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/*************************************************************************
* Copyright (C) 2009-2010 Tavian Barnes <tavianator@gmail.com> *
* *
* This file is part of The Dimension Library. *
* *
* The Dimension Library is free software; you can redistribute it and/ *
* or modify it under the terms of the GNU Lesser General Public License *
* as published by the Free Software Foundation; either version 3 of the *
* License, or (at your option) any later version. *
* *
* The Dimension Library is distributed in the hope that it will be *
* useful, but WITHOUT ANY WARRANTY; without even the implied warranty *
* of MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU *
* Lesser General Public License for more details. *
* *
* You should have received a copy of the GNU Lesser General Public *
* License along with this program. If not, see *
* <http://www.gnu.org/licenses/>. *
*************************************************************************/
#include "dimension.h"
#include <math.h>
/* Identity matrix */
dmnsn_matrix
dmnsn_identity_matrix()
{
return dmnsn_new_matrix(1.0, 0.0, 0.0, 0.0,
0.0, 1.0, 0.0, 0.0,
0.0, 0.0, 1.0, 0.0,
0.0, 0.0, 0.0, 1.0);
}
/* Scaling matrix */
dmnsn_matrix
dmnsn_scale_matrix(dmnsn_vector s)
{
return dmnsn_new_matrix(s.x, 0.0, 0.0, 0.0,
0.0, s.y, 0.0, 0.0,
0.0, 0.0, s.z, 0.0,
0.0, 0.0, 0.0, 1.0);
}
/* Translation matrix */
dmnsn_matrix
dmnsn_translation_matrix(dmnsn_vector d)
{
return dmnsn_new_matrix(1.0, 0.0, 0.0, d.x,
0.0, 1.0, 0.0, d.y,
0.0, 0.0, 1.0, d.z,
0.0, 0.0, 0.0, 1.0);
}
/* Left-handed rotation matrix; theta/|theta| = axis, |theta| = angle */
dmnsn_matrix
dmnsn_rotation_matrix(dmnsn_vector theta)
{
/* Two trig calls, 25 multiplications, 13 additions */
double angle = dmnsn_vector_norm(theta);
if (angle == 0.0) {
return dmnsn_identity_matrix();
}
dmnsn_vector axis = dmnsn_vector_div(theta, angle);
/* Shorthand to make dmnsn_new_matrix() call legible */
double s = sin(angle);
double t = 1.0 - cos(angle);
double x = axis.x;
double y = axis.y;
double z = axis.z;
return dmnsn_new_matrix(
1.0 + t*(x*x - 1.0), -z*s + t*x*y, y*s + t*x*z, 0.0,
z*s + t*x*y, 1.0 + t*(y*y - 1.0), -x*s + t*y*z, 0.0,
-y*s + t*x*z, x*s + t*y*z, 1.0 + t*(z*z - 1.0), 0.0,
0.0, 0.0, 0.0, 1.0
);
}
/* Find the angle between two vectors with respect to an axis */
double
dmnsn_vector_axis_angle(dmnsn_vector v1, dmnsn_vector v2, dmnsn_vector axis)
{
dmnsn_vector d = dmnsn_vector_sub(v1, v2);
dmnsn_vector proj = dmnsn_vector_add(dmnsn_vector_proj(d, axis), v2);
double projn = dmnsn_vector_norm(proj);
if (!projn)
return 0.0;
double c = dmnsn_vector_dot(dmnsn_vector_normalize(v1),
dmnsn_vector_div(proj, projn));
double angle = acos(c);
if (dmnsn_vector_dot(dmnsn_vector_cross(v1, proj), axis) > 0) {
return angle;
} else {
return -angle;
}
}
/* Matrix inversion helper functions */
typedef struct { double n[2][2]; } dmnsn_matrix2;
static dmnsn_matrix2 dmnsn_new_matrix2(double a1, double a2,
double b1, double b2);
static dmnsn_matrix2 dmnsn_matrix2_inverse(dmnsn_matrix2 A);
static dmnsn_matrix2 dmnsn_matrix2_negate(dmnsn_matrix2 A);
static dmnsn_matrix2 dmnsn_matrix2_sub(dmnsn_matrix2 lhs, dmnsn_matrix2 rhs);
static dmnsn_matrix2 dmnsn_matrix2_mul(dmnsn_matrix2 lhs, dmnsn_matrix2 rhs);
static dmnsn_matrix dmnsn_matrix_inverse_generic(dmnsn_matrix A);
static double dmnsn_matrix_cofactor(dmnsn_matrix A,
unsigned int row, unsigned int col);
/* Invert a matrix, by partitioning */
dmnsn_matrix
dmnsn_matrix_inverse(dmnsn_matrix A)
{
/*
* Use partitioning to invert a matrix:
*
* ( P Q ) -1
* ( R S )
*
* = ( PP QQ )
* ( RR SS ),
*
* with PP = inv(P) - inv(P)*Q*RR,
* QQ = -inv(P)*Q*SS,
* RR = -SS*R*inv(P), and
* SS = inv(S - R*inv(P)*Q).
