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source: code/trunk/src/external/bullet/LinearMath/btMatrix3x3.h @ 11138

Last change on this file since 11138 was 8393, checked in by rgrieder, 15 years ago

Updated Bullet from v2.77 to v2.78.
(I'm not going to make a branch for that since the update from 2.74 to 2.77 hasn't been tested that much either).

You will HAVE to do a complete RECOMPILE! I tested with MSVC and MinGW and they both threw linker errors at me.

Property svn:eol-style set to native

File size: 22.5 KB

Rev	Line
[1963]	1	/*
	2	Copyright (c) 2003-2006 Gino van den Bergen / Erwin Coumans http://continuousphysics.com/Bullet/
	3
	4	This software is provided 'as-is', without any express or implied warranty.
	5	In no event will the authors be held liable for any damages arising from the use of this software.
	6	Permission is granted to anyone to use this software for any purpose,
	7	including commercial applications, and to alter it and redistribute it freely,
	8	subject to the following restrictions:
	9
	10	1. The origin of this software must not be misrepresented; you must not claim that you wrote the original software. If you use this software in a product, an acknowledgment in the product documentation would be appreciated but is not required.
	11	2. Altered source versions must be plainly marked as such, and must not be misrepresented as being the original software.
	12	3. This notice may not be removed or altered from any source distribution.
	13	*/
	14
	15
[8351]	16	#ifndef BT_MATRIX3x3_H
	17	#define BT_MATRIX3x3_H
[1963]	18
	19	#include "btVector3.h"
	20	#include "btQuaternion.h"
	21
[8351]	22	#ifdef BT_USE_DOUBLE_PRECISION
	23	#define btMatrix3x3Data btMatrix3x3DoubleData
	24	#else
	25	#define btMatrix3x3Data btMatrix3x3FloatData
	26	#endif //BT_USE_DOUBLE_PRECISION
[1963]	27
	28
[2430]	29	/**@brief The btMatrix3x3 class implements a 3x3 rotation matrix, to perform linear algebra in combination with btQuaternion, btTransform and btVector3.
[8351]	30	* Make sure to only include a pure orthogonal matrix without scaling. */
[1963]	31	class btMatrix3x3 {
	32
[8351]	33	///Data storage for the matrix, each vector is a row of the matrix
	34	btVector3 m_el[3];
[1963]	35
[8351]	36	public:
	37	/** @brief No initializaion constructor */
	38	btMatrix3x3 () {}
[1963]	39
[8351]	40	// explicit btMatrix3x3(const btScalar *m) { setFromOpenGLSubMatrix(m); }
	41
	42	/*@brief Constructor from Quaternion /
	43	explicit btMatrix3x3(const btQuaternion& q) { setRotation(q); }
	44	/*
	45	template <typename btScalar>
	46	Matrix3x3(const btScalar& yaw, const btScalar& pitch, const btScalar& roll)
	47	{
	48	setEulerYPR(yaw, pitch, roll);
	49	}
	50	*/
	51	/** @brief Constructor with row major formatting */
	52	btMatrix3x3(const btScalar& xx, const btScalar& xy, const btScalar& xz,
	53	const btScalar& yx, const btScalar& yy, const btScalar& yz,
	54	const btScalar& zx, const btScalar& zy, const btScalar& zz)
	55	{
	56	setValue(xx, xy, xz,
	57	yx, yy, yz,
	58	zx, zy, zz);
	59	}
	60	/** @brief Copy constructor */
	61	SIMD_FORCE_INLINE btMatrix3x3 (const btMatrix3x3& other)
	62	{
	63	m_el[0] = other.m_el[0];
	64	m_el[1] = other.m_el[1];
	65	m_el[2] = other.m_el[2];
	66	}
	67	/** @brief Assignment Operator */
	68	SIMD_FORCE_INLINE btMatrix3x3& operator=(const btMatrix3x3& other)
	69	{
	70	m_el[0] = other.m_el[0];
	71	m_el[1] = other.m_el[1];
	72	m_el[2] = other.m_el[2];
	73	return *this;
	74	}
	75
	76	/** @brief Get a column of the matrix as a vector
	77	* @param i Column number 0 indexed */
	78	SIMD_FORCE_INLINE btVector3 getColumn(int i) const
	79	{
	80	return btVector3(m_el[0][i],m_el[1][i],m_el[2][i]);
	81	}
	82
	83
	84	/** @brief Get a row of the matrix as a vector
	85	* @param i Row number 0 indexed */
