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OgreMatrix3.cpp @ 7908

Last change on this file since 7908 was 7908, checked in by rgrieder, 13 years ago
Stripped down trunk to form a new light sandbox.
Property svn:eol-style set to `native`
File size: 51.1 KB

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1	/*
2	-----------------------------------------------------------------------------
3	This source file is part of OGRE
4	(Object-oriented Graphics Rendering Engine)
5	For the latest info, see http://www.ogre3d.org/
6
7	Copyright (c) 2000-2006 Torus Knot Software Ltd
8	Also see acknowledgements in Readme.html
9
10	This program is free software; you can redistribute it and/or modify it under
11	the terms of the GNU Lesser General Public License as published by the Free Software
12	Foundation; either version 2 of the License, or (at your option) any later
13	version.
14
15	This program is distributed in the hope that it will be useful, but WITHOUT
16	ANY WARRANTY; without even the implied warranty of MERCHANTABILITY or FITNESS
17	FOR A PARTICULAR PURPOSE. See the GNU Lesser General Public License for more details.
18
19	You should have received a copy of the GNU Lesser General Public License along with
20	this program; if not, write to the Free Software Foundation, Inc., 59 Temple
21	Place - Suite 330, Boston, MA 02111-1307, USA, or go to
22	http://www.gnu.org/copyleft/lesser.txt.
23
24	You may alternatively use this source under the terms of a specific version of
25	the OGRE Unrestricted License provided you have obtained such a license from
26	Torus Knot Software Ltd.
27	-----------------------------------------------------------------------------
28	*/
29	#include "OgreMatrix3.h"
30
31	#include "OgreMath.h"
32
33	// Adapted from Matrix math by Wild Magic http://www.geometrictools.com/
34
35	namespace Ogre
36	{
37	const Real Matrix3::EPSILON = 1e-06;
38	const Matrix3 Matrix3::ZERO(0,0,0,0,0,0,0,0,0);
39	const Matrix3 Matrix3::IDENTITY(1,0,0,0,1,0,0,0,1);
40	const Real Matrix3::ms_fSvdEpsilon = 1e-04;
41	const unsigned int Matrix3::ms_iSvdMaxIterations = 32;
42
43	//-----------------------------------------------------------------------
44	Vector3 Matrix3::GetColumn (size_t iCol) const
45	{
46	assert( 0 <= iCol && iCol < 3 );
47	return Vector3(m[0][iCol],m[1][iCol],
48	m[2][iCol]);
49	}
50	//-----------------------------------------------------------------------
51	void Matrix3::SetColumn(size_t iCol, const Vector3& vec)
52	{
53	assert( 0 <= iCol && iCol < 3 );
54	m[0][iCol] = vec.x;
55	m[1][iCol] = vec.y;
56	m[2][iCol] = vec.z;
57
58	}
59	//-----------------------------------------------------------------------
60	void Matrix3::FromAxes(const Vector3& xAxis, const Vector3& yAxis, const Vector3& zAxis)
61	{
62	SetColumn(0,xAxis);
63	SetColumn(1,yAxis);
64	SetColumn(2,zAxis);
65
66	}
67
68	//-----------------------------------------------------------------------
69	bool Matrix3::operator== (const Matrix3& rkMatrix) const
70	{
71	for (size_t iRow = 0; iRow < 3; iRow++)
72	{
73	for (size_t iCol = 0; iCol < 3; iCol++)
74	{
75	if ( m[iRow][iCol] != rkMatrix.m[iRow][iCol] )
76	return false;
77	}
78	}
79
80	return true;
81	}
82	//-----------------------------------------------------------------------
83	Matrix3 Matrix3::operator+ (const Matrix3& rkMatrix) const
84	{
85	Matrix3 kSum;
86	for (size_t iRow = 0; iRow < 3; iRow++)
87	{
88	for (size_t iCol = 0; iCol < 3; iCol++)
89	{
90	kSum.m[iRow][iCol] = m[iRow][iCol] +
91	rkMatrix.m[iRow][iCol];
92	}
93	}
94	return kSum;
95	}
96	//-----------------------------------------------------------------------
97	Matrix3 Matrix3::operator- (const Matrix3& rkMatrix) const
98	{
99	Matrix3 kDiff;
100	for (size_t iRow = 0; iRow < 3; iRow++)
101	{
102	for (size_t iCol = 0; iCol < 3; iCol++)
103	{
104	kDiff.m[iRow][iCol] = m[iRow][iCol] -
105	rkMatrix.m[iRow][iCol];
106	}
107	}
108	return kDiff;
109	}
110	//-----------------------------------------------------------------------
111	Matrix3 Matrix3::operator* (const Matrix3& rkMatrix) const
112	{
113	Matrix3 kProd;
114	for (size_t iRow = 0; iRow < 3; iRow++)
115	{
116	for (size_t iCol = 0; iCol < 3; iCol++)
117	{
118	kProd.m[iRow][iCol] =
119	m[iRow][0]*rkMatrix.m[0][iCol] +
120	m[iRow][1]*rkMatrix.m[1][iCol] +
121	m[iRow][2]*rkMatrix.m[2][iCol];
122	}
123	}
124	return kProd;
125	}
126	//-----------------------------------------------------------------------
127	Vector3 Matrix3::operator* (const Vector3& rkPoint) const
128	{
129	Vector3 kProd;
130	for (size_t iRow = 0; iRow < 3; iRow++)
131	{
132	kProd[iRow] =
133	m[iRow][0]*rkPoint[0] +
134	m[iRow][1]*rkPoint[1] +
135	m[iRow][2]*rkPoint[2];
136	}
137	return kProd;
138	}
139	//-----------------------------------------------------------------------
140	Vector3 operator* (const Vector3& rkPoint, const Matrix3& rkMatrix)
141	{
142	Vector3 kProd;
143	for (size_t iRow = 0; iRow < 3; iRow++)
144	{
145	kProd[iRow] =
146	rkPoint[0]*rkMatrix.m[0][iRow] +
147	rkPoint[1]*rkMatrix.m[1][iRow] +
148	rkPoint[2]*rkMatrix.m[2][iRow];
149	}
150	return kProd;
151	}
152	//-----------------------------------------------------------------------
153	Matrix3 Matrix3::operator- () const
154	{
155	Matrix3 kNeg;
156	for (size_t iRow = 0; iRow < 3; iRow++)
157	{
158	for (size_t iCol = 0; iCol < 3; iCol++)
159	kNeg[iRow][iCol] = -m[iRow][iCol];
160	}
161	return kNeg;
162	}
163	//-----------------------------------------------------------------------
164	Matrix3 Matrix3::operator* (Real fScalar) const
165	{
166	Matrix3 kProd;
167	for (size_t iRow = 0; iRow < 3; iRow++)
168	{
169	for (size_t iCol = 0; iCol < 3; iCol++)
170	kProd[iRow][iCol] = fScalar*m[iRow][iCol];
171	}
172	return kProd;
173	}
174	//-----------------------------------------------------------------------
175	Matrix3 operator* (Real fScalar, const Matrix3& rkMatrix)
176	{
177	Matrix3 kProd;
178	for (size_t iRow = 0; iRow < 3; iRow++)
179	{
180	for (size_t iCol = 0; iCol < 3; iCol++)
181	kProd[iRow][iCol] = fScalar*rkMatrix.m[iRow][iCol];
182	}
183	return kProd;
184	}
185	//-----------------------------------------------------------------------
186	Matrix3 Matrix3::Transpose () const
187	{
188	Matrix3 kTranspose;
189	for (size_t iRow = 0; iRow < 3; iRow++)
190	{
191	for (size_t iCol = 0; iCol < 3; iCol++)
192	kTranspose[iRow][iCol] = m[iCol][iRow];
193	}
194	return kTranspose;
195	}
196	//-----------------------------------------------------------------------
197	bool Matrix3::Inverse (Matrix3& rkInverse, Real fTolerance) const
198	{
199	// Invert a 3x3 using cofactors. This is about 8 times faster than
200	// the Numerical Recipes code which uses Gaussian elimination.