*/
/* The algorithm uses 2 inversions, 6 multiplications, and 2 subtractions,
giving 52 multiplications, 34 additions, and 8 divisions. */
dmnsn_matrix2 P, Q, R, S, Pi, RPi, PiQ, RPiQ, PP, QQ, RR, SS;
double Pdet = A.n[0][0]*A.n[1][1] - A.n[0][1]*A.n[1][0];
if (fabs(Pdet) < dmnsn_epsilon) {
/* If P is close to singular, try a more generic algorithm; this is very
* unlikely, but not impossible, eg.
* [ 1 1 0 0 ]
* [ 1 1 1 0 ]
* [ 0 1 1 0 ]
* [ 0 0 0 1 ]
*/
return dmnsn_matrix_inverse_generic(A);
}
/* Partition the matrix */
P = dmnsn_new_matrix2(A.n[0][0], A.n[0][1],
A.n[1][0], A.n[1][1]);
Q = dmnsn_new_matrix2(A.n[0][2], A.n[0][3],
A.n[1][2], A.n[1][3]);
R = dmnsn_new_matrix2(A.n[2][0], A.n[2][1],
A.n[3][0], A.n[3][1]);
S = dmnsn_new_matrix2(A.n[2][2], A.n[2][3],
A.n[3][2], A.n[3][3]);
/* Do this inversion ourselves, since we already have the determinant */
Pi = dmnsn_new_matrix2( P.n[1][1]/Pdet, -P.n[0][1]/Pdet,
-P.n[1][0]/Pdet, P.n[0][0]/Pdet);
/* Calculate R*inv(P), inv(P)*Q, and R*inv(P)*Q */
RPi = dmnsn_matrix2_mul(R, Pi);
PiQ = dmnsn_matrix2_mul(Pi, Q);
RPiQ = dmnsn_matrix2_mul(R, PiQ);
/* Calculate the partitioned inverse */
SS = dmnsn_matrix2_inverse(dmnsn_matrix2_sub(S, RPiQ));
RR = dmnsn_matrix2_negate(dmnsn_matrix2_mul(SS, RPi));
QQ = dmnsn_matrix2_negate(dmnsn_matrix2_mul(PiQ, SS));
PP = dmnsn_matrix2_sub(Pi, dmnsn_matrix2_mul(PiQ, RR));
/* Reconstruct the matrix */
return dmnsn_new_matrix(PP.n[0][0], PP.n[0][1], QQ.n[0][0], QQ.n[0][1],
PP.n[1][0], PP.n[1][1], QQ.n[1][0], QQ.n[1][1],
RR.n[0][0], RR.n[0][1], SS.n[0][0], SS.n[0][1],
RR.n[1][0], RR.n[1][1], SS.n[1][0], SS.n[1][1]);
}
/* For nice shorthand */
static dmnsn_matrix2
dmnsn_new_matrix2(double a1, double a2, double b1, double b2)
{
dmnsn_matrix2 m = { { { a1, a2 },
{ b1, b2 } } };
return m;
}
/* Invert a 2x2 matrix */
static dmnsn_matrix2
dmnsn_matrix2_inverse(dmnsn_matrix2 A)
{
/* 4 divisions, 2 multiplications, 1 addition */
double det = A.n[0][0]*A.n[1][1] - A.n[0][1]*A.n[1][0];
return dmnsn_new_matrix2( A.n[1][1]/det, -A.n[0][1]/det,
-A.n[1][0]/det, A.n[0][0]/det);
}
/* Also basically a shorthand */
static dmnsn_matrix2
dmnsn_matrix2_negate(dmnsn_matrix2 A)
{
return dmnsn_new_matrix2(-A.n[0][0], -A.n[0][1],
-A.n[1][0], -A.n[1][1]);
}
/* 2x2 matrix subtraction */
static dmnsn_matrix2
dmnsn_matrix2_sub(dmnsn_matrix2 lhs, dmnsn_matrix2 rhs)
{
/* 4 additions */
return dmnsn_new_matrix2(
lhs.n[0][0] - rhs.n[0][0], lhs.n[0][1] - rhs.n[0][1],
lhs.n[1][0] - rhs.n[1][0], lhs.n[1][1] - rhs.n[1][1]
);
}
/* 2x2 matrix multiplication */
static dmnsn_matrix2
dmnsn_matrix2_mul(dmnsn_matrix2 lhs, dmnsn_matrix2 rhs)
{
/* 8 multiplications, 4 additions */
return dmnsn_new_matrix2(
lhs.n[0][0]*rhs.n[0][0] + lhs.n[0][1]*rhs.n[1][0],
lhs.n[0][0]*rhs.n[0][1] + lhs.n[0][1]*rhs.n[1][1],
lhs.n[1][0]*rhs.n[0][0] + lhs.n[1][1]*rhs.n[1][0],
lhs.n[1][0]*rhs.n[0][1] + lhs.n[1][1]*rhs.n[1][1]
);
}
/* Invert a matrix, if partitioning failed (|P| == 0) */
static dmnsn_matrix
dmnsn_matrix_inverse_generic(dmnsn_matrix A)
{
/*
* Simply form the matrix's adjugate and divide each element by the
* determinant as we go. The routine itself has 4 additions and 16 divisions
* plus 16 cofactor calculations, giving 144 multiplications, 84 additions,
* and 16 divisions.
