SkPoint pos;
     switch (segType) {
         case kQuad_SegType:
             pos = SkEvalQuadAt(pts, t);
             break;
         case kLine_SegType:
             pos = SkPoint::Make(SkScalarInterp(pts[0].x(), pts[1].x(), t),
                                 SkScalarInterp(pts[0].y(), pts[1].y(), t));
             break;
         case kCubic_SegType:
             SkEvalCubicAt(pts, t, &pos, nullptr, nullptr);
             break;
         case kConic_SegType: {
             SkConic conic(pts, pts[3].x());
             conic.evalAt(t, &pos);
         }
             break;
         default:
             UNIMPLEMENTED;
     }

     return pos;
 }

 /// Used inside SkCurveMeasure::getTime's Newton's iteration
 static inline SkVector evaluateDerivative(const SkPoint pts[4],
                                           SkSegType segType, SkScalar t) {
     SkVector tan;
     switch (segType) {
         case kQuad_SegType:
             tan = SkEvalQuadTangentAt(pts, t);
             break;
         case kLine_SegType:
             tan = pts[1] - pts[0];
             break;
         case kCubic_SegType:
             SkEvalCubicAt(pts, t, nullptr, &tan, nullptr);
             break;
         case kConic_SegType: {
             SkConic conic(pts, pts[3].x());
             conic.evalAt(t, nullptr, &tan);
         }
             break;
         default:
             UNIMPLEMENTED;
     }

     return tan;
 }
 /// Used in ArcLengthIntegrator::computeLength
 static inline Sk8f evaluateDerivativeLength(const Sk8f& ts,
                                             const float (&xCoeff)[3][8],
                                             const float (&yCoeff)[3][8],
                                             const SkSegType segType) {
     Sk8f x;
     Sk8f y;

     Sk8f x0 = Sk8f::Load(&xCoeff[0]),
          x1 = Sk8f::Load(&xCoeff[1]),
          x2 = Sk8f::Load(&xCoeff[2]);

     Sk8f y0 = Sk8f::Load(&yCoeff[0]),
          y1 = Sk8f::Load(&yCoeff[1]),
          y2 = Sk8f::Load(&yCoeff[2]);

     switch (segType) {
         case kQuad_SegType:
             x = x0*ts + x1;
             y = y0*ts + y1;
             break;
         case kCubic_SegType:
             x = (x0*ts + x1)*ts + x2;
             y = (y0*ts + y1)*ts + y2;
             break;
         case kConic_SegType:
             UNIMPLEMENTED;
             break;
         default:
             UNIMPLEMENTED;
     }

     x = x * x;
     y = y * y;

     return (x + y).sqrt();
 }

 ArcLengthIntegrator::ArcLengthIntegrator(const SkPoint* pts, SkSegType segType)
     : fSegType(segType) {
     switch (fSegType) {
         case kQuad_SegType: {
             float Ax = pts[0].x();
             float Bx = pts[1].x();
             float Cx = pts[2].x();
             float Ay = pts[0].y();
             float By = pts[1].y();
             float Cy = pts[2].y();

             // precompute coefficients for derivative
             Sk8f(2*(Ax - 2*Bx + Cx)).store(&xCoeff[0]);
             Sk8f(2*(Bx - Ax)).store(&xCoeff[1]);

             Sk8f(2*(Ay - 2*By + Cy)).store(&yCoeff[0]);
             Sk8f(2*(By - Ay)).store(&yCoeff[1]);
         }
             break;
         case kCubic_SegType:
         {
             float Ax = pts[0].x();
             float Bx = pts[1].x();
             float Cx = pts[2].x();
             float Dx = pts[3].x();
             float Ay = pts[0].y();
             float By = pts[1].y();
             float Cy = pts[2].y();
             float Dy = pts[3].y();

             // precompute coefficients for derivative
             Sk8f(3*(-Ax + 3*(Bx - Cx) + Dx)).store(&xCoeff[0]);
             Sk8f(6*(Ax - 2*Bx + Cx)).store(&xCoeff[1]);
             Sk8f(3*(-Ax + Bx)).store(&xCoeff[2]);