	86	SIMD_FORCE_INLINE const btVector3& getRow(int i) const
	87	{
	88	btFullAssert(0 <= i && i < 3);
	89	return m_el[i];
	90	}
	91
	92	/** @brief Get a mutable reference to a row of the matrix as a vector
	93	* @param i Row number 0 indexed */
	94	SIMD_FORCE_INLINE btVector3& operator[](int i)
	95	{
	96	btFullAssert(0 <= i && i < 3);
	97	return m_el[i];
	98	}
	99
	100	/** @brief Get a const reference to a row of the matrix as a vector
	101	* @param i Row number 0 indexed */
	102	SIMD_FORCE_INLINE const btVector3& operator[](int i) const
	103	{
	104	btFullAssert(0 <= i && i < 3);
	105	return m_el[i];
	106	}
	107
	108	/** @brief Multiply by the target matrix on the right
	109	* @param m Rotation matrix to be applied
	110	* Equivilant to this = this * m */
	111	btMatrix3x3& operator*=(const btMatrix3x3& m);
	112
[8393]	113	/** @brief Adds by the target matrix on the right
	114	* @param m matrix to be applied
	115	* Equivilant to this = this + m */
	116	btMatrix3x3& operator+=(const btMatrix3x3& m);
	117
	118	/** @brief Substractss by the target matrix on the right
	119	* @param m matrix to be applied
	120	* Equivilant to this = this - m */
	121	btMatrix3x3& operator-=(const btMatrix3x3& m);
	122
	123	/** @brief Set from the rotational part of a 4x4 OpenGL matrix
	124	* @param m A pointer to the beginning of the array of scalars*/
[1963]	125	void setFromOpenGLSubMatrix(const btScalar *m)
[8351]	126	{
	127	m_el[0].setValue(m[0],m[4],m[8]);
	128	m_el[1].setValue(m[1],m[5],m[9]);
	129	m_el[2].setValue(m[2],m[6],m[10]);
[1963]	130
[8351]	131	}
	132	/** @brief Set the values of the matrix explicitly (row major)
	133	* @param xx Top left
	134	* @param xy Top Middle
	135	* @param xz Top Right
	136	* @param yx Middle Left
	137	* @param yy Middle Middle
	138	* @param yz Middle Right
	139	* @param zx Bottom Left
	140	* @param zy Bottom Middle
	141	* @param zz Bottom Right*/
	142	void setValue(const btScalar& xx, const btScalar& xy, const btScalar& xz,
	143	const btScalar& yx, const btScalar& yy, const btScalar& yz,
	144	const btScalar& zx, const btScalar& zy, const btScalar& zz)
	145	{
	146	m_el[0].setValue(xx,xy,xz);
	147	m_el[1].setValue(yx,yy,yz);
	148	m_el[2].setValue(zx,zy,zz);
	149	}
[2430]	150
[8351]	151	/** @brief Set the matrix from a quaternion
	152	* @param q The Quaternion to match */
	153	void setRotation(const btQuaternion& q)
	154	{
	155	btScalar d = q.length2();
	156	btFullAssert(d != btScalar(0.0));
	157	btScalar s = btScalar(2.0) / d;
	158	btScalar xs = q.x() * s, ys = q.y() * s, zs = q.z() * s;
	159	btScalar wx = q.w() * xs, wy = q.w() * ys, wz = q.w() * zs;
	160	btScalar xx = q.x() * xs, xy = q.x() * ys, xz = q.x() * zs;
	161	btScalar yy = q.y() * ys, yz = q.y() * zs, zz = q.z() * zs;
	162	setValue(btScalar(1.0) - (yy + zz), xy - wz, xz + wy,
	163	xy + wz, btScalar(1.0) - (xx + zz), yz - wx,
	164	xz - wy, yz + wx, btScalar(1.0) - (xx + yy));
	165	}
[1963]	166
	167
[8351]	168	/** @brief Set the matrix from euler angles using YPR around YXZ respectively
	169	* @param yaw Yaw about Y axis
	170	* @param pitch Pitch about X axis
	171	* @param roll Roll about Z axis
	172	*/
	173	void setEulerYPR(const btScalar& yaw, const btScalar& pitch, const btScalar& roll)
	174	{
	175	setEulerZYX(roll, pitch, yaw);
	176	}
	177
[2430]	178	/** @brief Set the matrix from euler angles YPR around ZYX axes
[8351]	179	* @param eulerX Roll about X axis
	180	* @param eulerY Pitch around Y axis
	181	* @param eulerZ Yaw aboud Z axis
	182	*
	183	* These angles are used to produce a rotation matrix. The euler
	184	* angles are applied in ZYX order. I.e a vector is first rotated
	185	* about X then Y and then Z
	186	**/
[2430]	187	void setEulerZYX(btScalar eulerX,btScalar eulerY,btScalar eulerZ) {
