%TRNORM Normalize a homogeneous transform % % TN = TRNORM(T) is a normalized homogeneous transformation matrix in which % the rotation submatrix R = [N,O,A] is guaranteed to be a proper orthogonal % matrix. The O and A vectors are normalized and the normal vector is formed from % N = O x A, and then we ensure that O and A are orthogonal by O = A x N. % % Notes:: % - Used to prevent finite word length arithmetic causing transforms to % become `unnormalized'. % % See also OA2TR. % Copyright (C) 1993-2011, by Peter I. Corke % % This file is part of The Robotics Toolbox for Matlab (RTB). % % RTB is free software: you can redistribute it and/or modify % it under the terms of the GNU Lesser General Public License as published by % the Free Software Foundation, either version 3 of the License, or % (at your option) any later version. % % RTB is distributed in the hope that it will be useful, % but WITHOUT ANY WARRANTY; without even the implied warranty of % MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the % GNU Lesser General Public License for more details. % % You should have received a copy of the GNU Leser General Public License % along with RTB. If not, see . function r = trnorm(t) if ndims(t) == 3 nd = size(t, 3); r = zeros(4,4,nd); for i=1:nd r(:,:,i) = trnorm(t(:,:,i)); end return end if all(size(t) == [4 4]) n = cross(t(1:3,2), t(1:3,3)); % N = O x A o = cross(t(1:3,3), n); % O = A x N r = [unit(n) unit(t(1:3,2)) unit(t(1:3,3)) t(1:3,4); 0 0 0 1]; elseif all(size(t) == [3 3]) r = t; else error('RTB:trnorm:badarg', 'argument must be 3x3 or 4x4 hom xform'); end