experimental/Intersection/LineCubicIntersection.cpp - skia - Git at Google

 /*
  * 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 "CubicUtilities.h"
 #include "Intersections.h"
 #include "LineUtilities.h"

 /*
 Find the interection of a line and cubic by solving for valid t values.

 Analogous to line-quadratic intersection, solve line-cubic intersection by
 representing the cubic as:
   x = a(1-t)^3 + 2b(1-t)^2t + c(1-t)t^2 + dt^3
   y = e(1-t)^3 + 2f(1-t)^2t + g(1-t)t^2 + ht^3
 and the line as:
   y = i*x + j  (if the line is more horizontal)
 or:
   x = i*y + j  (if the line is more vertical)

 Then using Mathematica, solve for the values of t where the cubic intersects the
 line:

   (in) Resultant[
         a*(1 - t)^3 + 3*b*(1 - t)^2*t + 3*c*(1 - t)*t^2 + d*t^3 - x,
         e*(1 - t)^3 + 3*f*(1 - t)^2*t + 3*g*(1 - t)*t^2 + h*t^3 - i*x - j, x]
   (out) -e     +   j     +
        3 e t   - 3 f t   -
        3 e t^2 + 6 f t^2 - 3 g t^2 +
          e t^3 - 3 f t^3 + 3 g t^3 - h t^3 +
      i ( a     -
        3 a t + 3 b t +
        3 a t^2 - 6 b t^2 + 3 c t^2 -
          a t^3 + 3 b t^3 - 3 c t^3 + d t^3 )

 if i goes to infinity, we can rewrite the line in terms of x. Mathematica:

   (in) Resultant[
         a*(1 - t)^3 + 3*b*(1 - t)^2*t + 3*c*(1 - t)*t^2 + d*t^3 - i*y - j,
         e*(1 - t)^3 + 3*f*(1 - t)^2*t + 3*g*(1 - t)*t^2 + h*t^3 - y,       y]
   (out)  a     -   j     -
        3 a t   + 3 b t   +
        3 a t^2 - 6 b t^2 + 3 c t^2 -
          a t^3 + 3 b t^3 - 3 c t^3 + d t^3 -
      i ( e     -
        3 e t   + 3 f t   +
        3 e t^2 - 6 f t^2 + 3 g t^2 -
          e t^3 + 3 f t^3 - 3 g t^3 + h t^3 )

 Solving this with Mathematica produces an expression with hundreds of terms;
 instead, use Numeric Solutions recipe to solve the cubic.

 The near-horizontal case, in terms of:  Ax^3 + Bx^2 + Cx + D == 0
     A =   (-(-e + 3*f - 3*g + h) + i*(-a + 3*b - 3*c + d)     )
     B = 3*(-( e - 2*f +   g    ) + i*( a - 2*b +   c    )     )
     C = 3*(-(-e +   f          ) + i*(-a +   b          )     )
     D =   (-( e                ) + i*( a                ) + j )

 The near-vertical case, in terms of:  Ax^3 + Bx^2 + Cx + D == 0
     A =   ( (-a + 3*b - 3*c + d) - i*(-e + 3*f - 3*g + h)     )
     B = 3*( ( a - 2*b +   c    ) - i*( e - 2*f +   g    )     )
     C = 3*( (-a +   b          ) - i*(-e +   f          )     )
     D =   ( ( a                ) - i*( e                ) - j )

 For horizontal lines:
 (in) Resultant[
       a*(1 - t)^3 + 3*b*(1 - t)^2*t + 3*c*(1 - t)*t^2 + d*t^3 - j,
       e*(1 - t)^3 + 3*f*(1 - t)^2*t + 3*g*(1 - t)*t^2 + h*t^3 - y, y]
 (out)  e     -   j     -
      3 e t   + 3 f t   +
      3 e t^2 - 6 f t^2 + 3 g t^2 -
        e t^3 + 3 f t^3 - 3 g t^3 + h t^3
 So the cubic coefficients are:

  */

 class LineCubicIntersections {
 public:

 LineCubicIntersections(const Cubic& c, const _Line& l, Intersections& i)
     : cubic(c)
     , line(l)
     , intersections(i) {
 }