[8351]	188	///@todo proposed to reverse this since it's labeled zyx but takes arguments xyz and it will match all other parts of the code
[1963]	189	btScalar ci ( btCos(eulerX));
	190	btScalar cj ( btCos(eulerY));
	191	btScalar ch ( btCos(eulerZ));
	192	btScalar si ( btSin(eulerX));
	193	btScalar sj ( btSin(eulerY));
	194	btScalar sh ( btSin(eulerZ));
	195	btScalar cc = ci * ch;
	196	btScalar cs = ci * sh;
	197	btScalar sc = si * ch;
	198	btScalar ss = si * sh;
[8351]	199
[1963]	200	setValue(cj * ch, sj * sc - cs, sj * cc + ss,
[8351]	201	cj * sh, sj * ss + cc, sj * cs - sc,
	202	-sj, cj * si, cj * ci);
[1963]	203	}
	204
[8351]	205	/*@brief Set the matrix to the identity /
	206	void setIdentity()
	207	{
	208	setValue(btScalar(1.0), btScalar(0.0), btScalar(0.0),
	209	btScalar(0.0), btScalar(1.0), btScalar(0.0),
	210	btScalar(0.0), btScalar(0.0), btScalar(1.0));
	211	}
[2882]	212
[8351]	213	static const btMatrix3x3& getIdentity()
	214	{
	215	static const btMatrix3x3 identityMatrix(btScalar(1.0), btScalar(0.0), btScalar(0.0),
	216	btScalar(0.0), btScalar(1.0), btScalar(0.0),
	217	btScalar(0.0), btScalar(0.0), btScalar(1.0));
	218	return identityMatrix;
	219	}
	220
[8393]	221	/**@brief Fill the rotational part of an OpenGL matrix and clear the shear/perspective
[8351]	222	* @param m The array to be filled */
	223	void getOpenGLSubMatrix(btScalar *m) const
	224	{
	225	m[0] = btScalar(m_el[0].x());
	226	m[1] = btScalar(m_el[1].x());
	227	m[2] = btScalar(m_el[2].x());
	228	m[3] = btScalar(0.0);
	229	m[4] = btScalar(m_el[0].y());
	230	m[5] = btScalar(m_el[1].y());
	231	m[6] = btScalar(m_el[2].y());
	232	m[7] = btScalar(0.0);
	233	m[8] = btScalar(m_el[0].z());
	234	m[9] = btScalar(m_el[1].z());
	235	m[10] = btScalar(m_el[2].z());
	236	m[11] = btScalar(0.0);
	237	}
	238
	239	/**@brief Get the matrix represented as a quaternion
	240	* @param q The quaternion which will be set */
	241	void getRotation(btQuaternion& q) const
	242	{
	243	btScalar trace = m_el[0].x() + m_el[1].y() + m_el[2].z();
	244	btScalar temp[4];
	245
	246	if (trace > btScalar(0.0))
[2882]	247	{
[8351]	248	btScalar s = btSqrt(trace + btScalar(1.0));
	249	temp[3]=(s * btScalar(0.5));
	250	s = btScalar(0.5) / s;
	251
	252	temp[0]=((m_el[2].y() - m_el[1].z()) * s);
	253	temp[1]=((m_el[0].z() - m_el[2].x()) * s);
	254	temp[2]=((m_el[1].x() - m_el[0].y()) * s);
	255	}
	256	else
	257	{
	258	int i = m_el[0].x() < m_el[1].y() ?
	259	(m_el[1].y() < m_el[2].z() ? 2 : 1) :
	260	(m_el[0].x() < m_el[2].z() ? 2 : 0);
	261	int j = (i + 1) % 3;
	262	int k = (i + 2) % 3;
	263
	264	btScalar s = btSqrt(m_el[i][i] - m_el[j][j] - m_el[k][k] + btScalar(1.0));
	265	temp[i] = s * btScalar(0.5);
	266	s = btScalar(0.5) / s;
	267
	268	temp[3] = (m_el[k][j] - m_el[j][k]) * s;
	269	temp[j] = (m_el[j][i] + m_el[i][j]) * s;
	270	temp[k] = (m_el[k][i] + m_el[i][k]) * s;
[2882]	271	}
[8351]	272	q.setValue(temp[0],temp[1],temp[2],temp[3]);
	273	}
[2882]	274
[8351]	275	/**@brief Get the matrix represented as euler angles around YXZ, roundtrip with setEulerYPR
	276	* @param yaw Yaw around Y axis
	277	* @param pitch Pitch around X axis
	278	* @param roll around Z axis */
	279	void getEulerYPR(btScalar& yaw, btScalar& pitch, btScalar& roll) const
	280	{
	281
	282	// first use the normal calculus
	283	yaw = btScalar(btAtan2(m_el[1].x(), m_el[0].x()));
	284	pitch = btScalar(btAsin(-m_el[2].x()));
	285	roll = btScalar(btAtan2(m_el[2].y(), m_el[2].z()));
	286
	287	// on pitch = +/-HalfPI
	288	if (btFabs(pitch)==SIMD_HALF_PI)
[1963]	289	{
[8351]	290	if (yaw>0)
	291	yaw-=SIMD_PI;
	292	else
	293	yaw+=SIMD_PI;
	294
	295	if (roll>0)
	296	roll-=SIMD_PI;
	297	else
	298	roll+=SIMD_PI;
[1963]	299	}
[8351]	300	};
[1963]	301
[8351]	302
	303	/**@brief Get the matrix represented as euler angles around ZYX