201
202	rkInverse[0][0] = m[1][1]*m[2][2] -
203	m[1][2]*m[2][1];
204	rkInverse[0][1] = m[0][2]*m[2][1] -
205	m[0][1]*m[2][2];
206	rkInverse[0][2] = m[0][1]*m[1][2] -
207	m[0][2]*m[1][1];
208	rkInverse[1][0] = m[1][2]*m[2][0] -
209	m[1][0]*m[2][2];
210	rkInverse[1][1] = m[0][0]*m[2][2] -
211	m[0][2]*m[2][0];
212	rkInverse[1][2] = m[0][2]*m[1][0] -
213	m[0][0]*m[1][2];
214	rkInverse[2][0] = m[1][0]*m[2][1] -
215	m[1][1]*m[2][0];
216	rkInverse[2][1] = m[0][1]*m[2][0] -
217	m[0][0]*m[2][1];
218	rkInverse[2][2] = m[0][0]*m[1][1] -
219	m[0][1]*m[1][0];
220
221	Real fDet =
222	m[0][0]*rkInverse[0][0] +
223	m[0][1]*rkInverse[1][0]+
224	m[0][2]*rkInverse[2][0];
225
226	if ( Math::Abs(fDet) <= fTolerance )
227	return false;
228
229	Real fInvDet = 1.0/fDet;
230	for (size_t iRow = 0; iRow < 3; iRow++)
231	{
232	for (size_t iCol = 0; iCol < 3; iCol++)
233	rkInverse[iRow][iCol] *= fInvDet;
234	}
235
236	return true;
237	}
238	//-----------------------------------------------------------------------
239	Matrix3 Matrix3::Inverse (Real fTolerance) const
240	{
241	Matrix3 kInverse = Matrix3::ZERO;
242	Inverse(kInverse,fTolerance);
243	return kInverse;
244	}
245	//-----------------------------------------------------------------------
246	Real Matrix3::Determinant () const
247	{
248	Real fCofactor00 = m[1][1]*m[2][2] -
249	m[1][2]*m[2][1];
250	Real fCofactor10 = m[1][2]*m[2][0] -
251	m[1][0]*m[2][2];
252	Real fCofactor20 = m[1][0]*m[2][1] -
253	m[1][1]*m[2][0];
254
255	Real fDet =
256	m[0][0]*fCofactor00 +
257	m[0][1]*fCofactor10 +
258	m[0][2]*fCofactor20;
259
260	return fDet;
261	}
262	//-----------------------------------------------------------------------
263	void Matrix3::Bidiagonalize (Matrix3& kA, Matrix3& kL,
264	Matrix3& kR)
265	{
266	Real afV[3], afW[3];
267	Real fLength, fSign, fT1, fInvT1, fT2;
268	bool bIdentity;
269
270	// map first column to (*,0,0)
271	fLength = Math::Sqrt(kA[0][0]kA[0][0] + kA[1][0]kA[1][0] +
272	kA[2][0]*kA[2][0]);
273	if ( fLength > 0.0 )
274	{
275	fSign = (kA[0][0] > 0.0 ? 1.0 : -1.0);
276	fT1 = kA[0][0] + fSign*fLength;
277	fInvT1 = 1.0/fT1;
278	afV[1] = kA[1][0]*fInvT1;
279	afV[2] = kA[2][0]*fInvT1;
280
281	fT2 = -2.0/(1.0+afV[1]afV[1]+afV[2]afV[2]);
282	afW[0] = fT2(kA[0][0]+kA[1][0]afV[1]+kA[2][0]*afV[2]);
283	afW[1] = fT2(kA[0][1]+kA[1][1]afV[1]+kA[2][1]*afV[2]);
284	afW[2] = fT2(kA[0][2]+kA[1][2]afV[1]+kA[2][2]*afV[2]);
285	kA[0][0] += afW[0];
286	kA[0][1] += afW[1];
287	kA[0][2] += afW[2];
288	kA[1][1] += afV[1]*afW[1];
289	kA[1][2] += afV[1]*afW[2];
290	kA[2][1] += afV[2]*afW[1];
291	kA[2][2] += afV[2]*afW[2];
292
293	kL[0][0] = 1.0+fT2;
294	kL[0][1] = kL[1][0] = fT2*afV[1];
295	kL[0][2] = kL[2][0] = fT2*afV[2];
296	kL[1][1] = 1.0+fT2afV[1]afV[1];
297	kL[1][2] = kL[2][1] = fT2afV[1]afV[2];
298	kL[2][2] = 1.0+fT2afV[2]afV[2];
299	bIdentity = false;
300	}
301	else
302	{
303	kL = Matrix3::IDENTITY;
304	bIdentity = true;
305	}
306
307	// map first row to (,,0)
308	fLength = Math::Sqrt(kA[0][1]kA[0][1]+kA[0][2]kA[0][2]);
309	if ( fLength > 0.0 )
310	{
311	fSign = (kA[0][1] > 0.0 ? 1.0 : -1.0);
312	fT1 = kA[0][1] + fSign*fLength;
313	afV[2] = kA[0][2]/fT1;
314
315	fT2 = -2.0/(1.0+afV[2]*afV[2]);
316	afW[0] = fT2(kA[0][1]+kA[0][2]afV[2]);
317	afW[1] = fT2(kA[1][1]+kA[1][2]afV[2]);
318	afW[2] = fT2(kA[2][1]+kA[2][2]afV[2]);
319	kA[0][1] += afW[0];
320	kA[1][1] += afW[1];
321	kA[1][2] += afW[1]*afV[2];
322	kA[2][1] += afW[2];
323	kA[2][2] += afW[2]*afV[2];
324
325	kR[0][0] = 1.0;
326	kR[0][1] = kR[1][0] = 0.0;
327	kR[0][2] = kR[2][0] = 0.0;
328	kR[1][1] = 1.0+fT2;
329	kR[1][2] = kR[2][1] = fT2*afV[2];
330	kR[2][2] = 1.0+fT2afV[2]afV[2];
331	}
332	else
333	{
334	kR = Matrix3::IDENTITY;
335	}
336
337	// map second column to (,,0)
338	fLength = Math::Sqrt(kA[1][1]kA[1][1]+kA[2][1]kA[2][1]);
339	if ( fLength > 0.0 )
340	{
341	fSign = (kA[1][1] > 0.0 ? 1.0 : -1.0);
342	fT1 = kA[1][1] + fSign*fLength;
343	afV[2] = kA[2][1]/fT1;
344
345	fT2 = -2.0/(1.0+afV[2]*afV[2]);
346	afW[1] = fT2(kA[1][1]+kA[2][1]afV[2]);
347	afW[2] = fT2(kA[1][2]+kA[2][2]afV[2]);
348	kA[1][1] += afW[1];
349	kA[1][2] += afW[2];
350	kA[2][2] += afV[2]*afW[2];
351
352	Real fA = 1.0+fT2;
353	Real fB = fT2*afV[2];
354	Real fC = 1.0+fB*afV[2];
355
356	if ( bIdentity )
357	{
358	kL[0][0] = 1.0;
359	kL[0][1] = kL[1][0] = 0.0;
360	kL[0][2] = kL[2][0] = 0.0;
361	kL[1][1] = fA;
362	kL[1][2] = kL[2][1] = fB;
363	kL[2][2] = fC;
364	}
365	else
366	{
367	for (int iRow = 0; iRow < 3; iRow++)
368	{
369	Real fTmp0 = kL[iRow][1];
370	Real fTmp1 = kL[iRow][2];
371	kL[iRow][1] = fAfTmp0+fBfTmp1;
372	kL[iRow][2] = fBfTmp0+fCfTmp1;
373	}
374	}
375	}
376	}
377	//-----------------------------------------------------------------------
378	void Matrix3::GolubKahanStep (Matrix3& kA, Matrix3& kL,
379	Matrix3& kR)
380	{
381	Real fT11 = kA[0][1]kA[0][1]+kA[1][1]kA[1][1];
382	Real fT22 = kA[1][2]kA[1][2]+kA[2][2]kA[2][2];
383	Real fT12 = kA[1][1]*kA[1][2];
384	Real fTrace = fT11+fT22;
385	Real fDiff = fT11-fT22;
386	Real fDiscr = Math::Sqrt(fDifffDiff+4.0fT12*fT12);
387	Real fRoot1 = 0.5*(fTrace+fDiscr);
388	Real fRoot2 = 0.5*(fTrace-fDiscr);
389
390	// adjust right
391	Real fY = kA[0][0] - (Math::Abs(fRoot1-fT22) <=
392	Math::Abs(fRoot2-fT22) ? fRoot1 : fRoot2);
393	Real fZ = kA[0][1];
394	Real fInvLength = Math::InvSqrt(fYfY+fZfZ);
395	Real fSin = fZ*fInvLength;
396	Real fCos = -fY*fInvLength;
397
398	Real fTmp0 = kA[0][0];
399	Real fTmp1 = kA[0][1];
400	kA[0][0] = fCosfTmp0-fSinfTmp1;
401	kA[0][1] = fSinfTmp0+fCosfTmp1;
402	kA[1][0] = -fSin*kA[1][1];
403	kA[1][1] *= fCos;
404
405	size_t iRow;
406	for (iRow = 0; iRow < 3; iRow++)
407	{
408	fTmp0 = kR[0][iRow];
409	fTmp1 = kR[1][iRow];
410	kR[0][iRow] = fCosfTmp0-fSinfTmp1;
411	kR[1][iRow] = fSinfTmp0+fCosfTmp1;
412	}
413
414	// adjust left
415	fY = kA[0][0];
