393 lines
12 KiB
C++
393 lines
12 KiB
C++
/** \file itasc/kdl/frames.cpp
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* \ingroup itasc
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*/
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/***************************************************************************
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frames.cxx - description
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-------------------------
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begin : June 2006
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copyright : (C) 2006 Erwin Aertbelien
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email : firstname.lastname@mech.kuleuven.ac.be
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History (only major changes)( AUTHOR-Description ) :
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***************************************************************************
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* This library is free software; you can redistribute it and/or *
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* modify it under the terms of the GNU Lesser General Public *
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* License as published by the Free Software Foundation; either *
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* version 2.1 of the License, or (at your option) any later version. *
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* *
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* This library is distributed in the hope that it will be useful, *
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* but WITHOUT ANY WARRANTY; without even the implied warranty of *
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* MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU *
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* Lesser General Public License for more details. *
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* *
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* You should have received a copy of the GNU Lesser General Public *
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* License along with this library; if not, write to the Free Software *
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* Foundation, Inc., 51 Franklin Street, *
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* Fifth Floor, Boston, MA 02110-1301, USA. *
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* *
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***************************************************************************/
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#include "frames.hpp"
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namespace KDL {
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#ifndef KDL_INLINE
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#include "frames.inl"
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#endif
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void Frame::Make4x4(double * d)
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{
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int i;
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int j;
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for (i=0;i<3;i++) {
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for (j=0;j<3;j++)
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d[i*4+j]=M(i,j);
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d[i*4+3] = p(i)/1000;
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}
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for (j=0;j<3;j++)
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d[12+j] = 0.;
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d[15] = 1;
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}
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Frame Frame::DH_Craig1989(double a,double alpha,double d,double theta)
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// returns Modified Denavit-Hartenberg parameters (According to Craig)
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{
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double ct,st,ca,sa;
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ct = cos(theta);
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st = sin(theta);
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sa = sin(alpha);
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ca = cos(alpha);
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return Frame(Rotation(
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ct, -st, 0,
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st*ca, ct*ca, -sa,
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st*sa, ct*sa, ca ),
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Vector(
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a, -sa*d, ca*d )
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);
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}
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Frame Frame::DH(double a,double alpha,double d,double theta)
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// returns Denavit-Hartenberg parameters (Non-Modified DH)
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{
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double ct,st,ca,sa;
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ct = cos(theta);
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st = sin(theta);
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sa = sin(alpha);
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ca = cos(alpha);
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return Frame(Rotation(
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ct, -st*ca, st*sa,
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st, ct*ca, -ct*sa,
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0, sa, ca ),
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Vector(
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a*ct, a*st, d )
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);
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}
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double Vector2::Norm() const
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{
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double tmp0 = fabs(data[0]);
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double tmp1 = fabs(data[1]);
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if (tmp0 >= tmp1) {
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if (tmp1 == 0)
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return 0;
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return tmp0*sqrt(1+sqr(tmp1/tmp0));
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} else {
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return tmp1*sqrt(1+sqr(tmp0/tmp1));
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}
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}
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// makes v a unitvector and returns the norm of v.
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// if v is smaller than eps, Vector(1,0,0) is returned with norm 0.
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// if this is not good, check the return value of this method.
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double Vector2::Normalize(double eps) {
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double v = this->Norm();
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if (v < eps) {
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*this = Vector2(1,0);
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return v;
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} else {
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*this = (*this)/v;
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return v;
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}
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}
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// do some effort not to lose precision
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double Vector::Norm() const
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{
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double tmp1;
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double tmp2;
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tmp1 = fabs(data[0]);
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tmp2 = fabs(data[1]);
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if (tmp1 >= tmp2) {
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tmp2=fabs(data[2]);
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if (tmp1 >= tmp2) {
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if (tmp1 == 0) {
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// only to everything exactly zero case, all other are handled correctly
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return 0;
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}
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return tmp1*sqrt(1+sqr(data[1]/data[0])+sqr(data[2]/data[0]));
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} else {
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return tmp2*sqrt(1+sqr(data[0]/data[2])+sqr(data[1]/data[2]));
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}
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} else {
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tmp1=fabs(data[2]);
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if (tmp2 > tmp1) {
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return tmp2*sqrt(1+sqr(data[0]/data[1])+sqr(data[2]/data[1]));
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} else {
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return tmp1*sqrt(1+sqr(data[0]/data[2])+sqr(data[1]/data[2]));
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}
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}
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}
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// makes v a unitvector and returns the norm of v.
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// if v is smaller than eps, Vector(1,0,0) is returned with norm 0.
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// if this is not good, check the return value of this method.