	304	* @param yaw Yaw around X axis
	305	* @param pitch Pitch around Y axis
	306	* @param roll around X axis
	307	* @param solution_number Which solution of two possible solutions ( 1 or 2) are possible values*/
	308	void getEulerZYX(btScalar& yaw, btScalar& pitch, btScalar& roll, unsigned int solution_number = 1) const
	309	{
	310	struct Euler
[1963]	311	{
[8351]	312	btScalar yaw;
	313	btScalar pitch;
	314	btScalar roll;
	315	};
	316
	317	Euler euler_out;
	318	Euler euler_out2; //second solution
	319	//get the pointer to the raw data
	320
	321	// Check that pitch is not at a singularity
	322	if (btFabs(m_el[2].x()) >= 1)
	323	{
	324	euler_out.yaw = 0;
	325	euler_out2.yaw = 0;
	326
	327	// From difference of angles formula
	328	btScalar delta = btAtan2(m_el[0].x(),m_el[0].z());
	329	if (m_el[2].x() > 0) //gimbal locked up
[1963]	330	{
[8351]	331	euler_out.pitch = SIMD_PI / btScalar(2.0);
	332	euler_out2.pitch = SIMD_PI / btScalar(2.0);
	333	euler_out.roll = euler_out.pitch + delta;
	334	euler_out2.roll = euler_out.pitch + delta;
	335	}
	336	else // gimbal locked down
[1963]	337	{
[8351]	338	euler_out.pitch = -SIMD_PI / btScalar(2.0);
	339	euler_out2.pitch = -SIMD_PI / btScalar(2.0);
	340	euler_out.roll = -euler_out.pitch + delta;
	341	euler_out2.roll = -euler_out.pitch + delta;
[1963]	342	}
	343	}
[8351]	344	else
[1963]	345	{
[8351]	346	euler_out.pitch = - btAsin(m_el[2].x());
	347	euler_out2.pitch = SIMD_PI - euler_out.pitch;
[2430]	348
[8351]	349	euler_out.roll = btAtan2(m_el[2].y()/btCos(euler_out.pitch),
	350	m_el[2].z()/btCos(euler_out.pitch));
	351	euler_out2.roll = btAtan2(m_el[2].y()/btCos(euler_out2.pitch),
[2430]	352	m_el[2].z()/btCos(euler_out2.pitch));
	353
[8351]	354	euler_out.yaw = btAtan2(m_el[1].x()/btCos(euler_out.pitch),
	355	m_el[0].x()/btCos(euler_out.pitch));
	356	euler_out2.yaw = btAtan2(m_el[1].x()/btCos(euler_out2.pitch),
	357	m_el[0].x()/btCos(euler_out2.pitch));
[1963]	358	}
	359
[8351]	360	if (solution_number == 1)
	361	{
	362	yaw = euler_out.yaw;
	363	pitch = euler_out.pitch;
	364	roll = euler_out.roll;
[1963]	365	}
[8351]	366	else
	367	{
	368	yaw = euler_out2.yaw;
	369	pitch = euler_out2.pitch;
	370	roll = euler_out2.roll;
[1963]	371	}
[8351]	372	}
[1963]	373
[8351]	374	/**@brief Create a scaled copy of the matrix
	375	* @param s Scaling vector The elements of the vector will scale each column */
	376
	377	btMatrix3x3 scaled(const btVector3& s) const
	378	{
	379	return btMatrix3x3(m_el[0].x() * s.x(), m_el[0].y() * s.y(), m_el[0].z() * s.z(),
	380	m_el[1].x() * s.x(), m_el[1].y() * s.y(), m_el[1].z() * s.z(),
	381	m_el[2].x() * s.x(), m_el[2].y() * s.y(), m_el[2].z() * s.z());
	382	}
	383
	384	/*@brief Return the determinant of the matrix /
	385	btScalar determinant() const;
	386	/*@brief Return the adjoint of the matrix /
	387	btMatrix3x3 adjoint() const;
	388	/*@brief Return the matrix with all values non negative /
	389	btMatrix3x3 absolute() const;
	390	/*@brief Return the transpose of the matrix /
	391	btMatrix3x3 transpose() const;
	392	/*@brief Return the inverse of the matrix /
	393	btMatrix3x3 inverse() const;
	394
	395	btMatrix3x3 transposeTimes(const btMatrix3x3& m) const;
	396	btMatrix3x3 timesTranspose(const btMatrix3x3& m) const;
	397
	398	SIMD_FORCE_INLINE btScalar tdotx(const btVector3& v) const
	399	{
	400	return m_el[0].x() * v.x() + m_el[1].x() * v.y() + m_el[2].x() * v.z();
	401	}
	402	SIMD_FORCE_INLINE btScalar tdoty(const btVector3& v) const
	403	{
	404	return m_el[0].y() * v.x() + m_el[1].y() * v.y() + m_el[2].y() * v.z();
	405	}
	406	SIMD_FORCE_INLINE btScalar tdotz(const btVector3& v) const
	407	{
	408	return m_el[0].z() * v.x() + m_el[1].z() * v.y() + m_el[2].z() * v.z();
	409	}
	410
	411
	412	/**@brief diagonalizes this matrix by the Jacobi method.