*/
dmnsn_matrix inv;
double det = 0.0, C;
/* Perform a Laplace expansion along the first row to give us the adjugate's
first column and the determinant */
for (size_t j = 0; j < 4; ++j) {
C = dmnsn_matrix_cofactor(A, 0, j);
det += A.n[0][j]*C;
inv.n[j][0] = C;
}
/* Divide the first column by the determinant */
for (size_t j = 0; j < 4; ++j) {
inv.n[j][0] /= det;
}
/* Find columns 2 through 4 */
for (size_t i = 1; i < 4; ++i) {
for (size_t j = 0; j < 4; ++j) {
inv.n[j][i] = dmnsn_matrix_cofactor(A, i, j)/det;
}
}
return inv;
}
/* Gives the cofactor at row, col; the determinant of the matrix formed from A
by ignoring row `row' and column `col', times (-1)**(row + col) */
static double
dmnsn_matrix_cofactor(dmnsn_matrix A, unsigned int row, unsigned int col)
{
/* 9 multiplications, 5 additions */
double n[9], C;
unsigned int k = 0;
for (size_t i = 0; i < 4; ++i) {
for (size_t j = 0; j < 4; ++j) {
if (i != row && j != col) {
n[k] = A.n[i][j];
++k;
}
}
}
C = n[0]*(n[4]*n[8] - n[5]*n[7]) + n[1]*(n[5]*n[6] - n[3]*n[8])
+ n[2]*(n[3]*n[7] - n[4]*n[6]);
if ((row + col)%2 == 0) {
return C;
} else {
return -C;
}
}
/* 4x4 matrix multiplication */
dmnsn_matrix
dmnsn_matrix_mul(dmnsn_matrix lhs, dmnsn_matrix rhs)
{
/* 64 multiplications, 48 additions */
dmnsn_matrix r;
r.n[0][0] = lhs.n[0][0]*rhs.n[0][0] + lhs.n[0][1]*rhs.n[1][0]
+ lhs.n[0][2]*rhs.n[2][0] + lhs.n[0][3]*rhs.n[3][0];
r.n[0][1] = lhs.n[0][0]*rhs.n[0][1] + lhs.n[0][1]*rhs.n[1][1]
+ lhs.n[0][2]*rhs.n[2][1] + lhs.n[0][3]*rhs.n[3][1];
r.n[0][2] = lhs.n[0][0]*rhs.n[0][2] + lhs.n[0][1]*rhs.n[1][2]
+ lhs.n[0][2]*rhs.n[2][2] + lhs.n[0][3]*rhs.n[3][2];
r.n[0][3] = lhs.n[0][0]*rhs.n[0][3] + lhs.n[0][1]*rhs.n[1][3]
+ lhs.n[0][2]*rhs.n[2][3] + lhs.n[0][3]*rhs.n[3][3];
r.n[1][0] = lhs.n[1][0]*rhs.n[0][0] + lhs.n[1][1]*rhs.n[1][0]
+ lhs.n[1][2]*rhs.n[2][0] + lhs.n[1][3]*rhs.n[3][0];
r.n[1][1] = lhs.n[1][0]*rhs.n[0][1] + lhs.n[1][1]*rhs.n[1][1]
+ lhs.n[1][2]*rhs.n[2][1] + lhs.n[1][3]*rhs.n[3][1];
r.n[1][2] = lhs.n[1][0]*rhs.n[0][2] + lhs.n[1][1]*rhs.n[1][2]
+ lhs.n[1][2]*rhs.n[2][2] + lhs.n[1][3]*rhs.n[3][2];
r.n[1][3] = lhs.n[1][0]*rhs.n[0][3] + lhs.n[1][1]*rhs.n[1][3]
+ lhs.n[1][2]*rhs.n[2][3] + lhs.n[1][3]*rhs.n[3][3];
r.n[2][0] = lhs.n[2][0]*rhs.n[0][0] + lhs.n[2][1]*rhs.n[1][0]
+ lhs.n[2][2]*rhs.n[2][0] + lhs.n[2][3]*rhs.n[3][0];
r.n[2][1] = lhs.n[2][0]*rhs.n[0][1] + lhs.n[2][1]*rhs.n[1][1]
+ lhs.n[2][2]*rhs.n[2][1] + lhs.n[2][3]*rhs.n[3][1];
r.n[2][2] = lhs.n[2][0]*rhs.n[0][2] + lhs.n[2][1]*rhs.n[1][2]
+ lhs.n[2][2]*rhs.n[2][2] + lhs.n[2][3]*rhs.n[3][2];
r.n[2][3] = lhs.n[2][0]*rhs.n[0][3] + lhs.n[2][1]*rhs.n[1][3]
+ lhs.n[2][2]*rhs.n[2][3] + lhs.n[2][3]*rhs.n[3][3];