416	fZ = kA[1][0];
417	fInvLength = Math::InvSqrt(fYfY+fZfZ);
418	fSin = fZ*fInvLength;
419	fCos = -fY*fInvLength;
420
421	kA[0][0] = fCoskA[0][0]-fSinkA[1][0];
422	fTmp0 = kA[0][1];
423	fTmp1 = kA[1][1];
424	kA[0][1] = fCosfTmp0-fSinfTmp1;
425	kA[1][1] = fSinfTmp0+fCosfTmp1;
426	kA[0][2] = -fSin*kA[1][2];
427	kA[1][2] *= fCos;
428
429	size_t iCol;
430	for (iCol = 0; iCol < 3; iCol++)
431	{
432	fTmp0 = kL[iCol][0];
433	fTmp1 = kL[iCol][1];
434	kL[iCol][0] = fCosfTmp0-fSinfTmp1;
435	kL[iCol][1] = fSinfTmp0+fCosfTmp1;
436	}
437
438	// adjust right
439	fY = kA[0][1];
440	fZ = kA[0][2];
441	fInvLength = Math::InvSqrt(fYfY+fZfZ);
442	fSin = fZ*fInvLength;
443	fCos = -fY*fInvLength;
444
445	kA[0][1] = fCoskA[0][1]-fSinkA[0][2];
446	fTmp0 = kA[1][1];
447	fTmp1 = kA[1][2];
448	kA[1][1] = fCosfTmp0-fSinfTmp1;
449	kA[1][2] = fSinfTmp0+fCosfTmp1;
450	kA[2][1] = -fSin*kA[2][2];
451	kA[2][2] *= fCos;
452
453	for (iRow = 0; iRow < 3; iRow++)
454	{
455	fTmp0 = kR[1][iRow];
456	fTmp1 = kR[2][iRow];
457	kR[1][iRow] = fCosfTmp0-fSinfTmp1;
458	kR[2][iRow] = fSinfTmp0+fCosfTmp1;
459	}
460
461	// adjust left
462	fY = kA[1][1];
463	fZ = kA[2][1];
464	fInvLength = Math::InvSqrt(fYfY+fZfZ);
465	fSin = fZ*fInvLength;
466	fCos = -fY*fInvLength;
467
468	kA[1][1] = fCoskA[1][1]-fSinkA[2][1];
469	fTmp0 = kA[1][2];
470	fTmp1 = kA[2][2];
471	kA[1][2] = fCosfTmp0-fSinfTmp1;
472	kA[2][2] = fSinfTmp0+fCosfTmp1;
473
474	for (iCol = 0; iCol < 3; iCol++)
475	{
476	fTmp0 = kL[iCol][1];
477	fTmp1 = kL[iCol][2];
478	kL[iCol][1] = fCosfTmp0-fSinfTmp1;
479	kL[iCol][2] = fSinfTmp0+fCosfTmp1;
480	}
481	}
482	//-----------------------------------------------------------------------
483	void Matrix3::SingularValueDecomposition (Matrix3& kL, Vector3& kS,
484	Matrix3& kR) const
485	{
486	// temas: currently unused
487	//const int iMax = 16;
488	size_t iRow, iCol;
489
490	Matrix3 kA = *this;
491	Bidiagonalize(kA,kL,kR);
492
493	for (unsigned int i = 0; i < ms_iSvdMaxIterations; i++)
494	{
495	Real fTmp, fTmp0, fTmp1;
496	Real fSin0, fCos0, fTan0;
497	Real fSin1, fCos1, fTan1;
498
499	bool bTest1 = (Math::Abs(kA[0][1]) <=
500	ms_fSvdEpsilon*(Math::Abs(kA[0][0])+Math::Abs(kA[1][1])));
501	bool bTest2 = (Math::Abs(kA[1][2]) <=
502	ms_fSvdEpsilon*(Math::Abs(kA[1][1])+Math::Abs(kA[2][2])));
503	if ( bTest1 )
504	{
505	if ( bTest2 )
506	{
507	kS[0] = kA[0][0];
508	kS[1] = kA[1][1];
509	kS[2] = kA[2][2];
510	break;
511	}
512	else
513	{
514	// 2x2 closed form factorization
515	fTmp = (kA[1][1]kA[1][1] - kA[2][2]kA[2][2] +
516	kA[1][2]kA[1][2])/(kA[1][2]kA[2][2]);
517	fTan0 = 0.5(fTmp+Math::Sqrt(fTmpfTmp + 4.0));
518	fCos0 = Math::InvSqrt(1.0+fTan0*fTan0);
519	fSin0 = fTan0*fCos0;
520
521	for (iCol = 0; iCol < 3; iCol++)
522	{
523	fTmp0 = kL[iCol][1];
524	fTmp1 = kL[iCol][2];
525	kL[iCol][1] = fCos0fTmp0-fSin0fTmp1;
526	kL[iCol][2] = fSin0fTmp0+fCos0fTmp1;
527	}
528
529	fTan1 = (kA[1][2]-kA[2][2]*fTan0)/kA[1][1];
530	fCos1 = Math::InvSqrt(1.0+fTan1*fTan1);
531	fSin1 = -fTan1*fCos1;
532
533	for (iRow = 0; iRow < 3; iRow++)
534	{
535	fTmp0 = kR[1][iRow];
536	fTmp1 = kR[2][iRow];
537	kR[1][iRow] = fCos1fTmp0-fSin1fTmp1;
538	kR[2][iRow] = fSin1fTmp0+fCos1fTmp1;
539	}
540
541	kS[0] = kA[0][0];
542	kS[1] = fCos0fCos1kA[1][1] -
543	fSin1(fCos0kA[1][2]-fSin0*kA[2][2]);
544	kS[2] = fSin0fSin1kA[1][1] +
545	fCos1(fSin0kA[1][2]+fCos0*kA[2][2]);
546	break;
547	}
548	}
549	else
550	{
551	if ( bTest2 )
552	{
553	// 2x2 closed form factorization
554	fTmp = (kA[0][0]kA[0][0] + kA[1][1]kA[1][1] -
555	kA[0][1]kA[0][1])/(kA[0][1]kA[1][1]);
556	fTan0 = 0.5(-fTmp+Math::Sqrt(fTmpfTmp + 4.0));
557	fCos0 = Math::InvSqrt(1.0+fTan0*fTan0);
558	fSin0 = fTan0*fCos0;
559
560	for (iCol = 0; iCol < 3; iCol++)
561	{
562	fTmp0 = kL[iCol][0];
563	fTmp1 = kL[iCol][1];
564	kL[iCol][0] = fCos0fTmp0-fSin0fTmp1;
565	kL[iCol][1] = fSin0fTmp0+fCos0fTmp1;
566	}
567
568	fTan1 = (kA[0][1]-kA[1][1]*fTan0)/kA[0][0];
569	fCos1 = Math::InvSqrt(1.0+fTan1*fTan1);
570	fSin1 = -fTan1*fCos1;
571
572	for (iRow = 0; iRow < 3; iRow++)
573	{
574	fTmp0 = kR[0][iRow];
575	fTmp1 = kR[1][iRow];
576	kR[0][iRow] = fCos1fTmp0-fSin1fTmp1;
577	kR[1][iRow] = fSin1fTmp0+fCos1fTmp1;
578	}
579
580	kS[0] = fCos0fCos1kA[0][0] -
581	fSin1(fCos0kA[0][1]-fSin0*kA[1][1]);
582	kS[1] = fSin0fSin1kA[0][0] +
583	fCos1(fSin0kA[0][1]+fCos0*kA[1][1]);
584	kS[2] = kA[2][2];
585	break;
586	}
587	else
588	{
589	GolubKahanStep(kA,kL,kR);
590	}
591	}
592	}
593
594	// positize diagonal
595	for (iRow = 0; iRow < 3; iRow++)
596	{
597	if ( kS[iRow] < 0.0 )
598	{
599	kS[iRow] = -kS[iRow];
600	for (iCol = 0; iCol < 3; iCol++)
601	kR[iRow][iCol] = -kR[iRow][iCol];
602	}
603	}
604	}
605	//-----------------------------------------------------------------------
606	void Matrix3::SingularValueComposition (const Matrix3& kL,
607	const Vector3& kS, const Matrix3& kR)
608	{
609	size_t iRow, iCol;
610	Matrix3 kTmp;
611
612	// product S*R
613	for (iRow = 0; iRow < 3; iRow++)
614	{
615	for (iCol = 0; iCol < 3; iCol++)
616	kTmp[iRow][iCol] = kS[iRow]*kR[iRow][iCol];
617	}
618
619	// product LSR
620	for (iRow = 0; iRow < 3; iRow++)
621	{
622	for (iCol = 0; iCol < 3; iCol++)
623	{
624	m[iRow][iCol] = 0.0;
625	for (int iMid = 0; iMid < 3; iMid++)
626	m[iRow][iCol] += kL[iRow][iMid]*kTmp[iMid][iCol];
627	}
628	}
629	}
630	//-----------------------------------------------------------------------
631	void Matrix3::Orthonormalize ()
632	{
633	// Algorithm uses Gram-Schmidt orthogonalization. If 'this' matrix is
634	// M = [m0\|m1\|m2], then orthonormal output matrix is Q = [q0\|q1\|q2],
635	//
636	// q0 = m0/\|m0\|
637	// q1 = (m1-(q0m1)q0)/\|m1-(q0m1)q0\|
638	// q2 = (m2-(q0m2)q0-(q1m2)q1)/\|m2-(q0m2)q0-(q1m2)q1\|
639	//
640	// where \|V\| indicates length of vector V and A*B indicates dot
641	// product of vectors A and B.
