[810] | 1 | %=======================================================================
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| 2 | % Copyright 2008-2014, LEGI UMR 5519 / CNRS UJF G-INP, Grenoble, France
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| 3 | % http://www.legi.grenoble-inp.fr
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| 4 | % Joel.Sommeria - Joel.Sommeria (A) legi.cnrs.fr
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| 5 | %
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| 6 | % This file is part of the toolbox UVMAT.
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| 7 | %
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| 8 | % UVMAT is free software; you can redistribute it and/or modify
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| 9 | % it under the terms of the GNU General Public License as published
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| 10 | % by the Free Software Foundation; either version 2 of the license,
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| 11 | % or (at your option) any later version.
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| 12 | %
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| 13 | % UVMAT is distributed in the hope that it will be useful,
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| 14 | % but WITHOUT ANY WARRANTY; without even the implied warranty of
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| 15 | % MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the
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| 16 | % GNU General Public License (see LICENSE.txt) for more details.
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| 17 | %=======================================================================
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| 18 |
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[725] | 19 | function [out,dout]=rodrigues(in)
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| 20 |
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| 21 | % RODRIGUES Transform rotation matrix into rotation vector and viceversa.
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| 22 | %
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| 23 | % Sintax: [OUT]=RODRIGUES(IN)
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| 24 | % If IN is a 3x3 rotation matrix then OUT is the
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| 25 | % corresponding 3x1 rotation vector
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| 26 | % if IN is a rotation 3-vector then OUT is the
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| 27 | % corresponding 3x3 rotation matrix
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| 28 | %
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| 29 |
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| 30 | %%
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| 31 | %% Copyright (c) March 1993 -- Pietro Perona
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| 32 | %% California Institute of Technology
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| 33 | %%
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| 34 |
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| 35 | %% ALL CHECKED BY JEAN-YVES BOUGUET, October 1995.
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| 36 | %% FOR ALL JACOBIAN MATRICES !!! LOOK AT THE TEST AT THE END !!
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| 37 |
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| 38 | %% BUG when norm(om)=pi fixed -- April 6th, 1997;
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| 39 | %% Jean-Yves Bouguet
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| 40 |
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| 41 | %% Add projection of the 3x3 matrix onto the set of special ortogonal matrices SO(3) by SVD -- February 7th, 2003;
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| 42 | %% Jean-Yves Bouguet
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| 43 |
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| 44 | % BUG FOR THE CASE norm(om)=pi fixed by Mike Burl on Feb 27, 2007
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| 45 |
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| 46 |
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| 47 | [m,n] = size(in);
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| 48 | %bigeps = 10e+4*eps;
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| 49 | bigeps = 10e+20*eps;
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| 50 |
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| 51 | if ((m==1) & (n==3)) | ((m==3) & (n==1)) %% it is a rotation vector
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| 52 | theta = norm(in);
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| 53 | if theta < eps
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| 54 | R = eye(3);
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| 55 |
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| 56 | %if nargout > 1,
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| 57 |
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| 58 | dRdin = [0 0 0;
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| 59 | 0 0 1;
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| 60 | 0 -1 0;
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| 61 | 0 0 -1;
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| 62 | 0 0 0;
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| 63 | 1 0 0;
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| 64 | 0 1 0;
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| 65 | -1 0 0;
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| 66 | 0 0 0];
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| 67 |
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| 68 | %end;
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| 69 |
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| 70 | else
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| 71 | if n==length(in) in=in'; end; %% make it a column vec. if necess.