             Sk8f(3*(-Ay + 3*(By - Cy) + Dy)).store(&yCoeff[0]);
             Sk8f(6*(Ay - 2*By + Cy)).store(&yCoeff[1]);
             Sk8f(3*(-Ay + By)).store(&yCoeff[2]);
         }
             break;
         case kConic_SegType:
             UNIMPLEMENTED;
             break;
         default:
             UNIMPLEMENTED;
     }
 }

 // We use Gaussian quadrature
 // (https://en.wikipedia.org/wiki/Gaussian_quadrature)
 // to approximate the arc length integral here, because it is amenable to SIMD.
 SkScalar ArcLengthIntegrator::computeLength(SkScalar t) {
     SkScalar length = 0.0f;

     Sk8f lengths = evaluateDerivativeLength(absc*t, xCoeff, yCoeff, fSegType);
     lengths = weights*lengths;
     // is it faster or more accurate to sum and then multiply or vice versa?
     lengths = lengths*(t*0.5f);

     // Why does SkNx index with ints? does negative index mean something?
     for (int i = 0; i < 8; i++) {
         length += lengths[i];
     }
     return length;
 }

 SkCurveMeasure::SkCurveMeasure(const SkPoint* pts, SkSegType segType)
     : fSegType(segType) {
     switch (fSegType) {
         case SkSegType::kQuad_SegType:
             for (size_t i = 0; i < 3; i++) {
                 fPts[i] = pts[i];
             }
             break;
         case SkSegType::kLine_SegType:
             fPts[0] = pts[0];
             fPts[1] = pts[1];
             fLength = (fPts[1] - fPts[0]).length();
             break;
         case SkSegType::kCubic_SegType:
             for (size_t i = 0; i < 4; i++) {
                 fPts[i] = pts[i];
             }
             break;
         case SkSegType::kConic_SegType:
             for (size_t i = 0; i < 4; i++) {
                 fPts[i] = pts[i];
             }
             break;
         default:
             UNIMPLEMENTED;
             break;
     }
     if (kLine_SegType != segType) {
         fIntegrator = ArcLengthIntegrator(fPts, fSegType);
     }
 }

 SkScalar SkCurveMeasure::getLength() {
     if (-1.0f == fLength) {
         fLength = fIntegrator.computeLength(1.0f);
     }
     return fLength;
 }

 // Given an arc length targetLength, we want to determine what t
 // gives us the corresponding arc length along the curve.
 // We do this by letting the arc length integral := f(t) and
 // solving for the root of the equation f(t) - targetLength = 0
 // using Newton's method and lerp-bisection.
 // The computationally expensive parts are the integral approximation
 // at each step, and computing the derivative of the arc length integral,
 // which is equal to the length of the tangent (so we have to do a sqrt).

 SkScalar SkCurveMeasure::getTime(SkScalar targetLength) {
     if (targetLength <= 0.0f) {
         return 0.0f;
     }

     SkScalar currentLength = getLength();

     if (targetLength > currentLength || (SkScalarNearlyEqual(targetLength, currentLength))) {
         return 1.0f;
     }
     if (kLine_SegType == fSegType) {
         return targetLength / currentLength;
     }

     // initial estimate of t is percentage of total length
     SkScalar currentT = targetLength / currentLength;
     SkScalar prevT = -1.0f;
     SkScalar newT;

     SkScalar minT = 0.0f;
     SkScalar maxT = 1.0f;

     int iterations = 0;
     while (iterations < kNewtonIters + kBisectIters) {
         currentLength = fIntegrator.computeLength(currentT);
         SkScalar lengthDiff = currentLength - targetLength;

         // Update root bounds.
         // If lengthDiff is positive, we have overshot the target, so
         // we know the current t is an upper bound, and similarly
         // for the lower bound.
         if (lengthDiff > 0.0f) {
             if (currentT < maxT) {
                 maxT = currentT;
             }
         } else {
             if (currentT > minT) {
                 minT = currentT;
             }
         }