642
643	// compute q0
644	Real fInvLength = Math::InvSqrt(m[0][0]*m[0][0]
645	+ m[1][0]*m[1][0] +
646	m[2][0]*m[2][0]);
647
648	m[0][0] *= fInvLength;
649	m[1][0] *= fInvLength;
650	m[2][0] *= fInvLength;
651
652	// compute q1
653	Real fDot0 =
654	m[0][0]*m[0][1] +
655	m[1][0]*m[1][1] +
656	m[2][0]*m[2][1];
657
658	m[0][1] -= fDot0*m[0][0];
659	m[1][1] -= fDot0*m[1][0];
660	m[2][1] -= fDot0*m[2][0];
661
662	fInvLength = Math::InvSqrt(m[0][1]*m[0][1] +
663	m[1][1]*m[1][1] +
664	m[2][1]*m[2][1]);
665
666	m[0][1] *= fInvLength;
667	m[1][1] *= fInvLength;
668	m[2][1] *= fInvLength;
669
670	// compute q2
671	Real fDot1 =
672	m[0][1]*m[0][2] +
673	m[1][1]*m[1][2] +
674	m[2][1]*m[2][2];
675
676	fDot0 =
677	m[0][0]*m[0][2] +
678	m[1][0]*m[1][2] +
679	m[2][0]*m[2][2];
680
681	m[0][2] -= fDot0m[0][0] + fDot1m[0][1];
682	m[1][2] -= fDot0m[1][0] + fDot1m[1][1];
683	m[2][2] -= fDot0m[2][0] + fDot1m[2][1];
684
685	fInvLength = Math::InvSqrt(m[0][2]*m[0][2] +
686	m[1][2]*m[1][2] +
687	m[2][2]*m[2][2]);
688
689	m[0][2] *= fInvLength;
690	m[1][2] *= fInvLength;
691	m[2][2] *= fInvLength;
692	}
693	//-----------------------------------------------------------------------
694	void Matrix3::QDUDecomposition (Matrix3& kQ,
695	Vector3& kD, Vector3& kU) const
696	{
697	// Factor M = QR = QDU where Q is orthogonal, D is diagonal,
698	// and U is upper triangular with ones on its diagonal. Algorithm uses
699	// Gram-Schmidt orthogonalization (the QR algorithm).
700	//
701	// If M = [ m0 \| m1 \| m2 ] and Q = [ q0 \| q1 \| q2 ], then
702	//
703	// q0 = m0/\|m0\|
704	// q1 = (m1-(q0m1)q0)/\|m1-(q0m1)q0\|
705	// q2 = (m2-(q0m2)q0-(q1m2)q1)/\|m2-(q0m2)q0-(q1m2)q1\|
706	//
707	// where \|V\| indicates length of vector V and A*B indicates dot
708	// product of vectors A and B. The matrix R has entries
709	//
710	// r00 = q0m0 r01 = q0m1 r02 = q0*m2
711	// r10 = 0 r11 = q1m1 r12 = q1m2
712	// r20 = 0 r21 = 0 r22 = q2*m2
713	//
714	// so D = diag(r00,r11,r22) and U has entries u01 = r01/r00,
715	// u02 = r02/r00, and u12 = r12/r11.
716
717	// Q = rotation
718	// D = scaling
719	// U = shear
720
721	// D stores the three diagonal entries r00, r11, r22
722	// U stores the entries U[0] = u01, U[1] = u02, U[2] = u12
723
724	// build orthogonal matrix Q
725	Real fInvLength = Math::InvSqrt(m[0][0]*m[0][0]
726	+ m[1][0]*m[1][0] +
727	m[2][0]*m[2][0]);
728	kQ[0][0] = m[0][0]*fInvLength;
729	kQ[1][0] = m[1][0]*fInvLength;
730	kQ[2][0] = m[2][0]*fInvLength;
731
732	Real fDot = kQ[0][0]m[0][1] + kQ[1][0]m[1][1] +
733	kQ[2][0]*m[2][1];
734	kQ[0][1] = m[0][1]-fDot*kQ[0][0];
735	kQ[1][1] = m[1][1]-fDot*kQ[1][0];
736	kQ[2][1] = m[2][1]-fDot*kQ[2][0];
737	fInvLength = Math::InvSqrt(kQ[0][1]kQ[0][1] + kQ[1][1]kQ[1][1] +
738	kQ[2][1]*kQ[2][1]);
739	kQ[0][1] *= fInvLength;
740	kQ[1][1] *= fInvLength;
741	kQ[2][1] *= fInvLength;
742
743	fDot = kQ[0][0]m[0][2] + kQ[1][0]m[1][2] +
744	kQ[2][0]*m[2][2];
745	kQ[0][2] = m[0][2]-fDot*kQ[0][0];
746	kQ[1][2] = m[1][2]-fDot*kQ[1][0];
747	kQ[2][2] = m[2][2]-fDot*kQ[2][0];
748	fDot = kQ[0][1]m[0][2] + kQ[1][1]m[1][2] +
749	kQ[2][1]*m[2][2];
750	kQ[0][2] -= fDot*kQ[0][1];
751	kQ[1][2] -= fDot*kQ[1][1];
752	kQ[2][2] -= fDot*kQ[2][1];
753	fInvLength = Math::InvSqrt(kQ[0][2]kQ[0][2] + kQ[1][2]kQ[1][2] +
754	kQ[2][2]*kQ[2][2]);
755	kQ[0][2] *= fInvLength;
756	kQ[1][2] *= fInvLength;
757	kQ[2][2] *= fInvLength;
758
759	// guarantee that orthogonal matrix has determinant 1 (no reflections)
760	Real fDet = kQ[0][0]kQ[1][1]kQ[2][2] + kQ[0][1]kQ[1][2]kQ[2][0] +
761	kQ[0][2]kQ[1][0]kQ[2][1] - kQ[0][2]kQ[1][1]kQ[2][0] -
762	kQ[0][1]kQ[1][0]kQ[2][2] - kQ[0][0]kQ[1][2]kQ[2][1];
763
764	if ( fDet < 0.0 )
765	{
766	for (size_t iRow = 0; iRow < 3; iRow++)
767	for (size_t iCol = 0; iCol < 3; iCol++)
768	kQ[iRow][iCol] = -kQ[iRow][iCol];
769	}
770
771	// build "right" matrix R
772	Matrix3 kR;
773	kR[0][0] = kQ[0][0]m[0][0] + kQ[1][0]m[1][0] +
774	kQ[2][0]*m[2][0];
775	kR[0][1] = kQ[0][0]m[0][1] + kQ[1][0]m[1][1] +
776	kQ[2][0]*m[2][1];
777	kR[1][1] = kQ[0][1]m[0][1] + kQ[1][1]m[1][1] +
778	kQ[2][1]*m[2][1];
779	kR[0][2] = kQ[0][0]m[0][2] + kQ[1][0]m[1][2] +
780	kQ[2][0]*m[2][2];
781	kR[1][2] = kQ[0][1]m[0][2] + kQ[1][1]m[1][2] +
782	kQ[2][1]*m[2][2];
783	kR[2][2] = kQ[0][2]m[0][2] + kQ[1][2]m[1][2] +
784	kQ[2][2]*m[2][2];
785
786	// the scaling component
787	kD[0] = kR[0][0];
788	kD[1] = kR[1][1];
789	kD[2] = kR[2][2];
790
791	// the shear component
792	Real fInvD0 = 1.0/kD[0];
793	kU[0] = kR[0][1]*fInvD0;
794	kU[1] = kR[0][2]*fInvD0;
795	kU[2] = kR[1][2]/kD[1];
796	}
797	//-----------------------------------------------------------------------
798	Real Matrix3::MaxCubicRoot (Real afCoeff[3])
799	{
800	// Spectral norm is for A^T*A, so characteristic polynomial
801	// P(x) = c[0]+c[1]x+c[2]x^2+x^3 has three positive real roots.