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| 72 |
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| 73 | %m3 = [in,theta]
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| 74 |
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| 75 | dm3din = [eye(3);in'/theta];
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| 76 |
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| 77 | omega = in/theta;
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| 78 |
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| 79 | %m2 = [omega;theta]
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| 80 |
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| 81 | dm2dm3 = [eye(3)/theta -in/theta^2; zeros(1,3) 1];
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| 82 |
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| 83 | alpha = cos(theta);
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| 84 | beta = sin(theta);
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| 85 | gamma = 1-cos(theta);
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| 86 | omegav=[[0 -omega(3) omega(2)];[omega(3) 0 -omega(1)];[-omega(2) omega(1) 0 ]];
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| 87 | A = omega*omega';
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| 88 |
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| 89 | %m1 = [alpha;beta;gamma;omegav;A];
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| 90 |
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| 91 | dm1dm2 = zeros(21,4);
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| 92 | dm1dm2(1,4) = -sin(theta);
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| 93 | dm1dm2(2,4) = cos(theta);
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| 94 | dm1dm2(3,4) = sin(theta);
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| 95 | dm1dm2(4:12,1:3) = [0 0 0 0 0 1 0 -1 0;
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| 96 | 0 0 -1 0 0 0 1 0 0;
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| 97 | 0 1 0 -1 0 0 0 0 0]';
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| 98 |
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| 99 | w1 = omega(1);
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| 100 | w2 = omega(2);
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| 101 | w3 = omega(3);
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| 102 |
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| 103 | dm1dm2(13:21,1) = [2*w1;w2;w3;w2;0;0;w3;0;0];
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| 104 | dm1dm2(13: 21,2) = [0;w1;0;w1;2*w2;w3;0;w3;0];
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| 105 | dm1dm2(13:21,3) = [0;0;w1;0;0;w2;w1;w2;2*w3];
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| 106 |
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| 107 | R = eye(3)*alpha + omegav*beta + A*gamma;
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| 108 |
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| 109 | dRdm1 = zeros(9,21);
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| 110 |
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| 111 | dRdm1([1 5 9],1) = ones(3,1);
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| 112 | dRdm1(:,2) = omegav(:);
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| 113 | dRdm1(:,4:12) = beta*eye(9);
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| 114 | dRdm1(:,3) = A(:);
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| 115 | dRdm1(:,13:21) = gamma*eye(9);
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| 116 |
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| 117 | dRdin = dRdm1 * dm1dm2 * dm2dm3 * dm3din;
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| 118 |
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| 119 |
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| 120 | end;
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| 121 | out = R;
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| 122 | dout = dRdin;
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| 123 |
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| 124 | %% it is prob. a rot matr.
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| 125 | elseif ((m==n) & (m==3) & (norm(in' * in - eye(3)) < bigeps)...
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| 126 | & (abs(det(in)-1) < bigeps))
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| 127 | R = in;
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| 128 |
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| 129 | % project the rotation matrix to SO(3);
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| 130 | [U,S,V] = svd(R);
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| 131 | R = U*V';
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| 132 |
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| 133 | tr = (trace(R)-1)/2;
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| 134 | dtrdR = [1 0 0 0 1 0 0 0 1]/2;
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| 135 | theta = real(acos(tr));
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| 136 |
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| 137 |
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| 138 | if sin(theta) >= 1e-4,
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| 139 |
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| 140 | dthetadtr = -1/sqrt(1-tr^2);
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| 141 |
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| 142 | dthetadR = dthetadtr * dtrdR;
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| 143 | % var1 = [vth;theta];
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| 144 | vth = 1/(2*sin(theta));
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| 145 | dvthdtheta = -vth*cos(theta)/sin(theta);
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| 146 | dvar1dtheta = [dvthdtheta;1];
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| 147 |
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| 148 | dvar1dR = dvar1dtheta * dthetadR;
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| 149 |
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| 150 |
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| 151 | om1 = [R(3,2)-R(2,3), R(1,3)-R(3,1), R(2,1)-R(1,2)]';
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| 152 |
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| 153 | dom1dR = [0 0 0 0 0 1 0 -1 0;
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| 154 | 0 0 -1 0 0 0 1 0 0;
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| 155 | 0 1 0 -1 0 0 0 0 0];
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| 156 |
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| 157 | % var = [om1;vth;theta];
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| 158 | dvardR = [dom1dR;dvar1dR];
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| 159 |
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| 160 | % var2 = [om;theta];
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| 161 | om = vth*om1;
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| 162 | domdvar = [vth*eye(3) om1 zeros(3,1)];
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| 163 | dthetadvar = [0 0 0 0 1];
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| 164 | dvar2dvar = [domdvar;dthetadvar];
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| 165 |
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| 166 |
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| 167 | out = om*theta;
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| 168 | domegadvar2 = [theta*eye(3) om];
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| 169 |
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| 170 | dout = domegadvar2 * dvar2dvar * dvardR;
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| 171 |
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| 172 |
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| 173 | else
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| 174 | if tr > 0; % case norm(om)=0;
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| 175 |
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| 176 | out = [0 0 0]';
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| 177 |
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| 178 | dout = [0 0 0 0 0 1/2 0 -1/2 0;
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| 179 | 0 0 -1/2 0 0 0 1/2 0 0;
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| 180 | 0 1/2 0 -1/2 0 0 0 0 0];
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| 181 | else
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| 182 |
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| 183 | % case norm(om)=pi;
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| 184 | if(0)
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| 185 |
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| 186 | %% fixed April 6th by Bouguet -- not working in all cases!