r.n[3][0] = lhs.n[3][0]*rhs.n[0][0] + lhs.n[3][1]*rhs.n[1][0]
+ lhs.n[3][2]*rhs.n[2][0] + lhs.n[3][3]*rhs.n[3][0];
r.n[3][1] = lhs.n[3][0]*rhs.n[0][1] + lhs.n[3][1]*rhs.n[1][1]
+ lhs.n[3][2]*rhs.n[2][1] + lhs.n[3][3]*rhs.n[3][1];
r.n[3][2] = lhs.n[3][0]*rhs.n[0][2] + lhs.n[3][1]*rhs.n[1][2]
+ lhs.n[3][2]*rhs.n[2][2] + lhs.n[3][3]*rhs.n[3][2];
r.n[3][3] = lhs.n[3][0]*rhs.n[0][3] + lhs.n[3][1]*rhs.n[1][3]
+ lhs.n[3][2]*rhs.n[2][3] + lhs.n[3][3]*rhs.n[3][3];
return r;
}
/* Give an axis-aligned box that contains the given box transformed by `lhs' */
dmnsn_bounding_box
dmnsn_transform_bounding_box(dmnsn_matrix trans, dmnsn_bounding_box box)
{
/* Infinite/zero bounding box support */
if (isinf(box.min.x))
return box;
dmnsn_vector corner;
dmnsn_bounding_box ret;
ret.min = dmnsn_transform_vector(trans, box.min);
ret.max = ret.min;
corner = dmnsn_new_vector(box.min.x, box.min.y, box.max.z);
corner = dmnsn_transform_vector(trans, corner);
ret.min = dmnsn_vector_min(ret.min, corner);
ret.max = dmnsn_vector_max(ret.max, corner);
corner = dmnsn_new_vector(box.min.x, box.max.y, box.min.z);
corner = dmnsn_transform_vector(trans, corner);
ret.min = dmnsn_vector_min(ret.min, corner);
ret.max = dmnsn_vector_max(ret.max, corner);
corner = dmnsn_new_vector(box.min.x, box.max.y, box.max.z);
corner = dmnsn_transform_vector(trans, corner);
ret.min = dmnsn_vector_min(ret.min, corner);
ret.max = dmnsn_vector_max(ret.max, corner);
corner = dmnsn_new_vector(box.max.x, box.min.y, box.min.z);
corner = dmnsn_transform_vector(trans, corner);
ret.min = dmnsn_vector_min(ret.min, corner);
ret.max = dmnsn_vector_max(ret.max, corner);
corner = dmnsn_new_vector(box.max.x, box.min.y, box.max.z);
corner = dmnsn_transform_vector(trans, corner);
ret.min = dmnsn_vector_min(ret.min, corner);
ret.max = dmnsn_vector_max(ret.max, corner);
corner = dmnsn_new_vector(box.max.x, box.max.y, box.min.z);
corner = dmnsn_transform_vector(trans, corner);
ret.min = dmnsn_vector_min(ret.min, corner);
ret.max = dmnsn_vector_max(ret.max, corner);
corner = dmnsn_new_vector(box.max.x, box.max.y, box.max.z);
corner = dmnsn_transform_vector(trans, corner);
ret.min = dmnsn_vector_min(ret.min, corner);
ret.max = dmnsn_vector_max(ret.max, corner);
return ret;
}
/* Solve for the t value such that x0 + t*n = x */
double
dmnsn_line_index(dmnsn_line l, dmnsn_vector x)
{
/* nz + 1 divisions, nz additions */
double d = 0.0;
unsigned int nz = 0;
if (l.n.x != 0.0) {
d += (x.x - l.x0.x)/l.n.x;
++nz;
}
if (l.n.y != 0.0) {
d += (x.y - l.x0.y)/l.n.y;
++nz;
}
if (l.n.z != 0.0) {
d += (x.z - l.x0.z)/l.n.z;
++nz;
}
return d/nz;
}
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