802	// This yields the assertions c[0] < 0 and c[2]c[2] >= 3c[1].
803
804	// quick out for uniform scale (triple root)
805	const Real fOneThird = 1.0/3.0;
806	const Real fEpsilon = 1e-06;
807	Real fDiscr = afCoeff[2]afCoeff[2] - 3.0afCoeff[1];
808	if ( fDiscr <= fEpsilon )
809	return -fOneThird*afCoeff[2];
810
811	// Compute an upper bound on roots of P(x). This assumes that A^T*A
812	// has been scaled by its largest entry.
813	Real fX = 1.0;
814	Real fPoly = afCoeff[0]+fX(afCoeff[1]+fX(afCoeff[2]+fX));
815	if ( fPoly < 0.0 )
816	{
817	// uses a matrix norm to find an upper bound on maximum root
818	fX = Math::Abs(afCoeff[0]);
819	Real fTmp = 1.0+Math::Abs(afCoeff[1]);
820	if ( fTmp > fX )
821	fX = fTmp;
822	fTmp = 1.0+Math::Abs(afCoeff[2]);
823	if ( fTmp > fX )
824	fX = fTmp;
825	}
826
827	// Newton's method to find root
828	Real fTwoC2 = 2.0*afCoeff[2];
829	for (int i = 0; i < 16; i++)
830	{
831	fPoly = afCoeff[0]+fX(afCoeff[1]+fX(afCoeff[2]+fX));
832	if ( Math::Abs(fPoly) <= fEpsilon )
833	return fX;
834
835	Real fDeriv = afCoeff[1]+fX(fTwoC2+3.0fX);
836	fX -= fPoly/fDeriv;
837	}
838
839	return fX;
840	}
841	//-----------------------------------------------------------------------
842	Real Matrix3::SpectralNorm () const
843	{
844	Matrix3 kP;
845	size_t iRow, iCol;
846	Real fPmax = 0.0;
847	for (iRow = 0; iRow < 3; iRow++)
848	{
849	for (iCol = 0; iCol < 3; iCol++)
850	{
851	kP[iRow][iCol] = 0.0;
852	for (int iMid = 0; iMid < 3; iMid++)
853	{
854	kP[iRow][iCol] +=
855	m[iMid][iRow]*m[iMid][iCol];
856	}
857	if ( kP[iRow][iCol] > fPmax )
858	fPmax = kP[iRow][iCol];
859	}
860	}
861
862	Real fInvPmax = 1.0/fPmax;
863	for (iRow = 0; iRow < 3; iRow++)
864	{
865	for (iCol = 0; iCol < 3; iCol++)
866	kP[iRow][iCol] *= fInvPmax;
867	}
868
869	Real afCoeff[3];
870	afCoeff[0] = -(kP[0][0](kP[1][1]kP[2][2]-kP[1][2]*kP[2][1]) +
871	kP[0][1](kP[2][0]kP[1][2]-kP[1][0]*kP[2][2]) +
872	kP[0][2](kP[1][0]kP[2][1]-kP[2][0]*kP[1][1]));
873	afCoeff[1] = kP[0][0]kP[1][1]-kP[0][1]kP[1][0] +
874	kP[0][0]kP[2][2]-kP[0][2]kP[2][0] +
875	kP[1][1]kP[2][2]-kP[1][2]kP[2][1];
876	afCoeff[2] = -(kP[0][0]+kP[1][1]+kP[2][2]);
877
878	Real fRoot = MaxCubicRoot(afCoeff);
879	Real fNorm = Math::Sqrt(fPmax*fRoot);
880	return fNorm;
881	}
882	//-----------------------------------------------------------------------
883	void Matrix3::ToAxisAngle (Vector3& rkAxis, Radian& rfRadians) const
884	{
885	// Let (x,y,z) be the unit-length axis and let A be an angle of rotation.
886	// The rotation matrix is R = I + sin(A)P + (1-cos(A))P^2 where
887	// I is the identity and
888	//
889	// +- -+
890	// P = \| 0 -z +y \|
891	// \| +z 0 -x \|
892	// \| -y +x 0 \|
893	// +- -+
894	//
895	// If A > 0, R represents a counterclockwise rotation about the axis in
896	// the sense of looking from the tip of the axis vector towards the
897	// origin. Some algebra will show that
898	//
899	// cos(A) = (trace(R)-1)/2 and R - R^t = 2sin(A)P
900	//
901	// In the event that A = pi, R-R^t = 0 which prevents us from extracting
902	// the axis through P. Instead note that R = I+2*P^2 when A = pi, so
903	// P^2 = (R-I)/2. The diagonal entries of P^2 are x^2-1, y^2-1, and
904	// z^2-1. We can solve these for axis (x,y,z). Because the angle is pi,
905	// it does not matter which sign you choose on the square roots.
906
907	Real fTrace = m[0][0] + m[1][1] + m[2][2];
908	Real fCos = 0.5*(fTrace-1.0);
909	rfRadians = Math::ACos(fCos); // in [0,PI]
910
911	if ( rfRadians > Radian(0.0) )
912	{
913	if ( rfRadians < Radian(Math::PI) )
914	{
915	rkAxis.x = m[2][1]-m[1][2];
916	rkAxis.y = m[0][2]-m[2][0];
917	rkAxis.z = m[1][0]-m[0][1];
918	rkAxis.normalise();
919	}
920	else
921	{
922	// angle is PI
923	float fHalfInverse;
924	if ( m[0][0] >= m[1][1] )
925	{
926	// r00 >= r11
927	if ( m[0][0] >= m[2][2] )
928	{
929	// r00 is maximum diagonal term
930	rkAxis.x = 0.5*Math::Sqrt(m[0][0] -
931	m[1][1] - m[2][2] + 1.0);
932	fHalfInverse = 0.5/rkAxis.x;
933	rkAxis.y = fHalfInverse*m[0][1];
934	rkAxis.z = fHalfInverse*m[0][2];
935	}
936	else
937	{
938	// r22 is maximum diagonal term
939	rkAxis.z = 0.5*Math::Sqrt(m[2][2] -
940	m[0][0] - m[1][1] + 1.0);
941	fHalfInverse = 0.5/rkAxis.z;
942	rkAxis.x = fHalfInverse*m[0][2];
943	rkAxis.y = fHalfInverse*m[1][2];
944	}
945	}
946	else
947	{
948	// r11 > r00
949	if ( m[1][1] >= m[2][2] )
950	{
951	// r11 is maximum diagonal term
952	rkAxis.y = 0.5*Math::Sqrt(m[1][1] -
953	m[0][0] - m[2][2] + 1.0);
954	fHalfInverse = 0.5/rkAxis.y;
955	rkAxis.x = fHalfInverse*m[0][1];
956	rkAxis.z = fHalfInverse*m[1][2];
957	}
958	else
959	{
960	// r22 is maximum diagonal term
961	rkAxis.z = 0.5*Math::Sqrt(m[2][2] -
962	m[0][0] - m[1][1] + 1.0);
963	fHalfInverse = 0.5/rkAxis.z;
964	rkAxis.x = fHalfInverse*m[0][2];
965	rkAxis.y = fHalfInverse*m[1][2];
966	}
967	}
968	}
969	}
970	else
971	{
972	// The angle is 0 and the matrix is the identity. Any axis will
973	// work, so just use the x-axis.