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| 187 | out = theta * (sqrt((diag(R)+1)/2).*[1;2*(R(1,2:3)>=0)'-1]);
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| 188 | %keyboard;
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| 189 |
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| 190 | else
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| 191 |
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| 192 | % Solution by Mike Burl on Feb 27, 2007
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| 193 | % This is a better way to determine the signs of the
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| 194 | % entries of the rotation vector using a hash table on all
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| 195 | % the combinations of signs of a pairs of products (in the
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| 196 | % rotation matrix)
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| 197 |
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| 198 | % Define hashvec and Smat
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| 199 | hashvec = [0; -1; -3; -9; 9; 3; 1; 13; 5; -7; -11];
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| 200 | Smat = [1,1,1; 1,0,-1; 0,1,-1; 1,-1,0; 1,1,0; 0,1,1; 1,0,1; 1,1,1; 1,1,-1;
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| 201 | 1,-1,-1; 1,-1,1];
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| 202 |
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| 203 | M = (R+eye(3,3))/2;
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| 204 | uabs = sqrt(M(1,1));
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| 205 | vabs = sqrt(M(2,2));
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| 206 | wabs = sqrt(M(3,3));
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| 207 |
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| 208 | mvec = [M(1,2), M(2,3), M(1,3)];
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| 209 | syn = ((mvec > 1e-4) - (mvec < -1e-4)); % robust sign() function
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| 210 | hash = syn * [9; 3; 1];
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| 211 | idx = find(hash == hashvec);
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| 212 | svec = Smat(idx,:)';
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| 213 |
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| 214 | out = theta * [uabs; vabs; wabs] .* svec;
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| 215 |
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| 216 | end;
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| 217 |
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| 218 | if nargout > 1,
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| 219 | fprintf(1,'WARNING!!!! Jacobian domdR undefined!!!\n');
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| 220 | dout = NaN*ones(3,9);
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| 221 | end;
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| 222 | end;
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| 223 | end;
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| 224 |
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| 225 | else
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| 226 | error('Neither a rotation matrix nor a rotation vector were provided');
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| 227 | end;
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| 228 |
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| 229 | return;
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| 230 |
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| 231 | %% test of the Jacobians:
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| 232 |
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| 233 | %%%% TEST OF dRdom:
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| 234 | om = randn(3,1);
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| 235 | dom = randn(3,1)/1000000;
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| 236 |
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| 237 | [R1,dR1] = rodrigues(om);
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| 238 | R2 = rodrigues(om+dom);
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| 239 |
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| 240 | R2a = R1 + reshape(dR1 * dom,3,3);
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| 241 |
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| 242 | gain = norm(R2 - R1)/norm(R2 - R2a)
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| 243 |
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| 244 | %%% TEST OF dOmdR:
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| 245 | om = randn(3,1);
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| 246 | R = rodrigues(om);
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| 247 | dom = randn(3,1)/10000;
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| 248 | dR = rodrigues(om+dom) - R;
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| 249 |
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| 250 | [omc,domdR] = rodrigues(R);
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| 251 | [om2] = rodrigues(R+dR);
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| 252 |
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| 253 | om_app = omc + domdR*dR(:);
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| 254 |
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| 255 | gain = norm(om2 - omc)/norm(om2 - om_app)
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| 256 |
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| 257 |
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| 258 | %%% OTHER BUG: (FIXED NOW!!!)
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| 259 |
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| 260 | omu = randn(3,1);
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| 261 | omu = omu/norm(omu)
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| 262 | om = pi*omu;
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| 263 | [R,dR]= rodrigues(om);
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| 264 | [om2] = rodrigues(R);
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| 265 | [om om2]
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| 266 |
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| 267 | %%% NORMAL OPERATION
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| 268 |
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| 269 | om = randn(3,1);
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| 270 | [R,dR]= rodrigues(om);
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| 271 | [om2] = rodrigues(R);
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| 272 | [om om2]
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| 273 |
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| 274 | return
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| 275 |
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| 276 | % Test: norm(om) = pi
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| 277 |
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| 278 | u = randn(3,1);
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| 279 | u = u / sqrt(sum(u.^2));
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| 280 | om = pi*u;
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| 281 | R = rodrigues(om);
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| 282 |
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| 283 | R2 = rodrigues(rodrigues(R));
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| 284 |
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[810] | 285 | norm(R - R2)
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