experimental/Intersection/LineUtilities.cpp - platform/external/skia - Gitiles

 /*
  * Copyright 2012 Google Inc.
  *
  * Use of this source code is governed by a BSD-style license that can be
  * found in the LICENSE file.
  */
 #include "CurveIntersection.h"
 #include "LineUtilities.h"

 bool implicitLine(const _Line& line, double& slope, double& axisIntercept) {
     _Point delta;
     tangent(line, delta);
     bool moreHorizontal = fabs(delta.x) > fabs(delta.y);
     if (moreHorizontal) {
         slope = delta.y / delta.x;
         axisIntercept = line[0].y - slope * line[0].x;
     } else {
         slope = delta.x / delta.y;
         axisIntercept = line[0].x - slope * line[0].y;
     }
     return moreHorizontal;
 }

 int reduceOrder(const _Line& line, _Line& reduced) {
     reduced[0] = line[0];
     int different = line[0] != line[1];
     reduced[1] = line[different];
     return 1 + different;
 }

 void sub_divide(const _Line& line, double t1, double t2, _Line& dst) {
     _Point delta;
     tangent(line, delta);
     dst[0].x = line[0].x - t1 * delta.x;
     dst[0].y = line[0].y - t1 * delta.y;
     dst[1].x = line[0].x - t2 * delta.x;
     dst[1].y = line[0].y - t2 * delta.y;
 }

 // may have this below somewhere else already:
 // copying here because I thought it was clever

 // Copyright 2001, softSurfer (www.softsurfer.com)
 // This code may be freely used and modified for any purpose
 // providing that this copyright notice is included with it.
 // SoftSurfer makes no warranty for this code, and cannot be held
 // liable for any real or imagined damage resulting from its use.
 // Users of this code must verify correctness for their application.

 // Assume that a class is already given for the object:
 //    Point with coordinates {float x, y;}
 //===================================================================

 // isLeft(): tests if a point is Left|On|Right of an infinite line.
 //    Input:  three points P0, P1, and P2
 //    Return: >0 for P2 left of the line through P0 and P1
 //            =0 for P2 on the line
 //            <0 for P2 right of the line
 //    See: the January 2001 Algorithm on Area of Triangles
 //    return (float) ((P1.x - P0.x)*(P2.y - P0.y) - (P2.x - P0.x)*(P1.y - P0.y));
 double is_left(const _Line& line, const _Point& pt) {
     _Vector P0 = line[1] - line[0];
     _Vector P2 = pt - line[0];
     return P0.cross(P2);
 }

 double t_at(const _Line& line, const _Point& pt) {
     double dx = line[1].x - line[0].x;
     double dy = line[1].y - line[0].y;
     if (fabs(dx) > fabs(dy)) {
         if (approximately_zero(dx)) {
             return 0;
         }
         return (pt.x - line[0].x) / dx;
     }
     if (approximately_zero(dy)) {
         return 0;
     }
     return (pt.y - line[0].y) / dy;
 }

 static void setMinMax(double x, int flags, double& minX, double& maxX) {
     if (minX > x && (flags & (kFindTopMin | kFindBottomMin))) {
         minX = x;
     }
     if (maxX < x && (flags & (kFindTopMax | kFindBottomMax))) {
         maxX = x;
     }
 }

 void x_at(const _Point& p1, const _Point& p2, double top, double bottom,
         int flags, double& minX, double& maxX) {
     if (AlmostEqualUlps(p1.y, p2.y)) {
         // It should be OK to bail early in this case. There's another edge
         // which shares this end point which can intersect without failing to
         // have a slope ... maybe
         return;
     }

     // p2.x is always greater than p1.x -- the part of points (p1, p2) are
     // moving from the start of the cubic towards its end.
     // if p1.y < p2.y, minX can be affected
     // if p1.y > p2.y, maxX can be affected
     double slope = (p2.x - p1.x) / (p2.y - p1.y);
     int topFlags = flags & (kFindTopMin | kFindTopMax);
     if (topFlags && ((top <= p1.y && top >= p2.y)
             || (top >= p1.y && top <= p2.y))) {
         double x = p1.x + (top - p1.y) * slope;
         setMinMax(x, topFlags, minX, maxX);
     }
     int bottomFlags = flags & (kFindBottomMin | kFindBottomMax);
     if (bottomFlags && ((bottom <= p1.y && bottom >= p2.y)
             || (bottom >= p1.y && bottom <= p2.y))) {
         double x = p1.x + (bottom - p1.y) * slope;
         setMinMax(x, bottomFlags, minX, maxX);
     }
 }

 void xy_at_t(const _Line& line, double t, double& x, double& y) {
     double one_t = 1 - t;
     if (&x) {
         x = one_t * line[0].x + t * line[1].x;
     }
     if (&y) {
         y = one_t * line[0].y + t * line[1].y;
     }
 }