	413	* @param rot stores the rotation from the coordinate system in which the matrix is diagonal to the original
	414	* coordinate system, i.e., old_this = rot * new_this * rot^T.
	415	* @param threshold See iteration
	416	* @param iteration The iteration stops when all off-diagonal elements are less than the threshold multiplied
	417	* by the sum of the absolute values of the diagonal, or when maxSteps have been executed.
	418	*
	419	* Note that this matrix is assumed to be symmetric.
	420	*/
	421	void diagonalize(btMatrix3x3& rot, btScalar threshold, int maxSteps)
	422	{
	423	rot.setIdentity();
	424	for (int step = maxSteps; step > 0; step--)
[1963]	425	{
	426	// find off-diagonal element [p][q] with largest magnitude
	427	int p = 0;
	428	int q = 1;
	429	int r = 2;
	430	btScalar max = btFabs(m_el[0][1]);
	431	btScalar v = btFabs(m_el[0][2]);
	432	if (v > max)
	433	{
[8351]	434	q = 2;
	435	r = 1;
	436	max = v;
[1963]	437	}
	438	v = btFabs(m_el[1][2]);
	439	if (v > max)
	440	{
[8351]	441	p = 1;
	442	q = 2;
	443	r = 0;
	444	max = v;
[1963]	445	}
	446
	447	btScalar t = threshold * (btFabs(m_el[0][0]) + btFabs(m_el[1][1]) + btFabs(m_el[2][2]));
	448	if (max <= t)
	449	{
[8351]	450	if (max <= SIMD_EPSILON * t)
	451	{
	452	return;
	453	}
	454	step = 1;
[1963]	455	}
	456
	457	// compute Jacobi rotation J which leads to a zero for element [p][q]
	458	btScalar mpq = m_el[p][q];
	459	btScalar theta = (m_el[q][q] - m_el[p][p]) / (2 * mpq);
	460	btScalar theta2 = theta * theta;
	461	btScalar cos;
	462	btScalar sin;
	463	if (theta2 * theta2 < btScalar(10 / SIMD_EPSILON))
	464	{
[8351]	465	t = (theta >= 0) ? 1 / (theta + btSqrt(1 + theta2))
	466	: 1 / (theta - btSqrt(1 + theta2));
	467	cos = 1 / btSqrt(1 + t * t);
	468	sin = cos * t;
[1963]	469	}
	470	else
	471	{
[8351]	472	// approximation for large theta-value, i.e., a nearly diagonal matrix
	473	t = 1 / (theta * (2 + btScalar(0.5) / theta2));
	474	cos = 1 - btScalar(0.5) * t * t;
	475	sin = cos * t;
[1963]	476	}
	477
	478	// apply rotation to matrix (this = J^T * this * J)
	479	m_el[p][q] = m_el[q][p] = 0;
	480	m_el[p][p] -= t * mpq;
	481	m_el[q][q] += t * mpq;
	482	btScalar mrp = m_el[r][p];
	483	btScalar mrq = m_el[r][q];
	484	m_el[r][p] = m_el[p][r] = cos * mrp - sin * mrq;
	485	m_el[r][q] = m_el[q][r] = cos * mrq + sin * mrp;
	486
	487	// apply rotation to rot (rot = rot * J)
	488	for (int i = 0; i < 3; i++)
	489	{
[8351]	490	btVector3& row = rot[i];
	491	mrp = row[p];
	492	mrq = row[q];
	493	row[p] = cos * mrp - sin * mrq;
	494	row[q] = cos * mrq + sin * mrp;
[1963]	495	}
	496	}
[8351]	497	}
[1963]	498
	499
	500
	501
[8351]	502	/**@brief Calculate the matrix cofactor
	503	* @param r1 The first row to use for calculating the cofactor
	504	* @param c1 The first column to use for calculating the cofactor
	505	* @param r1 The second row to use for calculating the cofactor
	506	* @param c1 The second column to use for calculating the cofactor