 // see parallel routine in line quadratic intersections
 int intersectRay(double roots[3]) {
     double adj = line[1].x - line[0].x;
     double opp = line[1].y - line[0].y;
     Cubic r;
     for (int n = 0; n < 4; ++n) {
         r[n].x = (cubic[n].y - line[0].y) * adj - (cubic[n].x - line[0].x) * opp;
     }
     double A, B, C, D;
     coefficients(&r[0].x, A, B, C, D);
     return cubicRootsValidT(A, B, C, D, roots);
 }

 int intersect() {
     addEndPoints();
     double rootVals[3];
     int roots = intersectRay(rootVals);
     for (int index = 0; index < roots; ++index) {
         double cubicT = rootVals[index];
         double lineT = findLineT(cubicT);
         if (pinTs(cubicT, lineT)) {
             _Point pt;
             xy_at_t(line, lineT, pt.x, pt.y);
             intersections.insert(cubicT, lineT, pt);
         }
     }
     return intersections.fUsed;
 }

 int horizontalIntersect(double axisIntercept, double roots[3]) {
     double A, B, C, D;
     coefficients(&cubic[0].y, A, B, C, D);
     D -= axisIntercept;
     return cubicRootsValidT(A, B, C, D, roots);
 }

 int horizontalIntersect(double axisIntercept, double left, double right, bool flipped) {
     addHorizontalEndPoints(left, right, axisIntercept);
     double rootVals[3];
     int roots = horizontalIntersect(axisIntercept, rootVals);
     for (int index = 0; index < roots; ++index) {
         _Point pt;
         double cubicT = rootVals[index];
         xy_at_t(cubic, cubicT, pt.x, pt.y);
         double lineT = (pt.x - left) / (right - left);
         if (pinTs(cubicT, lineT)) {
             intersections.insert(cubicT, lineT, pt);
         }
     }
     if (flipped) {
         flip();
     }
     return intersections.fUsed;
 }

 int verticalIntersect(double axisIntercept, double roots[3]) {
     double A, B, C, D;
     coefficients(&cubic[0].x, A, B, C, D);
     D -= axisIntercept;
     return cubicRootsValidT(A, B, C, D, roots);
 }

 int verticalIntersect(double axisIntercept, double top, double bottom, bool flipped) {
     addVerticalEndPoints(top, bottom, axisIntercept);
     double rootVals[3];
     int roots = verticalIntersect(axisIntercept, rootVals);
     for (int index = 0; index < roots; ++index) {
         _Point pt;
         double cubicT = rootVals[index];
         xy_at_t(cubic, cubicT, pt.x, pt.y);
         double lineT = (pt.y - top) / (bottom - top);
         if (pinTs(cubicT, lineT)) {
             intersections.insert(cubicT, lineT, pt);
         }
     }
     if (flipped) {
         flip();
     }
     return intersections.fUsed;
 }

 protected:

 void addEndPoints()
 {
     for (int cIndex = 0; cIndex < 4; cIndex += 3) {
         for (int lIndex = 0; lIndex < 2; lIndex++) {
             if (cubic[cIndex] == line[lIndex]) {
                 intersections.insert(cIndex >> 1, lIndex, line[lIndex]);
             }
         }
     }
 }

 void addHorizontalEndPoints(double left, double right, double y)
 {
     for (int cIndex = 0; cIndex < 4; cIndex += 3) {
         if (cubic[cIndex].y != y) {
             continue;
         }
         if (cubic[cIndex].x == left) {
             intersections.insert(cIndex >> 1, 0, cubic[cIndex]);
         }
         if (cubic[cIndex].x == right) {
             intersections.insert(cIndex >> 1, 1, cubic[cIndex]);
         }
     }
 }

 void addVerticalEndPoints(double top, double bottom, double x)
 {
     for (int cIndex = 0; cIndex < 4; cIndex += 3) {
         if (cubic[cIndex].x != x) {
             continue;
         }
         if (cubic[cIndex].y == top) {
             intersections.insert(cIndex >> 1, 0, cubic[cIndex]);
         }
         if (cubic[cIndex].y == bottom) {
             intersections.insert(cIndex >> 1, 1, cubic[cIndex]);
         }
     }
 }

 double findLineT(double t) {
     double x, y;
     xy_at_t(cubic, t, x, y);
     double dx = line[1].x - line[0].x;
     double dy = line[1].y - line[0].y;
     if (fabs(dx) > fabs(dy)) {
         return (x - line[0].x) / dx;
     }
     return (y - line[0].y) / dy;
 }