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double Vector::Normalize(double eps) {
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double v = this->Norm();
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if (v < eps) {
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*this = Vector(1,0,0);
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return v;
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} else {
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*this = (*this)/v;
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return v;
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}
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}
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bool Equal(const Rotation& a,const Rotation& b,double eps) {
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return (Equal(a.data[0],b.data[0],eps) &&
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Equal(a.data[1],b.data[1],eps) &&
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Equal(a.data[2],b.data[2],eps) &&
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Equal(a.data[3],b.data[3],eps) &&
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Equal(a.data[4],b.data[4],eps) &&
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Equal(a.data[5],b.data[5],eps) &&
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Equal(a.data[6],b.data[6],eps) &&
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Equal(a.data[7],b.data[7],eps) &&
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Equal(a.data[8],b.data[8],eps) );
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}
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void Rotation::Ortho()
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{
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double n;
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n=sqrt(sqr(data[0])+sqr(data[3])+sqr(data[6]));n=(n>1e-10)?1.0/n:0.0;data[0]*=n;data[3]*=n;data[6]*=n;
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n=sqrt(sqr(data[1])+sqr(data[4])+sqr(data[7]));n=(n>1e-10)?1.0/n:0.0;data[1]*=n;data[4]*=n;data[7]*=n;
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n=sqrt(sqr(data[2])+sqr(data[5])+sqr(data[8]));n=(n>1e-10)?1.0/n:0.0;data[2]*=n;data[5]*=n;data[8]*=n;
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}
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Rotation operator *(const Rotation& lhs,const Rotation& rhs)
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// Complexity : 27M+27A
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{
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return Rotation(
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lhs.data[0]*rhs.data[0]+lhs.data[1]*rhs.data[3]+lhs.data[2]*rhs.data[6],
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lhs.data[0]*rhs.data[1]+lhs.data[1]*rhs.data[4]+lhs.data[2]*rhs.data[7],
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lhs.data[0]*rhs.data[2]+lhs.data[1]*rhs.data[5]+lhs.data[2]*rhs.data[8],
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lhs.data[3]*rhs.data[0]+lhs.data[4]*rhs.data[3]+lhs.data[5]*rhs.data[6],
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lhs.data[3]*rhs.data[1]+lhs.data[4]*rhs.data[4]+lhs.data[5]*rhs.data[7],
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lhs.data[3]*rhs.data[2]+lhs.data[4]*rhs.data[5]+lhs.data[5]*rhs.data[8],
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lhs.data[6]*rhs.data[0]+lhs.data[7]*rhs.data[3]+lhs.data[8]*rhs.data[6],
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lhs.data[6]*rhs.data[1]+lhs.data[7]*rhs.data[4]+lhs.data[8]*rhs.data[7],
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lhs.data[6]*rhs.data[2]+lhs.data[7]*rhs.data[5]+lhs.data[8]*rhs.data[8]
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);
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}
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Rotation Rotation::RPY(double roll,double pitch,double yaw)
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{
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double ca1,cb1,cc1,sa1,sb1,sc1;
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ca1 = cos(yaw); sa1 = sin(yaw);
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cb1 = cos(pitch);sb1 = sin(pitch);
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cc1 = cos(roll);sc1 = sin(roll);
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return Rotation(ca1*cb1,ca1*sb1*sc1 - sa1*cc1,ca1*sb1*cc1 + sa1*sc1,
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sa1*cb1,sa1*sb1*sc1 + ca1*cc1,sa1*sb1*cc1 - ca1*sc1,
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-sb1,cb1*sc1,cb1*cc1);
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}
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// Gives back a rotation matrix specified with RPY convention
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void Rotation::GetRPY(double& roll,double& pitch,double& yaw) const
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{
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if (fabs(data[6]) > 1.0 - epsilon ) {
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roll = -sign(data[6]) * atan2(data[1], data[4]);
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pitch= -sign(data[6]) * PI / 2;
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yaw = 0.0 ;
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} else {
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roll = atan2(data[7], data[8]);
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pitch = atan2(-data[6], sqrt( sqr(data[0]) +sqr(data[3]) ) );
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yaw = atan2(data[3], data[0]);
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}
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}
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Rotation Rotation::EulerZYZ(double Alfa,double Beta,double Gamma) {
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double sa,ca,sb,cb,sg,cg;
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sa = sin(Alfa);ca = cos(Alfa);
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sb = sin(Beta);cb = cos(Beta);
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sg = sin(Gamma);cg = cos(Gamma);
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return Rotation( ca*cb*cg-sa*sg, -ca*cb*sg-sa*cg, ca*sb,
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sa*cb*cg+ca*sg, -sa*cb*sg+ca*cg, sa*sb,
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-sb*cg , sb*sg, cb
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);
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}
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void Rotation::GetEulerZYZ(double& alfa,double& beta,double& gamma) const {
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if (fabs(data[6]) < epsilon ) {
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alfa=0.0;
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if (data[8]>0) {
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beta = 0.0;
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gamma= atan2(-data[1],data[0]);
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} else {
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beta = PI;
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gamma= atan2(data[1],-data[0]);
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}
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} else {
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alfa=atan2(data[5], data[2]);
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beta=atan2(sqrt( sqr(data[6]) +sqr(data[7]) ),data[8]);
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gamma=atan2(data[7], -data[6]);
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}
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}
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Rotation Rotation::Rot(const Vector& rotaxis,double angle) {
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// The formula is
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// V.(V.tr) + st*[V x] + ct*(I-V.(V.tr))
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// can be found by multiplying it with an arbitrary vector p
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// and noting that this vector is rotated.