	507	* See http://en.wikipedia.org/wiki/Cofactor_(linear_algebra) for more details
	508	*/
	509	btScalar cofac(int r1, int c1, int r2, int c2) const
[1963]	510	{
[8351]	511	return m_el[r1][c1] * m_el[r2][c2] - m_el[r1][c2] * m_el[r2][c1];
[1963]	512	}
	513
[8351]	514	void serialize(struct btMatrix3x3Data& dataOut) const;
[1963]	515
[8351]	516	void serializeFloat(struct btMatrix3x3FloatData& dataOut) const;
[1963]	517
[8351]	518	void deSerialize(const struct btMatrix3x3Data& dataIn);
[1963]	519
[8351]	520	void deSerializeFloat(const struct btMatrix3x3FloatData& dataIn);
	521
	522	void deSerializeDouble(const struct btMatrix3x3DoubleData& dataIn);
	523
	524	};
	525
	526
	527	SIMD_FORCE_INLINE btMatrix3x3&
	528	btMatrix3x3::operator*=(const btMatrix3x3& m)
	529	{
	530	setValue(m.tdotx(m_el[0]), m.tdoty(m_el[0]), m.tdotz(m_el[0]),
	531	m.tdotx(m_el[1]), m.tdoty(m_el[1]), m.tdotz(m_el[1]),
	532	m.tdotx(m_el[2]), m.tdoty(m_el[2]), m.tdotz(m_el[2]));
	533	return *this;
	534	}
	535
[8393]	536	SIMD_FORCE_INLINE btMatrix3x3&
	537	btMatrix3x3::operator+=(const btMatrix3x3& m)
	538	{
	539	setValue(
	540	m_el[0][0]+m.m_el[0][0],
	541	m_el[0][1]+m.m_el[0][1],
	542	m_el[0][2]+m.m_el[0][2],
	543	m_el[1][0]+m.m_el[1][0],
	544	m_el[1][1]+m.m_el[1][1],
	545	m_el[1][2]+m.m_el[1][2],
	546	m_el[2][0]+m.m_el[2][0],
	547	m_el[2][1]+m.m_el[2][1],
	548	m_el[2][2]+m.m_el[2][2]);
	549	return *this;
	550	}
	551
	552	SIMD_FORCE_INLINE btMatrix3x3
	553	operator*(const btMatrix3x3& m, const btScalar & k)
	554	{
	555	return btMatrix3x3(
	556	m[0].x()k,m[0].y()k,m[0].z()*k,
	557	m[1].x()k,m[1].y()k,m[1].z()*k,
	558	m[2].x()k,m[2].y()k,m[2].z()*k);
	559	}
	560
	561	SIMD_FORCE_INLINE btMatrix3x3
	562	operator+(const btMatrix3x3& m1, const btMatrix3x3& m2)
	563	{
	564	return btMatrix3x3(
	565	m1[0][0]+m2[0][0],
	566	m1[0][1]+m2[0][1],
	567	m1[0][2]+m2[0][2],
	568	m1[1][0]+m2[1][0],
	569	m1[1][1]+m2[1][1],
	570	m1[1][2]+m2[1][2],
	571	m1[2][0]+m2[2][0],
	572	m1[2][1]+m2[2][1],
	573	m1[2][2]+m2[2][2]);
	574	}
	575
	576	SIMD_FORCE_INLINE btMatrix3x3
	577	operator-(const btMatrix3x3& m1, const btMatrix3x3& m2)
	578	{
	579	return btMatrix3x3(
	580	m1[0][0]-m2[0][0],
	581	m1[0][1]-m2[0][1],
	582	m1[0][2]-m2[0][2],
	583	m1[1][0]-m2[1][0],
	584	m1[1][1]-m2[1][1],
	585	m1[1][2]-m2[1][2],
	586	m1[2][0]-m2[2][0],
	587	m1[2][1]-m2[2][1],
	588	m1[2][2]-m2[2][2]);
	589	}
	590
	591
	592	SIMD_FORCE_INLINE btMatrix3x3&
	593	btMatrix3x3::operator-=(const btMatrix3x3& m)
	594	{
	595	setValue(
	596	m_el[0][0]-m.m_el[0][0],
	597	m_el[0][1]-m.m_el[0][1],
	598	m_el[0][2]-m.m_el[0][2],
	599	m_el[1][0]-m.m_el[1][0],
	600	m_el[1][1]-m.m_el[1][1],
	601	m_el[1][2]-m.m_el[1][2],
	602	m_el[2][0]-m.m_el[2][0],
	603	m_el[2][1]-m.m_el[2][1],
	604	m_el[2][2]-m.m_el[2][2]);
	605	return *this;
	606	}
	607
	608
[8351]	609	SIMD_FORCE_INLINE btScalar
	610	btMatrix3x3::determinant() const
	611	{