 void flip() {
     // OPTIMIZATION: instead of swapping, pass original line, use [1].y - [0].y
     int roots = intersections.fUsed;
     for (int index = 0; index < roots; ++index) {
         intersections.fT[1][index] = 1 - intersections.fT[1][index];
     }
 }

 static bool pinTs(double& cubicT, double& lineT) {
     if (!approximately_one_or_less(lineT)) {
         return false;
     }
     if (!approximately_zero_or_more(lineT)) {
         return false;
     }
     if (precisely_less_than_zero(cubicT)) {
         cubicT = 0;
     } else if (precisely_greater_than_one(cubicT)) {
         cubicT = 1;
     }
     if (precisely_less_than_zero(lineT)) {
         lineT = 0;
     } else if (precisely_greater_than_one(lineT)) {
         lineT = 1;
     }
     return true;
 }

 private:

 const Cubic& cubic;
 const _Line& line;
 Intersections& intersections;
 };

 int horizontalIntersect(const Cubic& cubic, double left, double right, double y,
         double tRange[3]) {
     LineCubicIntersections c(cubic, *((_Line*) 0), *((Intersections*) 0));
     double rootVals[3];
     int result = c.horizontalIntersect(y, rootVals);
     int tCount = 0;
     for (int index = 0; index < result; ++index) {
         double x, y;
         xy_at_t(cubic, rootVals[index], x, y);
         if (x < left || x > right) {
             continue;
         }
         tRange[tCount++] = rootVals[index];
     }
     return result;
 }

 int horizontalIntersect(const Cubic& cubic, double left, double right, double y,
         bool flipped, Intersections& intersections) {
     LineCubicIntersections c(cubic, *((_Line*) 0), intersections);
     return c.horizontalIntersect(y, left, right, flipped);
 }

 int verticalIntersect(const Cubic& cubic, double top, double bottom, double x,
         bool flipped, Intersections& intersections) {
     LineCubicIntersections c(cubic, *((_Line*) 0), intersections);
     return c.verticalIntersect(x, top, bottom, flipped);
 }

 int intersect(const Cubic& cubic, const _Line& line, Intersections& i) {
     LineCubicIntersections c(cubic, line, i);
     return c.intersect();
 }

 int intersectRay(const Cubic& cubic, const _Line& line, Intersections& i) {
     LineCubicIntersections c(cubic, line, i);
     return c.intersectRay(i.fT[0]);
 }
	/*
	* 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 "CubicUtilities.h"
	#include "Intersections.h"
	#include "LineUtilities.h"

	/*
	Find the interection of a line and cubic by solving for valid t values.

	Analogous to line-quadratic intersection, solve line-cubic intersection by
	representing the cubic as:
	x = a(1-t)^3 + 2b(1-t)^2t + c(1-t)t^2 + dt^3
	y = e(1-t)^3 + 2f(1-t)^2t + g(1-t)t^2 + ht^3
	and the line as:
	y = i*x + j (if the line is more horizontal)
	or:
	x = i*y + j (if the line is more vertical)

	Then using Mathematica, solve for the values of t where the cubic intersects the
	line:

	(in) Resultant[
	a(1 - t)^3 + 3b(1 - t)^2t + 3c(1 - t)t^2 + dt^3 - x,
	e(1 - t)^3 + 3f(1 - t)^2t + 3g(1 - t)t^2 + ht^3 - i*x - j, x]
	(out) -e + j +
	3 e t - 3 f t -
	3 e t^2 + 6 f t^2 - 3 g t^2 +
	e t^3 - 3 f t^3 + 3 g t^3 - h t^3 +
	i ( a -
	3 a t + 3 b t +
	3 a t^2 - 6 b t^2 + 3 c t^2 -
	a t^3 + 3 b t^3 - 3 c t^3 + d t^3 )

	if i goes to infinity, we can rewrite the line in terms of x. Mathematica:

	(in) Resultant[
	a(1 - t)^3 + 3b(1 - t)^2t + 3c(1 - t)t^2 + dt^3 - i*y - j,
	e(1 - t)^3 + 3f(1 - t)^2t + 3g(1 - t)t^2 + ht^3 - y, y]
	(out) a - j -
	3 a t + 3 b t +
	3 a t^2 - 6 b t^2 + 3 c t^2 -
	a t^3 + 3 b t^3 - 3 c t^3 + d t^3 -
	i ( e -
	3 e t + 3 f t +
	3 e t^2 - 6 f t^2 + 3 g t^2 -
	e t^3 + 3 f t^3 - 3 g t^3 + h t^3 )

	Solving this with Mathematica produces an expression with hundreds of terms;
	instead, use Numeric Solutions recipe to solve the cubic.