         // We have a tolerance on both the absolute value of the difference and
         // on the t value
         // because we may not have enough precision in the t to get close enough
         // in the length.
         if ((std::abs(lengthDiff) < kTolerance) ||
             (std::abs(prevT - currentT) < kTolerance)) {
             break;
         }

         prevT = currentT;
         if (iterations < kNewtonIters) {
             // This is just newton's formula.
             SkScalar dt = evaluateDerivative(fPts, fSegType, currentT).length();
             newT = currentT - (lengthDiff / dt);

             // If newT is out of bounds, bisect inside newton.
             if ((newT < 0.0f) || (newT > 1.0f)) {
                 newT = (minT + maxT) * 0.5f;
             }
         } else if (iterations < kNewtonIters + kBisectIters) {
             if (lengthDiff > 0.0f) {
                 maxT = currentT;
             } else {
                 minT = currentT;
             }
             // TODO(hstern) do a lerp here instead of a bisection
             newT = (minT + maxT) * 0.5f;
         } else {
             SkDEBUGF(("%.7f %.7f didn't get close enough after bisection.\n",
                       currentT, currentLength));
             break;
         }
         currentT = newT;

         SkASSERT(minT <= maxT);

         iterations++;
     }

     // debug. is there an SKDEBUG or something for ifdefs?
     fIters = iterations;

     return currentT;
 }

 void SkCurveMeasure::getPosTanTime(SkScalar targetLength, SkPoint* pos,
                                    SkVector* tan, SkScalar* time) {
     SkScalar t = getTime(targetLength);

     if (time) {
         *time = t;
     }
     if (pos) {
         *pos = evaluate(fPts, fSegType, t);
     }
     if (tan) {
         *tan = evaluateDerivative(fPts, fSegType, t);
     }
 }
	/*
	* Copyright 2016 Google Inc.
	*
	* Use of this source code is governed by a BSD-style license that can be
	* found in the LICENSE file.
	*/

	#include "SkCurveMeasure.h"
	#include "SkGeometry.h"

	// for abs
	#include <cmath>

	#define UNIMPLEMENTED SkDEBUGF(("%s:%d unimplemented\n", __FILE__, __LINE__))

	/// Used inside SkCurveMeasure::getTime's Newton's iteration
	static inline SkPoint evaluate(const SkPoint pts[4], SkSegType segType,
	SkScalar t) {
	SkPoint pos;
	switch (segType) {
	case kQuad_SegType:
	pos = SkEvalQuadAt(pts, t);
	break;
	case kLine_SegType:
	pos = SkPoint::Make(SkScalarInterp(pts[0].x(), pts[1].x(), t),
	SkScalarInterp(pts[0].y(), pts[1].y(), t));
	break;
	case kCubic_SegType:
	SkEvalCubicAt(pts, t, &pos, nullptr, nullptr);
	break;
	case kConic_SegType: {
	SkConic conic(pts, pts[3].x());
	conic.evalAt(t, &pos);
	}
	break;
	default:
	UNIMPLEMENTED;
	}

	return pos;
	}

	/// Used inside SkCurveMeasure::getTime's Newton's iteration
	static inline SkVector evaluateDerivative(const SkPoint pts[4],
	SkSegType segType, SkScalar t) {
	SkVector tan;
	switch (segType) {
	case kQuad_SegType:
	tan = SkEvalQuadTangentAt(pts, t);
	break;
	case kLine_SegType:
	tan = pts[1] - pts[0];
	break;
	case kCubic_SegType:
	SkEvalCubicAt(pts, t, nullptr, &tan, nullptr);
	break;
	case kConic_SegType: {
	SkConic conic(pts, pts[3].x());
	conic.evalAt(t, nullptr, &tan);
	}
	break;
	default:
	UNIMPLEMENTED;
	}

	return tan;
	}
	/// Used in ArcLengthIntegrator::computeLength
	static inline Sk8f evaluateDerivativeLength(const Sk8f& ts,
	const float (&xCoeff)[3][8],
	const float (&yCoeff)[3][8],
	const SkSegType segType) {
	Sk8f x;
	Sk8f y;