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double ct = cos(angle);
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double st = sin(angle);
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double vt = 1-ct;
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Vector rotvec = rotaxis;
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rotvec.Normalize();
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return Rotation(
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ct + vt*rotvec(0)*rotvec(0),
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-rotvec(2)*st + vt*rotvec(0)*rotvec(1),
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rotvec(1)*st + vt*rotvec(0)*rotvec(2),
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rotvec(2)*st + vt*rotvec(1)*rotvec(0),
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ct + vt*rotvec(1)*rotvec(1),
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-rotvec(0)*st + vt*rotvec(1)*rotvec(2),
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-rotvec(1)*st + vt*rotvec(2)*rotvec(0),
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rotvec(0)*st + vt*rotvec(2)*rotvec(1),
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ct + vt*rotvec(2)*rotvec(2)
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);
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}
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Rotation Rotation::Rot2(const Vector& rotvec,double angle) {
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// rotvec should be normalized !
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// The formula is
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// V.(V.tr) + st*[V x] + ct*(I-V.(V.tr))
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// can be found by multiplying it with an arbitrary vector p
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// and noting that this vector is rotated.
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double ct = cos(angle);
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double st = sin(angle);
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double vt = 1-ct;
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return Rotation(
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ct + vt*rotvec(0)*rotvec(0),
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-rotvec(2)*st + vt*rotvec(0)*rotvec(1),
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rotvec(1)*st + vt*rotvec(0)*rotvec(2),
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rotvec(2)*st + vt*rotvec(1)*rotvec(0),
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ct + vt*rotvec(1)*rotvec(1),
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-rotvec(0)*st + vt*rotvec(1)*rotvec(2),
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-rotvec(1)*st + vt*rotvec(2)*rotvec(0),
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rotvec(0)*st + vt*rotvec(2)*rotvec(1),
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ct + vt*rotvec(2)*rotvec(2)
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);
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}
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Vector Rotation::GetRot() const
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// Returns a vector with the direction of the equiv. axis
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// and its norm is angle
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{
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Vector axis = Vector((data[7]-data[5]),
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(data[2]-data[6]),
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(data[3]-data[1]) )/2;
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double sa = axis.Norm();
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double ca = (data[0]+data[4]+data[8]-1)/2.0;
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double alfa;
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if (sa > epsilon)
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alfa = ::atan2(sa,ca)/sa;
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else {
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if (ca < 0.0) {
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alfa = KDL::PI;
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axis.data[0] = 0.0;
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axis.data[1] = 0.0;
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axis.data[2] = 0.0;
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if (data[0] > 0.0) {
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axis.data[0] = 1.0;
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} else if (data[4] > 0.0) {
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axis.data[1] = 1.0;
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} else {
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axis.data[2] = 1.0;
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}
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} else {
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alfa = 0.0;
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}
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}
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return axis * alfa;
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}
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Vector2 Rotation::GetXZRot() const
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{
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// [0,1,0] x Y
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Vector2 axis(data[7], -data[1]);
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double norm = axis.Normalize();
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if (norm < epsilon) {
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norm = (data[4] < 0.0) ? PI : 0.0;
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} else {
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norm = acos(data[4]);
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}
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return axis*norm;
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}
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/** Returns the rotation angle around the equiv. axis
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* @param axis the rotation axis is returned in this variable
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* @param eps : in the case of angle == 0 : rot axis is undefined and choosen
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* to be +/- Z-axis
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* in the case of angle == PI : 2 solutions, positive Z-component
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* of the axis is choosen.
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* @result returns the rotation angle (between [0..PI] )
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* /todo :
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* Check corresponding routines in rframes and rrframes
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*/
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double Rotation::GetRotAngle(Vector& axis,double eps) const {
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double ca = (data[0]+data[4]+data[8]-1)/2.0;
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if (ca>1-eps) {
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// undefined choose the Z-axis, and angle 0
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axis = Vector(0,0,1);
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return 0;
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}
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if (ca < -1+eps) {
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// two solutions, choose a positive Z-component of the axis
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double z = sqrt( (data[8]+1)/2 );
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double x = (data[2])/2/z;
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double y = (data[5])/2/z;
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axis = Vector( x,y,z );
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return PI;
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}
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double angle = acos(ca);
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double sa = sin(angle);
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axis = Vector((data[7]-data[5])/2/sa,
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(data[2]-data[6])/2/sa,
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(data[3]-data[1])/2/sa );
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return angle;
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}
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bool operator==(const Rotation& a,const Rotation& b) {
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#ifdef KDL_USE_EQUAL
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return Equal(a,b);
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#else
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return ( a.data[0]==b.data[0] &&
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a.data[1]==b.data[1] &&
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a.data[2]==b.data[2] &&
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a.data[3]==b.data[3] &&
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a.data[4]==b.data[4] &&
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a.data[5]==b.data[5] &&
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a.data[6]==b.data[6] &&
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a.data[7]==b.data[7] &&
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a.data[8]==b.data[8] );
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#endif
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}
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}
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