	612	return btTriple((this)[0], (this)[1], (*this)[2]);
	613	}
	614
	615
	616	SIMD_FORCE_INLINE btMatrix3x3
	617	btMatrix3x3::absolute() const
	618	{
	619	return btMatrix3x3(
	620	btFabs(m_el[0].x()), btFabs(m_el[0].y()), btFabs(m_el[0].z()),
	621	btFabs(m_el[1].x()), btFabs(m_el[1].y()), btFabs(m_el[1].z()),
	622	btFabs(m_el[2].x()), btFabs(m_el[2].y()), btFabs(m_el[2].z()));
	623	}
	624
	625	SIMD_FORCE_INLINE btMatrix3x3
	626	btMatrix3x3::transpose() const
	627	{
	628	return btMatrix3x3(m_el[0].x(), m_el[1].x(), m_el[2].x(),
	629	m_el[0].y(), m_el[1].y(), m_el[2].y(),
	630	m_el[0].z(), m_el[1].z(), m_el[2].z());
	631	}
	632
	633	SIMD_FORCE_INLINE btMatrix3x3
	634	btMatrix3x3::adjoint() const
	635	{
	636	return btMatrix3x3(cofac(1, 1, 2, 2), cofac(0, 2, 2, 1), cofac(0, 1, 1, 2),
	637	cofac(1, 2, 2, 0), cofac(0, 0, 2, 2), cofac(0, 2, 1, 0),
	638	cofac(1, 0, 2, 1), cofac(0, 1, 2, 0), cofac(0, 0, 1, 1));
	639	}
	640
	641	SIMD_FORCE_INLINE btMatrix3x3
	642	btMatrix3x3::inverse() const
	643	{
	644	btVector3 co(cofac(1, 1, 2, 2), cofac(1, 2, 2, 0), cofac(1, 0, 2, 1));
	645	btScalar det = (*this)[0].dot(co);
	646	btFullAssert(det != btScalar(0.0));
	647	btScalar s = btScalar(1.0) / det;
	648	return btMatrix3x3(co.x() * s, cofac(0, 2, 2, 1) * s, cofac(0, 1, 1, 2) * s,
	649	co.y() * s, cofac(0, 0, 2, 2) * s, cofac(0, 2, 1, 0) * s,
	650	co.z() * s, cofac(0, 1, 2, 0) * s, cofac(0, 0, 1, 1) * s);
	651	}
	652
	653	SIMD_FORCE_INLINE btMatrix3x3
	654	btMatrix3x3::transposeTimes(const btMatrix3x3& m) const
	655	{
	656	return btMatrix3x3(
	657	m_el[0].x() * m[0].x() + m_el[1].x() * m[1].x() + m_el[2].x() * m[2].x(),
	658	m_el[0].x() * m[0].y() + m_el[1].x() * m[1].y() + m_el[2].x() * m[2].y(),
	659	m_el[0].x() * m[0].z() + m_el[1].x() * m[1].z() + m_el[2].x() * m[2].z(),
	660	m_el[0].y() * m[0].x() + m_el[1].y() * m[1].x() + m_el[2].y() * m[2].x(),
	661	m_el[0].y() * m[0].y() + m_el[1].y() * m[1].y() + m_el[2].y() * m[2].y(),
	662	m_el[0].y() * m[0].z() + m_el[1].y() * m[1].z() + m_el[2].y() * m[2].z(),
	663	m_el[0].z() * m[0].x() + m_el[1].z() * m[1].x() + m_el[2].z() * m[2].x(),
	664	m_el[0].z() * m[0].y() + m_el[1].z() * m[1].y() + m_el[2].z() * m[2].y(),
	665	m_el[0].z() * m[0].z() + m_el[1].z() * m[1].z() + m_el[2].z() * m[2].z());
	666	}
	667
	668	SIMD_FORCE_INLINE btMatrix3x3
	669	btMatrix3x3::timesTranspose(const btMatrix3x3& m) const
	670	{
	671	return btMatrix3x3(
	672	m_el[0].dot(m[0]), m_el[0].dot(m[1]), m_el[0].dot(m[2]),
	673	m_el[1].dot(m[0]), m_el[1].dot(m[1]), m_el[1].dot(m[2]),
	674	m_el[2].dot(m[0]), m_el[2].dot(m[1]), m_el[2].dot(m[2]));
	675
	676	}
	677
	678	SIMD_FORCE_INLINE btVector3
	679	operator*(const btMatrix3x3& m, const btVector3& v)
	680	{
	681	return btVector3(m[0].dot(v), m[1].dot(v), m[2].dot(v));
	682	}
	683
	684
	685	SIMD_FORCE_INLINE btVector3
	686	operator*(const btVector3& v, const btMatrix3x3& m)
	687	{
	688	return btVector3(m.tdotx(v), m.tdoty(v), m.tdotz(v));