	The near-horizontal case, in terms of: Ax^3 + Bx^2 + Cx + D == 0
	A = (-(-e + 3f - 3g + h) + i(-a + 3b - 3*c + d) )
	B = 3(-( e - 2f + g ) + i( a - 2b + c ) )
	C = 3(-(-e + f ) + i(-a + b ) )
	D = (-( e ) + i*( a ) + j )

	The near-vertical case, in terms of: Ax^3 + Bx^2 + Cx + D == 0
	A = ( (-a + 3b - 3c + d) - i(-e + 3f - 3*g + h) )
	B = 3( ( a - 2b + c ) - i( e - 2f + g ) )
	C = 3( (-a + b ) - i(-e + f ) )
	D = ( ( a ) - i*( e ) - j )

	For horizontal lines:
	(in) Resultant[
	a(1 - t)^3 + 3b(1 - t)^2t + 3c(1 - t)t^2 + dt^3 - j,
	e(1 - t)^3 + 3f(1 - t)^2t + 3g(1 - t)t^2 + ht^3 - y, y]
	(out) e - j -
	3 e t + 3 f t +
	3 e t^2 - 6 f t^2 + 3 g t^2 -
	e t^3 + 3 f t^3 - 3 g t^3 + h t^3
	So the cubic coefficients are:

	*/

	class LineCubicIntersections {
	public:

	LineCubicIntersections(const Cubic& c, const _Line& l, Intersections& i)
	: cubic(c)
	, line(l)
	, intersections(i) {
	}

	// see parallel routine in line quadratic intersections
	int intersectRay(double roots[3]) {
	double adj = line[1].x - line[0].x;
	double opp = line[1].y - line[0].y;
	Cubic r;
	for (int n = 0; n < 4; ++n) {
	r[n].x = (cubic[n].y - line[0].y) * adj - (cubic[n].x - line[0].x) * opp;
	}
	double A, B, C, D;
	coefficients(&r[0].x, A, B, C, D);
	return cubicRootsValidT(A, B, C, D, roots);
	}

	int intersect() {
	addEndPoints();
	double rootVals[3];
	int roots = intersectRay(rootVals);
	for (int index = 0; index < roots; ++index) {
	double cubicT = rootVals[index];
	double lineT = findLineT(cubicT);
	if (pinTs(cubicT, lineT)) {
	_Point pt;
	xy_at_t(line, lineT, pt.x, pt.y);
	intersections.insert(cubicT, lineT, pt);
	}
	}
	return intersections.fUsed;
	}

	int horizontalIntersect(double axisIntercept, double roots[3]) {
	double A, B, C, D;
	coefficients(&cubic[0].y, A, B, C, D);
	D -= axisIntercept;
	return cubicRootsValidT(A, B, C, D, roots);
	}

	int horizontalIntersect(double axisIntercept, double left, double right, bool flipped) {
	addHorizontalEndPoints(left, right, axisIntercept);
	double rootVals[3];
	int roots = horizontalIntersect(axisIntercept, rootVals);
	for (int index = 0; index < roots; ++index) {
	_Point pt;
	double cubicT = rootVals[index];
	xy_at_t(cubic, cubicT, pt.x, pt.y);
	double lineT = (pt.x - left) / (right - left);
	if (pinTs(cubicT, lineT)) {
	intersections.insert(cubicT, lineT, pt);
	}
	}
	if (flipped) {
	flip();
	}
	return intersections.fUsed;
	}

	int verticalIntersect(double axisIntercept, double roots[3]) {
	double A, B, C, D;
	coefficients(&cubic[0].x, A, B, C, D);
	D -= axisIntercept;
	return cubicRootsValidT(A, B, C, D, roots);
	}

	int verticalIntersect(double axisIntercept, double top, double bottom, bool flipped) {
	addVerticalEndPoints(top, bottom, axisIntercept);
	double rootVals[3];
	int roots = verticalIntersect(axisIntercept, rootVals);
	for (int index = 0; index < roots; ++index) {
	_Point pt;
	double cubicT = rootVals[index];
	xy_at_t(cubic, cubicT, pt.x, pt.y);
	double lineT = (pt.y - top) / (bottom - top);
	if (pinTs(cubicT, lineT)) {
	intersections.insert(cubicT, lineT, pt);
	}
	}
	if (flipped) {
	flip();
	}
	return intersections.fUsed;
	}

