skia2/experimental/Intersection/CubicSubDivide.cpp
caryclark@google.com 9e49fb63d3 shape ops work in progress
add copyrights everywhere
start working on quadratic line segments (for quad intersection)

git-svn-id: http://skia.googlecode.com/svn/trunk@5286 2bbb7eff-a529-9590-31e7-b0007b416f81
2012-08-27 14:11:33 +00:00

110 lines
3.6 KiB
C++

/*
* 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 "IntersectionUtilities.h"
/*
Given a cubic c, t1, and t2, find a small cubic segment.
The new cubic is defined as points A, B, C, and D, where
s1 = 1 - t1
s2 = 1 - t2
A = c[0]*s1*s1*s1 + 3*c[1]*s1*s1*t1 + 3*c[2]*s1*t1*t1 + c[3]*t1*t1*t1
D = c[0]*s2*s2*s2 + 3*c[1]*s2*s2*t2 + 3*c[2]*s2*t2*t2 + c[3]*t2*t2*t2
We don't have B or C. So We define two equations to isolate them.
First, compute two reference T values 1/3 and 2/3 from t1 to t2:
c(at (2*t1 + t2)/3) == E
c(at (t1 + 2*t2)/3) == F
Next, compute where those values must be if we know the values of B and C:
_12 = A*2/3 + B*1/3
12_ = A*1/3 + B*2/3
_23 = B*2/3 + C*1/3
23_ = B*1/3 + C*2/3
_34 = C*2/3 + D*1/3
34_ = C*1/3 + D*2/3
_123 = (A*2/3 + B*1/3)*2/3 + (B*2/3 + C*1/3)*1/3 = A*4/9 + B*4/9 + C*1/9
123_ = (A*1/3 + B*2/3)*1/3 + (B*1/3 + C*2/3)*2/3 = A*1/9 + B*4/9 + C*4/9
_234 = (B*2/3 + C*1/3)*2/3 + (C*2/3 + D*1/3)*1/3 = B*4/9 + C*4/9 + D*1/9
234_ = (B*1/3 + C*2/3)*1/3 + (C*1/3 + D*2/3)*2/3 = B*1/9 + C*4/9 + D*4/9
_1234 = (A*4/9 + B*4/9 + C*1/9)*2/3 + (B*4/9 + C*4/9 + D*1/9)*1/3
= A*8/27 + B*12/27 + C*6/27 + D*1/27
= E
1234_ = (A*1/9 + B*4/9 + C*4/9)*1/3 + (B*1/9 + C*4/9 + D*4/9)*2/3
= A*1/27 + B*6/27 + C*12/27 + D*8/27
= F
E*27 = A*8 + B*12 + C*6 + D
F*27 = A + B*6 + C*12 + D*8
Group the known values on one side:
M = E*27 - A*8 - D = B*12 + C* 6
N = F*27 - A - D*8 = B* 6 + C*12
M*2 - N = B*18
N*2 - M = C*18
B = (M*2 - N)/18
C = (N*2 - M)/18
*/
static double interp_cubic_coords(const double* src, double t)
{
double ab = interp(src[0], src[2], t);
double bc = interp(src[2], src[4], t);
double cd = interp(src[4], src[6], t);
double abc = interp(ab, bc, t);
double bcd = interp(bc, cd, t);
double abcd = interp(abc, bcd, t);
return abcd;
}
void sub_divide(const Cubic& src, double t1, double t2, Cubic& dst) {
double ax = dst[0].x = interp_cubic_coords(&src[0].x, t1);
double ay = dst[0].y = interp_cubic_coords(&src[0].y, t1);
double ex = interp_cubic_coords(&src[0].x, (t1*2+t2)/3);
double ey = interp_cubic_coords(&src[0].y, (t1*2+t2)/3);
double fx = interp_cubic_coords(&src[0].x, (t1+t2*2)/3);
double fy = interp_cubic_coords(&src[0].y, (t1+t2*2)/3);
double dx = dst[3].x = interp_cubic_coords(&src[0].x, t2);
double dy = dst[3].y = interp_cubic_coords(&src[0].y, t2);
double mx = ex * 27 - ax * 8 - dx;
double my = ey * 27 - ay * 8 - dy;
double nx = fx * 27 - ax - dx * 8;
double ny = fy * 27 - ay - dy * 8;
/* bx = */ dst[1].x = (mx * 2 - nx) / 18;
/* by = */ dst[1].y = (my * 2 - ny) / 18;
/* cx = */ dst[2].x = (nx * 2 - mx) / 18;
/* cy = */ dst[2].y = (ny * 2 - my) / 18;
}
/* classic one t subdivision */
static void interp_cubic_coords(const double* src, double* dst, double t)
{
double ab = interp(src[0], src[2], t);
double bc = interp(src[2], src[4], t);
double cd = interp(src[4], src[6], t);
double abc = interp(ab, bc, t);
double bcd = interp(bc, cd, t);
double abcd = interp(abc, bcd, t);
dst[0] = src[0];
dst[2] = ab;
dst[4] = abc;
dst[6] = abcd;
dst[8] = bcd;
dst[10] = cd;
dst[12] = src[6];
}
void chop_at(const Cubic& src, CubicPair& dst, double t)
{
interp_cubic_coords(&src[0].x, &dst.pts[0].x, t);
interp_cubic_coords(&src[0].y, &dst.pts[0].y, t);
}