974	rkAxis.x = 1.0;
975	rkAxis.y = 0.0;
976	rkAxis.z = 0.0;
977	}
978	}
979	//-----------------------------------------------------------------------
980	void Matrix3::FromAxisAngle (const Vector3& rkAxis, const Radian& fRadians)
981	{
982	Real fCos = Math::Cos(fRadians);
983	Real fSin = Math::Sin(fRadians);
984	Real fOneMinusCos = 1.0-fCos;
985	Real fX2 = rkAxis.x*rkAxis.x;
986	Real fY2 = rkAxis.y*rkAxis.y;
987	Real fZ2 = rkAxis.z*rkAxis.z;
988	Real fXYM = rkAxis.xrkAxis.yfOneMinusCos;
989	Real fXZM = rkAxis.xrkAxis.zfOneMinusCos;
990	Real fYZM = rkAxis.yrkAxis.zfOneMinusCos;
991	Real fXSin = rkAxis.x*fSin;
992	Real fYSin = rkAxis.y*fSin;
993	Real fZSin = rkAxis.z*fSin;
994
995	m[0][0] = fX2*fOneMinusCos+fCos;
996	m[0][1] = fXYM-fZSin;
997	m[0][2] = fXZM+fYSin;
998	m[1][0] = fXYM+fZSin;
999	m[1][1] = fY2*fOneMinusCos+fCos;
1000	m[1][2] = fYZM-fXSin;
1001	m[2][0] = fXZM-fYSin;
1002	m[2][1] = fYZM+fXSin;
1003	m[2][2] = fZ2*fOneMinusCos+fCos;
1004	}
1005	//-----------------------------------------------------------------------
1006	bool Matrix3::ToEulerAnglesXYZ (Radian& rfYAngle, Radian& rfPAngle,
1007	Radian& rfRAngle) const
1008	{
1009	// rot = cycz -cysz sy
1010	// czsxsy+cxsz cxcz-sxsysz -cy*sx
1011	// -cxczsy+sxsz czsx+cxsysz cx*cy
1012
1013	rfPAngle = Radian(Math::ASin(m[0][2]));
1014	if ( rfPAngle < Radian(Math::HALF_PI) )
1015	{
1016	if ( rfPAngle > Radian(-Math::HALF_PI) )
1017	{
1018	rfYAngle = Math::ATan2(-m[1][2],m[2][2]);
1019	rfRAngle = Math::ATan2(-m[0][1],m[0][0]);
1020	return true;
1021	}
1022	else
1023	{
1024	// WARNING. Not a unique solution.
1025	Radian fRmY = Math::ATan2(m[1][0],m[1][1]);
1026	rfRAngle = Radian(0.0); // any angle works
1027	rfYAngle = rfRAngle - fRmY;
1028	return false;
1029	}
1030	}
1031	else
1032	{
1033	// WARNING. Not a unique solution.
1034	Radian fRpY = Math::ATan2(m[1][0],m[1][1]);
1035	rfRAngle = Radian(0.0); // any angle works
1036	rfYAngle = fRpY - rfRAngle;
1037	return false;
1038	}
1039	}
1040	//-----------------------------------------------------------------------
1041	bool Matrix3::ToEulerAnglesXZY (Radian& rfYAngle, Radian& rfPAngle,
1042	Radian& rfRAngle) const
1043	{
1044	// rot = cycz -sz czsy
1045	// sxsy+cxcysz cxcz -cysx+cxsy*sz
1046	// -cxsy+cysxsz czsx cxcy+sxsy*sz
1047
1048	rfPAngle = Math::ASin(-m[0][1]);
1049	if ( rfPAngle < Radian(Math::HALF_PI) )
1050	{
1051	if ( rfPAngle > Radian(-Math::HALF_PI) )
1052	{
1053	rfYAngle = Math::ATan2(m[2][1],m[1][1]);
1054	rfRAngle = Math::ATan2(m[0][2],m[0][0]);
1055	return true;
1056	}
1057	else
1058	{
1059	// WARNING. Not a unique solution.
1060	Radian fRmY = Math::ATan2(-m[2][0],m[2][2]);
1061	rfRAngle = Radian(0.0); // any angle works
1062	rfYAngle = rfRAngle - fRmY;
1063	return false;
1064	}
1065	}
1066	else
1067	{
1068	// WARNING. Not a unique solution.
1069	Radian fRpY = Math::ATan2(-m[2][0],m[2][2]);
1070	rfRAngle = Radian(0.0); // any angle works
1071	rfYAngle = fRpY - rfRAngle;
1072	return false;
1073	}
1074	}
1075	//-----------------------------------------------------------------------
1076	bool Matrix3::ToEulerAnglesYXZ (Radian& rfYAngle, Radian& rfPAngle,
1077	Radian& rfRAngle) const
1078	{
1079	// rot = cycz+sxsysz czsxsy-cysz cx*sy
1080	// cxsz cxcz -sx
1081	// -czsy+cysxsz cyczsx+sysz cx*cy
1082
1083	rfPAngle = Math::ASin(-m[1][2]);
1084	if ( rfPAngle < Radian(Math::HALF_PI) )
1085	{
1086	if ( rfPAngle > Radian(-Math::HALF_PI) )
1087	{
1088	rfYAngle = Math::ATan2(m[0][2],m[2][2]);
1089	rfRAngle = Math::ATan2(m[1][0],m[1][1]);
1090	return true;
1091	}
1092	else
1093	{
1094	// WARNING. Not a unique solution.
1095	Radian fRmY = Math::ATan2(-m[0][1],m[0][0]);
1096	rfRAngle = Radian(0.0); // any angle works
1097	rfYAngle = rfRAngle - fRmY;
1098	return false;
1099	}
1100	}
1101	else
1102	{
1103	// WARNING. Not a unique solution.
1104	Radian fRpY = Math::ATan2(-m[0][1],m[0][0]);
1105	rfRAngle = Radian(0.0); // any angle works
1106	rfYAngle = fRpY - rfRAngle;
1107	return false;
1108	}
1109	}
1110	//-----------------------------------------------------------------------
1111	bool Matrix3::ToEulerAnglesYZX (Radian& rfYAngle, Radian& rfPAngle,
1112	Radian& rfRAngle) const
1113	{
1114	// rot = cycz sxsy-cxcysz cxsy+cysx*sz
1115	// sz cxcz -czsx
1116	// -czsy cysx+cxsysz cxcy-sxsy*sz
1117
1118	rfPAngle = Math::ASin(m[1][0]);
1119	if ( rfPAngle < Radian(Math::HALF_PI) )
1120	{
1121	if ( rfPAngle > Radian(-Math::HALF_PI) )
1122	{
1123	rfYAngle = Math::ATan2(-m[2][0],m[0][0]);
1124	rfRAngle = Math::ATan2(-m[1][2],m[1][1]);
1125	return true;
1126	}
1127	else
1128	{
1129	// WARNING. Not a unique solution.
1130	Radian fRmY = Math::ATan2(m[2][1],m[2][2]);
1131	rfRAngle = Radian(0.0); // any angle works
1132	rfYAngle = rfRAngle - fRmY;
1133	return false;
1134	}
1135	}
1136	else
1137	{
1138	// WARNING. Not a unique solution.