	protected:

	void addEndPoints()
	{
	for (int cIndex = 0; cIndex < 4; cIndex += 3) {
	for (int lIndex = 0; lIndex < 2; lIndex++) {
	if (cubic[cIndex] == line[lIndex]) {
	intersections.insert(cIndex >> 1, lIndex, line[lIndex]);
	}
	}
	}
	}

	void addHorizontalEndPoints(double left, double right, double y)
	{
	for (int cIndex = 0; cIndex < 4; cIndex += 3) {
	if (cubic[cIndex].y != y) {
	continue;
	}
	if (cubic[cIndex].x == left) {
	intersections.insert(cIndex >> 1, 0, cubic[cIndex]);
	}
	if (cubic[cIndex].x == right) {
	intersections.insert(cIndex >> 1, 1, cubic[cIndex]);
	}
	}
	}

	void addVerticalEndPoints(double top, double bottom, double x)
	{
	for (int cIndex = 0; cIndex < 4; cIndex += 3) {
	if (cubic[cIndex].x != x) {
	continue;
	}
	if (cubic[cIndex].y == top) {
	intersections.insert(cIndex >> 1, 0, cubic[cIndex]);
	}
	if (cubic[cIndex].y == bottom) {
	intersections.insert(cIndex >> 1, 1, cubic[cIndex]);
	}
	}
	}

	double findLineT(double t) {
	double x, y;
	xy_at_t(cubic, t, x, y);
	double dx = line[1].x - line[0].x;
	double dy = line[1].y - line[0].y;
	if (fabs(dx) > fabs(dy)) {
	return (x - line[0].x) / dx;
	}
	return (y - line[0].y) / dy;
	}

	void flip() {
	// OPTIMIZATION: instead of swapping, pass original line, use [1].y - [0].y
	int roots = intersections.fUsed;
	for (int index = 0; index < roots; ++index) {
	intersections.fT[1][index] = 1 - intersections.fT[1][index];
	}
	}

	static bool pinTs(double& cubicT, double& lineT) {
	if (!approximately_one_or_less(lineT)) {
	return false;
	}
	if (!approximately_zero_or_more(lineT)) {
	return false;
	}
	if (precisely_less_than_zero(cubicT)) {
	cubicT = 0;
	} else if (precisely_greater_than_one(cubicT)) {
	cubicT = 1;
	}
	if (precisely_less_than_zero(lineT)) {
	lineT = 0;
	} else if (precisely_greater_than_one(lineT)) {
	lineT = 1;
	}
	return true;
	}

	private:

	const Cubic& cubic;
	const _Line& line;
	Intersections& intersections;
	};

	int horizontalIntersect(const Cubic& cubic, double left, double right, double y,
	double tRange[3]) {
	LineCubicIntersections c(cubic, ((_Line) 0), ((Intersections) 0));
	double rootVals[3];
	int result = c.horizontalIntersect(y, rootVals);
	int tCount = 0;
	for (int index = 0; index < result; ++index) {
	double x, y;
	xy_at_t(cubic, rootVals[index], x, y);
	if (x < left \|\| x > right) {
	continue;
	}
	tRange[tCount++] = rootVals[index];
	}
	return result;
	}

	int horizontalIntersect(const Cubic& cubic, double left, double right, double y,
	bool flipped, Intersections& intersections) {
	LineCubicIntersections c(cubic, ((_Line) 0), intersections);
	return c.horizontalIntersect(y, left, right, flipped);
	}

	int verticalIntersect(const Cubic& cubic, double top, double bottom, double x,
	bool flipped, Intersections& intersections) {
	LineCubicIntersections c(cubic, ((_Line) 0), intersections);
	return c.verticalIntersect(x, top, bottom, flipped);
	}

	int intersect(const Cubic& cubic, const _Line& line, Intersections& i) {
	LineCubicIntersections c(cubic, line, i);
	return c.intersect();
	}

	int intersectRay(const Cubic& cubic, const _Line& line, Intersections& i) {
	LineCubicIntersections c(cubic, line, i);
	return c.intersectRay(i.fT[0]);
	}