	Sk8f x0 = Sk8f::Load(&xCoeff[0]),
	x1 = Sk8f::Load(&xCoeff[1]),
	x2 = Sk8f::Load(&xCoeff[2]);

	Sk8f y0 = Sk8f::Load(&yCoeff[0]),
	y1 = Sk8f::Load(&yCoeff[1]),
	y2 = Sk8f::Load(&yCoeff[2]);

	switch (segType) {
	case kQuad_SegType:
	x = x0*ts + x1;
	y = y0*ts + y1;
	break;
	case kCubic_SegType:
	x = (x0ts + x1)ts + x2;
	y = (y0ts + y1)ts + y2;
	break;
	case kConic_SegType:
	UNIMPLEMENTED;
	break;
	default:
	UNIMPLEMENTED;
	}

	x = x * x;
	y = y * y;

	return (x + y).sqrt();
	}

	ArcLengthIntegrator::ArcLengthIntegrator(const SkPoint* pts, SkSegType segType)
	: fSegType(segType) {
	switch (fSegType) {
	case kQuad_SegType: {
	float Ax = pts[0].x();
	float Bx = pts[1].x();
	float Cx = pts[2].x();
	float Ay = pts[0].y();
	float By = pts[1].y();
	float Cy = pts[2].y();

	// precompute coefficients for derivative
	Sk8f(2(Ax - 2Bx + Cx)).store(&xCoeff[0]);
	Sk8f(2*(Bx - Ax)).store(&xCoeff[1]);

	Sk8f(2(Ay - 2By + Cy)).store(&yCoeff[0]);
	Sk8f(2*(By - Ay)).store(&yCoeff[1]);
	}
	break;
	case kCubic_SegType:
	{
	float Ax = pts[0].x();
	float Bx = pts[1].x();
	float Cx = pts[2].x();
	float Dx = pts[3].x();
	float Ay = pts[0].y();
	float By = pts[1].y();
	float Cy = pts[2].y();
	float Dy = pts[3].y();

	// precompute coefficients for derivative
	Sk8f(3(-Ax + 3(Bx - Cx) + Dx)).store(&xCoeff[0]);
	Sk8f(6(Ax - 2Bx + Cx)).store(&xCoeff[1]);
	Sk8f(3*(-Ax + Bx)).store(&xCoeff[2]);

	Sk8f(3(-Ay + 3(By - Cy) + Dy)).store(&yCoeff[0]);
	Sk8f(6(Ay - 2By + Cy)).store(&yCoeff[1]);
	Sk8f(3*(-Ay + By)).store(&yCoeff[2]);
	}
	break;
	case kConic_SegType:
	UNIMPLEMENTED;
	break;
	default:
	UNIMPLEMENTED;
	}
	}

	// We use Gaussian quadrature
	// (https://en.wikipedia.org/wiki/Gaussian_quadrature)
	// to approximate the arc length integral here, because it is amenable to SIMD.
	SkScalar ArcLengthIntegrator::computeLength(SkScalar t) {
	SkScalar length = 0.0f;

	Sk8f lengths = evaluateDerivativeLength(absc*t, xCoeff, yCoeff, fSegType);
	lengths = weights*lengths;
	// is it faster or more accurate to sum and then multiply or vice versa?
	lengths = lengths(t0.5f);

	// Why does SkNx index with ints? does negative index mean something?
	for (int i = 0; i < 8; i++) {
	length += lengths[i];
	}
	return length;
	}

	SkCurveMeasure::SkCurveMeasure(const SkPoint* pts, SkSegType segType)
	: fSegType(segType) {
	switch (fSegType) {
	case SkSegType::kQuad_SegType:
	for (size_t i = 0; i < 3; i++) {
	fPts[i] = pts[i];
	}
	break;
	case SkSegType::kLine_SegType:
	fPts[0] = pts[0];
	fPts[1] = pts[1];
	fLength = (fPts[1] - fPts[0]).length();
	break;
	case SkSegType::kCubic_SegType:
	for (size_t i = 0; i < 4; i++) {
	fPts[i] = pts[i];
	}
	break;
	case SkSegType::kConic_SegType:
	for (size_t i = 0; i < 4; i++) {
	fPts[i] = pts[i];
	}
	break;
	default:
	UNIMPLEMENTED;
	break;
	}
	if (kLine_SegType != segType) {
	fIntegrator = ArcLengthIntegrator(fPts, fSegType);
	}
	}