	689	}
	690
	691	SIMD_FORCE_INLINE btMatrix3x3
	692	operator*(const btMatrix3x3& m1, const btMatrix3x3& m2)
	693	{
	694	return btMatrix3x3(
	695	m2.tdotx( m1[0]), m2.tdoty( m1[0]), m2.tdotz( m1[0]),
	696	m2.tdotx( m1[1]), m2.tdoty( m1[1]), m2.tdotz( m1[1]),
	697	m2.tdotx( m1[2]), m2.tdoty( m1[2]), m2.tdotz( m1[2]));
	698	}
	699
[1963]	700	/*
[8351]	701	SIMD_FORCE_INLINE btMatrix3x3 btMultTransposeLeft(const btMatrix3x3& m1, const btMatrix3x3& m2) {
	702	return btMatrix3x3(
	703	m1[0][0] * m2[0][0] + m1[1][0] * m2[1][0] + m1[2][0] * m2[2][0],
	704	m1[0][0] * m2[0][1] + m1[1][0] * m2[1][1] + m1[2][0] * m2[2][1],
	705	m1[0][0] * m2[0][2] + m1[1][0] * m2[1][2] + m1[2][0] * m2[2][2],
	706	m1[0][1] * m2[0][0] + m1[1][1] * m2[1][0] + m1[2][1] * m2[2][0],
	707	m1[0][1] * m2[0][1] + m1[1][1] * m2[1][1] + m1[2][1] * m2[2][1],
	708	m1[0][1] * m2[0][2] + m1[1][1] * m2[1][2] + m1[2][1] * m2[2][2],
	709	m1[0][2] * m2[0][0] + m1[1][2] * m2[1][0] + m1[2][2] * m2[2][0],
	710	m1[0][2] * m2[0][1] + m1[1][2] * m2[1][1] + m1[2][2] * m2[2][1],
	711	m1[0][2] * m2[0][2] + m1[1][2] * m2[1][2] + m1[2][2] * m2[2][2]);
[1963]	712	}
	713	*/
	714
[2430]	715	/**@brief Equality operator between two matrices
[8351]	716	* It will test all elements are equal. */
[1963]	717	SIMD_FORCE_INLINE bool operator==(const btMatrix3x3& m1, const btMatrix3x3& m2)
	718	{
[8351]	719	return ( m1[0][0] == m2[0][0] && m1[1][0] == m2[1][0] && m1[2][0] == m2[2][0] &&
	720	m1[0][1] == m2[0][1] && m1[1][1] == m2[1][1] && m1[2][1] == m2[2][1] &&
	721	m1[0][2] == m2[0][2] && m1[1][2] == m2[1][2] && m1[2][2] == m2[2][2] );
[1963]	722	}
	723
[8351]	724	///for serialization
	725	struct btMatrix3x3FloatData
	726	{
	727	btVector3FloatData m_el[3];
	728	};
	729
	730	///for serialization
	731	struct btMatrix3x3DoubleData
	732	{
	733	btVector3DoubleData m_el[3];
	734	};
	735
	736
	737
	738
	739	SIMD_FORCE_INLINE void btMatrix3x3::serialize(struct btMatrix3x3Data& dataOut) const
	740	{
	741	for (int i=0;i<3;i++)
	742	m_el[i].serialize(dataOut.m_el[i]);
	743	}
	744
	745	SIMD_FORCE_INLINE void btMatrix3x3::serializeFloat(struct btMatrix3x3FloatData& dataOut) const
	746	{
	747	for (int i=0;i<3;i++)
	748	m_el[i].serializeFloat(dataOut.m_el[i]);
	749	}
	750
	751
	752	SIMD_FORCE_INLINE void btMatrix3x3::deSerialize(const struct btMatrix3x3Data& dataIn)
	753	{
	754	for (int i=0;i<3;i++)
	755	m_el[i].deSerialize(dataIn.m_el[i]);
	756	}
	757
	758	SIMD_FORCE_INLINE void btMatrix3x3::deSerializeFloat(const struct btMatrix3x3FloatData& dataIn)
	759	{
	760	for (int i=0;i<3;i++)
	761	m_el[i].deSerializeFloat(dataIn.m_el[i]);
	762	}
	763
	764	SIMD_FORCE_INLINE void btMatrix3x3::deSerializeDouble(const struct btMatrix3x3DoubleData& dataIn)
	765	{
	766	for (int i=0;i<3;i++)
	767	m_el[i].deSerializeDouble(dataIn.m_el[i]);
	768	}
	769
	770	#endif //BT_MATRIX3x3_H
	771

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