function draw = rand_multivariate_student(Mean,Sigma_upper_chol,df) % function draw = rand_multivariate_student(Mean,Sigma_upper_chol,df) % Pseudo random draws from a multivariate student distribution, % with expectation Mean, variance Sigma*df/(df-2) and degrees of freedom df>0. % % INPUTS % % Mean [double] 1*n vector, expectation of the multivariate random variable. % Sigma_upper_chol [double] n*n matrix, upper triangular Cholesky decomposition of Sigma % (the covariance matrix up to a factor df/(df-2)). % df [integer] degrees of freedom. % % OUTPUTS % draw [double] 1*n vector drawn from a multivariate normal distribution with expectation Mean and % covariance Sigma. % % % NOTE See Zellner (appendix B.2, 1971) for a definition. % Computes the t-distributed random numbers from % X = \mu + Y\sqrt{\frac{\nu}{U}} % where % Y~N(0,Sigma) with Sigma=Sigma_upper_chol'*Sigma_upper_chol % U~\Chi^2_{\nu} % The latter is constructed as the sum of \nu standard normals. % Copyright © 2003-2017 Dynare Team % % This file is part of Dynare. % % Dynare is free software: you can redistribute it and/or modify % it under the terms of the GNU General Public License as published by % the Free Software Foundation, either version 3 of the License, or % (at your option) any later version. % % Dynare 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 General Public License for more details. % % You should have received a copy of the GNU General Public License % along with Dynare. If not, see . n = length(Mean); draw = Mean + randn(1,n) * Sigma_upper_chol * sqrt(df/sum(randn(df,1).^2));