 _Point xy_at_t(const _Line& line, double t) {
     double one_t = 1 - t;
     _Point result = { one_t * line[0].x + t * line[1].x, one_t * line[0].y + t * line[1].y };
     return result;
 }
	/*
	* Copyright 2012 Google Inc.
	*
	* Use of this source code is governed by a BSD-style license that can be
	* found in the LICENSE file.
	*/
	#include "CurveIntersection.h"
	#include "LineUtilities.h"

	bool implicitLine(const _Line& line, double& slope, double& axisIntercept) {
	_Point delta;
	tangent(line, delta);
	bool moreHorizontal = fabs(delta.x) > fabs(delta.y);
	if (moreHorizontal) {
	slope = delta.y / delta.x;
	axisIntercept = line[0].y - slope * line[0].x;
	} else {
	slope = delta.x / delta.y;
	axisIntercept = line[0].x - slope * line[0].y;
	}
	return moreHorizontal;
	}

	int reduceOrder(const _Line& line, _Line& reduced) {
	reduced[0] = line[0];
	int different = line[0] != line[1];
	reduced[1] = line[different];
	return 1 + different;
	}

	void sub_divide(const _Line& line, double t1, double t2, _Line& dst) {
	_Point delta;
	tangent(line, delta);
	dst[0].x = line[0].x - t1 * delta.x;
	dst[0].y = line[0].y - t1 * delta.y;
	dst[1].x = line[0].x - t2 * delta.x;
	dst[1].y = line[0].y - t2 * delta.y;
	}

	// may have this below somewhere else already:
	// copying here because I thought it was clever

	// Copyright 2001, softSurfer (www.softsurfer.com)
	// This code may be freely used and modified for any purpose
	// providing that this copyright notice is included with it.
	// SoftSurfer makes no warranty for this code, and cannot be held
	// liable for any real or imagined damage resulting from its use.
	// Users of this code must verify correctness for their application.

	// Assume that a class is already given for the object:
	// Point with coordinates {float x, y;}
	//===================================================================

	// isLeft(): tests if a point is Left\|On\|Right of an infinite line.
	// Input: three points P0, P1, and P2
	// Return: >0 for P2 left of the line through P0 and P1
	// =0 for P2 on the line
	// <0 for P2 right of the line
	// See: the January 2001 Algorithm on Area of Triangles
	// return (float) ((P1.x - P0.x)(P2.y - P0.y) - (P2.x - P0.x)(P1.y - P0.y));
	double is_left(const _Line& line, const _Point& pt) {
	_Vector P0 = line[1] - line[0];
	_Vector P2 = pt - line[0];
	return P0.cross(P2);
	}

	double t_at(const _Line& line, const _Point& pt) {
	double dx = line[1].x - line[0].x;
	double dy = line[1].y - line[0].y;
	if (fabs(dx) > fabs(dy)) {
	if (approximately_zero(dx)) {
	return 0;
	}
	return (pt.x - line[0].x) / dx;
	}
	if (approximately_zero(dy)) {
	return 0;
	}
	return (pt.y - line[0].y) / dy;
	}

	static void setMinMax(double x, int flags, double& minX, double& maxX) {
	if (minX > x && (flags & (kFindTopMin \| kFindBottomMin))) {
	minX = x;
	}
	if (maxX < x && (flags & (kFindTopMax \| kFindBottomMax))) {
	maxX = x;
	}
	}

	void x_at(const _Point& p1, const _Point& p2, double top, double bottom,
	int flags, double& minX, double& maxX) {
	if (AlmostEqualUlps(p1.y, p2.y)) {
	// It should be OK to bail early in this case. There's another edge
	// which shares this end point which can intersect without failing to
	// have a slope ... maybe
	return;
	}

	// p2.x is always greater than p1.x -- the part of points (p1, p2) are
	// moving from the start of the cubic towards its end.
	// if p1.y < p2.y, minX can be affected
	// if p1.y > p2.y, maxX can be affected
	double slope = (p2.x - p1.x) / (p2.y - p1.y);
	int topFlags = flags & (kFindTopMin \| kFindTopMax);
	if (topFlags && ((top <= p1.y && top >= p2.y)
	\|\| (top >= p1.y && top <= p2.y))) {
	double x = p1.x + (top - p1.y) * slope;
	setMinMax(x, topFlags, minX, maxX);
	}
	int bottomFlags = flags & (kFindBottomMin \| kFindBottomMax);
	if (bottomFlags && ((bottom <= p1.y && bottom >= p2.y)
	\|\| (bottom >= p1.y && bottom <= p2.y))) {
	double x = p1.x + (bottom - p1.y) * slope;
	setMinMax(x, bottomFlags, minX, maxX);
	}
	}

	void xy_at_t(const _Line& line, double t, double& x, double& y) {
	double one_t = 1 - t;
	if (&x) {
	x = one_t * line[0].x + t * line[1].x;
	}
	if (&y) {
	y = one_t * line[0].y + t * line[1].y;
	}
	}

	_Point xy_at_t(const _Line& line, double t) {
	double one_t = 1 - t;
	_Point result = { one_t * line[0].x + t * line[1].x, one_t * line[0].y + t * line[1].y };
	return result;
	}