	SkScalar SkCurveMeasure::getLength() {
	if (-1.0f == fLength) {
	fLength = fIntegrator.computeLength(1.0f);
	}
	return fLength;
	}

	// Given an arc length targetLength, we want to determine what t
	// gives us the corresponding arc length along the curve.
	// We do this by letting the arc length integral := f(t) and
	// solving for the root of the equation f(t) - targetLength = 0
	// using Newton's method and lerp-bisection.
	// The computationally expensive parts are the integral approximation
	// at each step, and computing the derivative of the arc length integral,
	// which is equal to the length of the tangent (so we have to do a sqrt).

	SkScalar SkCurveMeasure::getTime(SkScalar targetLength) {
	if (targetLength <= 0.0f) {
	return 0.0f;
	}

	SkScalar currentLength = getLength();

	if (targetLength > currentLength \|\| (SkScalarNearlyEqual(targetLength, currentLength))) {
	return 1.0f;
	}
	if (kLine_SegType == fSegType) {
	return targetLength / currentLength;
	}

	// initial estimate of t is percentage of total length
	SkScalar currentT = targetLength / currentLength;
	SkScalar prevT = -1.0f;
	SkScalar newT;

	SkScalar minT = 0.0f;
	SkScalar maxT = 1.0f;

	int iterations = 0;
	while (iterations < kNewtonIters + kBisectIters) {
	currentLength = fIntegrator.computeLength(currentT);
	SkScalar lengthDiff = currentLength - targetLength;

	// Update root bounds.
	// If lengthDiff is positive, we have overshot the target, so
	// we know the current t is an upper bound, and similarly
	// for the lower bound.
	if (lengthDiff > 0.0f) {
	if (currentT < maxT) {
	maxT = currentT;
	}
	} else {
	if (currentT > minT) {
	minT = currentT;
	}
	}

	// We have a tolerance on both the absolute value of the difference and
	// on the t value
	// because we may not have enough precision in the t to get close enough
	// in the length.
	if ((std::abs(lengthDiff) < kTolerance) \|\|
	(std::abs(prevT - currentT) < kTolerance)) {
	break;
	}

	prevT = currentT;
	if (iterations < kNewtonIters) {
	// This is just newton's formula.
	SkScalar dt = evaluateDerivative(fPts, fSegType, currentT).length();
	newT = currentT - (lengthDiff / dt);

	// If newT is out of bounds, bisect inside newton.
	if ((newT < 0.0f) \|\| (newT > 1.0f)) {
	newT = (minT + maxT) * 0.5f;
	}
	} else if (iterations < kNewtonIters + kBisectIters) {
	if (lengthDiff > 0.0f) {
	maxT = currentT;
	} else {
	minT = currentT;
	}
	// TODO(hstern) do a lerp here instead of a bisection
	newT = (minT + maxT) * 0.5f;
	} else {
	SkDEBUGF(("%.7f %.7f didn't get close enough after bisection.\n",
	currentT, currentLength));
	break;
	}
	currentT = newT;

	SkASSERT(minT <= maxT);

	iterations++;
	}

	// debug. is there an SKDEBUG or something for ifdefs?
	fIters = iterations;

	return currentT;
	}

	void SkCurveMeasure::getPosTanTime(SkScalar targetLength, SkPoint* pos,
	SkVector* tan, SkScalar* time) {
	SkScalar t = getTime(targetLength);

	if (time) {
	*time = t;
	}
	if (pos) {
	*pos = evaluate(fPts, fSegType, t);
	}
	if (tan) {
	*tan = evaluateDerivative(fPts, fSegType, t);
	}
	}