1139	Radian fRpY = Math::ATan2(m[2][1],m[2][2]);
1140	rfRAngle = Radian(0.0); // any angle works
1141	rfYAngle = fRpY - rfRAngle;
1142	return false;
1143	}
1144	}
1145	//-----------------------------------------------------------------------
1146	bool Matrix3::ToEulerAnglesZXY (Radian& rfYAngle, Radian& rfPAngle,
1147	Radian& rfRAngle) const
1148	{
1149	// rot = cycz-sxsysz -cxsz czsy+cysx*sz
1150	// czsxsy+cysz cxcz -cyczsx+sy*sz
1151	// -cxsy sx cxcy
1152
1153	rfPAngle = Math::ASin(m[2][1]);
1154	if ( rfPAngle < Radian(Math::HALF_PI) )
1155	{
1156	if ( rfPAngle > Radian(-Math::HALF_PI) )
1157	{
1158	rfYAngle = Math::ATan2(-m[0][1],m[1][1]);
1159	rfRAngle = Math::ATan2(-m[2][0],m[2][2]);
1160	return true;
1161	}
1162	else
1163	{
1164	// WARNING. Not a unique solution.
1165	Radian fRmY = Math::ATan2(m[0][2],m[0][0]);
1166	rfRAngle = Radian(0.0); // any angle works
1167	rfYAngle = rfRAngle - fRmY;
1168	return false;
1169	}
1170	}
1171	else
1172	{
1173	// WARNING. Not a unique solution.
1174	Radian fRpY = Math::ATan2(m[0][2],m[0][0]);
1175	rfRAngle = Radian(0.0); // any angle works
1176	rfYAngle = fRpY - rfRAngle;
1177	return false;
1178	}
1179	}
1180	//-----------------------------------------------------------------------
1181	bool Matrix3::ToEulerAnglesZYX (Radian& rfYAngle, Radian& rfPAngle,
1182	Radian& rfRAngle) const
1183	{
1184	// rot = cycz czsxsy-cxsz cxczsy+sx*sz
1185	// cysz cxcz+sxsysz -czsx+cxsy*sz
1186	// -sy cysx cxcy
1187
1188	rfPAngle = Math::ASin(-m[2][0]);
1189	if ( rfPAngle < Radian(Math::HALF_PI) )
1190	{
1191	if ( rfPAngle > Radian(-Math::HALF_PI) )
1192	{
1193	rfYAngle = Math::ATan2(m[1][0],m[0][0]);
1194	rfRAngle = Math::ATan2(m[2][1],m[2][2]);
1195	return true;
1196	}
1197	else
1198	{
1199	// WARNING. Not a unique solution.
1200	Radian fRmY = Math::ATan2(-m[0][1],m[0][2]);
1201	rfRAngle = Radian(0.0); // any angle works
1202	rfYAngle = rfRAngle - fRmY;
1203	return false;
1204	}
1205	}
1206	else
1207	{
1208	// WARNING. Not a unique solution.
1209	Radian fRpY = Math::ATan2(-m[0][1],m[0][2]);
1210	rfRAngle = Radian(0.0); // any angle works
1211	rfYAngle = fRpY - rfRAngle;
1212	return false;
1213	}
1214	}
1215	//-----------------------------------------------------------------------
1216	void Matrix3::FromEulerAnglesXYZ (const Radian& fYAngle, const Radian& fPAngle,
1217	const Radian& fRAngle)
1218	{
1219	Real fCos, fSin;
1220
1221	fCos = Math::Cos(fYAngle);
1222	fSin = Math::Sin(fYAngle);
1223	Matrix3 kXMat(1.0,0.0,0.0,0.0,fCos,-fSin,0.0,fSin,fCos);
1224
1225	fCos = Math::Cos(fPAngle);
1226	fSin = Math::Sin(fPAngle);
1227	Matrix3 kYMat(fCos,0.0,fSin,0.0,1.0,0.0,-fSin,0.0,fCos);
1228
1229	fCos = Math::Cos(fRAngle);
1230	fSin = Math::Sin(fRAngle);
1231	Matrix3 kZMat(fCos,-fSin,0.0,fSin,fCos,0.0,0.0,0.0,1.0);
1232
1233	this = kXMat(kYMat*kZMat);
1234	}
1235	//-----------------------------------------------------------------------
1236	void Matrix3::FromEulerAnglesXZY (const Radian& fYAngle, const Radian& fPAngle,
1237	const Radian& fRAngle)
1238	{
1239	Real fCos, fSin;
1240
1241	fCos = Math::Cos(fYAngle);
1242	fSin = Math::Sin(fYAngle);
1243	Matrix3 kXMat(1.0,0.0,0.0,0.0,fCos,-fSin,0.0,fSin,fCos);
1244
1245	fCos = Math::Cos(fPAngle);
1246	fSin = Math::Sin(fPAngle);
1247	Matrix3 kZMat(fCos,-fSin,0.0,fSin,fCos,0.0,0.0,0.0,1.0);
1248
1249	fCos = Math::Cos(fRAngle);
1250	fSin = Math::Sin(fRAngle);
1251	Matrix3 kYMat(fCos,0.0,fSin,0.0,1.0,0.0,-fSin,0.0,fCos);
1252
1253	this = kXMat(kZMat*kYMat);
1254	}
1255	//-----------------------------------------------------------------------
1256	void Matrix3::FromEulerAnglesYXZ (const Radian& fYAngle, const Radian& fPAngle,
1257	const Radian& fRAngle)
1258	{
1259	Real fCos, fSin;
1260
1261	fCos = Math::Cos(fYAngle);
1262	fSin = Math::Sin(fYAngle);
1263	Matrix3 kYMat(fCos,0.0,fSin,0.0,1.0,0.0,-fSin,0.0,fCos);
1264
1265	fCos = Math::Cos(fPAngle);
1266	fSin = Math::Sin(fPAngle);
1267	Matrix3 kXMat(1.0,0.0,0.0,0.0,fCos,-fSin,0.0,fSin,fCos);
1268
1269	fCos = Math::Cos(fRAngle);
1270	fSin = Math::Sin(fRAngle);
1271	Matrix3 kZMat(fCos,-fSin,0.0,fSin,fCos,0.0,0.0,0.0,1.0);
1272
1273	this = kYMat(kXMat*kZMat);
1274	}
1275	//-----------------------------------------------------------------------
1276	void Matrix3::FromEulerAnglesYZX (const Radian& fYAngle, const Radian& fPAngle,
1277	const Radian& fRAngle)
1278	{
1279	Real fCos, fSin;
1280
1281	fCos = Math::Cos(fYAngle);
1282	fSin = Math::Sin(fYAngle);
1283	Matrix3 kYMat(fCos,0.0,fSin,0.0,1.0,0.0,-fSin,0.0,fCos);
1284
1285	fCos = Math::Cos(fPAngle);
1286	fSin = Math::Sin(fPAngle);
1287	Matrix3 kZMat(fCos,-fSin,0.0,fSin,fCos,0.0,0.0,0.0,1.0);
1288
1289	fCos = Math::Cos(fRAngle);
1290	fSin = Math::Sin(fRAngle);
1291	Matrix3 kXMat(1.0,0.0,0.0,0.0,fCos,-fSin,0.0,fSin,fCos);
1292
1293	this = kYMat(kZMat*kXMat);
1294	}
1295	//-----------------------------------------------------------------------
1296	void Matrix3::FromEulerAnglesZXY (const Radian& fYAngle, const Radian& fPAngle,
1297	const Radian& fRAngle)
1298	{
1299	Real fCos, fSin;
1300
1301	fCos = Math::Cos(fYAngle);
1302	fSin = Math::Sin(fYAngle);
1303	Matrix3 kZMat(fCos,-fSin,0.0,fSin,fCos,0.0,0.0,0.0,1.0);
1304
1305	fCos = Math::Cos(fPAngle);
1306	fSin = Math::Sin(fPAngle);
1307	Matrix3 kXMat(1.0,0.0,0.0,0.0,fCos,-fSin,0.0,fSin,fCos);
1308
1309	fCos = Math::Cos(fRAngle);
1310	fSin = Math::Sin(fRAngle);
1311	Matrix3 kYMat(fCos,0.0,fSin,0.0,1.0,0.0,-fSin,0.0,fCos);
1312
1313	this = kZMat(kXMat*kYMat);
1314	}
1315	//-----------------------------------------------------------------------
1316	void Matrix3::FromEulerAnglesZYX (const Radian& fYAngle, const Radian& fPAngle,
1317	const Radian& fRAngle)
1318	{
1319	Real fCos, fSin;
1320
1321	fCos = Math::Cos(fYAngle);
1322	fSin = Math::Sin(fYAngle);
1323	Matrix3 kZMat(fCos,-fSin,0.0,fSin,fCos,0.0,0.0,0.0,1.0);
1324
1325	fCos = Math::Cos(fPAngle);
1326	fSin = Math::Sin(fPAngle);
1327	Matrix3 kYMat(fCos,0.0,fSin,0.0,1.0,0.0,-fSin,0.0,fCos);
1328
1329	fCos = Math::Cos(fRAngle);
1330	fSin = Math::Sin(fRAngle);
1331	Matrix3 kXMat(1.0,0.0,0.0,0.0,fCos,-fSin,0.0,fSin,fCos);
1332
1333	this = kZMat(kYMat*kXMat);
1334	}
1335	//-----------------------------------------------------------------------
1336	void Matrix3::Tridiagonal (Real afDiag[3], Real afSubDiag[3])
1337	{
1338	// Householder reduction T = Q^t M Q
1339	// Input:
1340	// mat, symmetric 3x3 matrix M
1341	// Output:
1342	// mat, orthogonal matrix Q
1343	// diag, diagonal entries of T
1344	// subd, subdiagonal entries of T (T is symmetric)
1345
1346	Real fA = m[0][0];
1347	Real fB = m[0][1];
1348	Real fC = m[0][2];
1349	Real fD = m[1][1];
1350	Real fE = m[1][2];
1351	Real fF = m[2][2];
1352
1353	afDiag[0] = fA;
1354	afSubDiag[2] = 0.0;
1355	if ( Math::Abs(fC) >= EPSILON )
1356	{
1357	Real fLength = Math::Sqrt(fBfB+fCfC);
1358	Real fInvLength = 1.0/fLength;
1359	fB *= fInvLength;
1360	fC *= fInvLength;
1361	Real fQ = 2.0fBfE+fC*(fF-fD);
1362	afDiag[1] = fD+fC*fQ;
1363	afDiag[2] = fF-fC*fQ;
1364	afSubDiag[0] = fLength;
1365	afSubDiag[1] = fE-fB*fQ;
1366	m[0][0] = 1.0;
1367	m[0][1] = 0.0;
1368	m[0][2] = 0.0;
1369	m[1][0] = 0.0;
1370	m[1][1] = fB;
1371	m[1][2] = fC;
1372	m[2][0] = 0.0;
1373	m[2][1] = fC;
1374	m[2][2] = -fB;
1375	}
1376	else
1377	{
1378	afDiag[1] = fD;
1379	afDiag[2] = fF;
1380	afSubDiag[0] = fB;
1381	afSubDiag[1] = fE;
1382	m[0][0] = 1.0;
1383	m[0][1] = 0.0;
1384	m[0][2] = 0.0;
1385	m[1][0] = 0.0;
1386	m[1][1] = 1.0;
1387	m[1][2] = 0.0;
1388	m[2][0] = 0.0;
1389	m[2][1] = 0.0;
1390	m[2][2] = 1.0;
1391	}
1392	}
1393	//-----------------------------------------------------------------------
1394	bool Matrix3::QLAlgorithm (Real afDiag[3], Real afSubDiag[3])
1395	{
1396	// QL iteration with implicit shifting to reduce matrix from tridiagonal
1397	// to diagonal
1398
1399	for (int i0 = 0; i0 < 3; i0++)
1400	{
1401	const unsigned int iMaxIter = 32;
1402	unsigned int iIter;
1403	for (iIter = 0; iIter < iMaxIter; iIter++)
1404	{
1405	int i1;
1406	for (i1 = i0; i1 <= 1; i1++)
1407	{
1408	Real fSum = Math::Abs(afDiag[i1]) +
1409	Math::Abs(afDiag[i1+1]);
1410	if ( Math::Abs(afSubDiag[i1]) + fSum == fSum )
1411	break;
1412	}
1413	if ( i1 == i0 )
1414	break;
1415
1416	Real fTmp0 = (afDiag[i0+1]-afDiag[i0])/(2.0*afSubDiag[i0]);
1417	Real fTmp1 = Math::Sqrt(fTmp0*fTmp0+1.0);
1418	if ( fTmp0 < 0.0 )
1419	fTmp0 = afDiag[i1]-afDiag[i0]+afSubDiag[i0]/(fTmp0-fTmp1);
1420	else
1421	fTmp0 = afDiag[i1]-afDiag[i0]+afSubDiag[i0]/(fTmp0+fTmp1);
1422	Real fSin = 1.0;
1423	Real fCos = 1.0;
1424	Real fTmp2 = 0.0;
1425	for (int i2 = i1-1; i2 >= i0; i2--)
1426	{
1427	Real fTmp3 = fSin*afSubDiag[i2];
1428	Real fTmp4 = fCos*afSubDiag[i2];
1429	if ( Math::Abs(fTmp3) >= Math::Abs(fTmp0) )
1430	{
1431	fCos = fTmp0/fTmp3;
1432	fTmp1 = Math::Sqrt(fCos*fCos+1.0);
1433	afSubDiag[i2+1] = fTmp3*fTmp1;
1434	fSin = 1.0/fTmp1;
1435	fCos *= fSin;
1436	}
1437	else
1438	{
1439	fSin = fTmp3/fTmp0;
1440	fTmp1 = Math::Sqrt(fSin*fSin+1.0);
1441	afSubDiag[i2+1] = fTmp0*fTmp1;
1442	fCos = 1.0/fTmp1;
1443	fSin *= fCos;
1444	}
1445	fTmp0 = afDiag[i2+1]-fTmp2;
1446	fTmp1 = (afDiag[i2]-fTmp0)fSin+2.0fTmp4*fCos;
1447	fTmp2 = fSin*fTmp1;
1448	afDiag[i2+1] = fTmp0+fTmp2;
1449	fTmp0 = fCos*fTmp1-fTmp4;
1450
1451	for (int iRow = 0; iRow < 3; iRow++)
1452	{
1453	fTmp3 = m[iRow][i2+1];
1454	m[iRow][i2+1] = fSin*m[iRow][i2] +
1455	fCos*fTmp3;
1456	m[iRow][i2] = fCos*m[iRow][i2] -
1457	fSin*fTmp3;
1458	}
1459	}
1460	afDiag[i0] -= fTmp2;
1461	afSubDiag[i0] = fTmp0;
1462	afSubDiag[i1] = 0.0;
1463	}
1464
1465	if ( iIter == iMaxIter )
1466	{
1467	// should not get here under normal circumstances
1468	return false;
1469	}
1470	}
1471
1472	return true;
1473	}
1474	//-----------------------------------------------------------------------
1475	void Matrix3::EigenSolveSymmetric (Real afEigenvalue[3],
1476	Vector3 akEigenvector[3]) const
1477	{
1478	Matrix3 kMatrix = *this;
1479	Real afSubDiag[3];
1480	kMatrix.Tridiagonal(afEigenvalue,afSubDiag);
1481	kMatrix.QLAlgorithm(afEigenvalue,afSubDiag);
1482
1483	for (size_t i = 0; i < 3; i++)
1484	{
1485	akEigenvector[i][0] = kMatrix[0][i];
1486	akEigenvector[i][1] = kMatrix[1][i];
1487	akEigenvector[i][2] = kMatrix[2][i];
1488	}
1489
1490	// make eigenvectors form a right--handed system
1491	Vector3 kCross = akEigenvector[1].crossProduct(akEigenvector[2]);
1492	Real fDet = akEigenvector[0].dotProduct(kCross);
1493	if ( fDet < 0.0 )
1494	{
1495	akEigenvector[2][0] = - akEigenvector[2][0];
1496	akEigenvector[2][1] = - akEigenvector[2][1];
1497	akEigenvector[2][2] = - akEigenvector[2][2];
1498	}
1499	}
1500	//-----------------------------------------------------------------------
1501	void Matrix3::TensorProduct (const Vector3& rkU, const Vector3& rkV,
1502	Matrix3& rkProduct)
1503	{
1504	for (size_t iRow = 0; iRow < 3; iRow++)
1505	{
1506	for (size_t iCol = 0; iCol < 3; iCol++)
1507	rkProduct[iRow][iCol] = rkU[iRow]*rkV[iCol];
1508	}
1509	}
1510	//-----------------------------------------------------------------------
1511	}

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source: code/forks/sandbox_light/src/external/ogremath/OgreMatrix3.cpp @ 7908

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