function [ldens,Dldens,D2ldens] = lpdfig1(x,s,nu) % Evaluates the logged INVERSE-GAMMA-1 PDF at x. % % X ~ IG1(s,nu) if X = sqrt(Y) where Y ~ IG2(s,nu) and Y = inv(Z) with Z ~ G(nu/2,2/s) (Gamma distribution) % % See L. Bauwens, M. Lubrano and J-F. Richard [1999, appendix A] for more details. % % % INPUTS % x [double] m*n matrix of locations, % s [double] m*n matrix or scalar, First INVERSE-GAMMA-1 distribution parameters, % nu [double] m*n matrix or scalar, Second INVERSE-GAMMA-1 distribution parameters. % % OUTPUTS % ldens [double] m*n matrix of logged INVERSE-GAMMA-1 densities evaluated at x. % Dldens [double] m*n matrix of first derivatives of logged INVERSE-GAMMA-1 densities. % D2ldens [double] m*n matrix of second derivatives of logged matrix of logged INVERSE-GAMMA-1 densities. % % SPECIAL REQUIREMENTS % none % Copyright © 2004-2021 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 . ldens = -Inf( size(x) ) ; idx = find( x>0 ) ; if length(s)==1 ldens(idx) = log(2) - gammaln(.5*nu) - .5*nu*(log(2)-log(s)) - (nu+1)*log(x(idx)) - .5*s./(x(idx).*x(idx)) ; else ldens(idx) = log(2) - gammaln(.5*nu(idx)) - .5*nu(idx).*(log(2)-log(s(idx))) - (nu(idx)+1).*log(x(idx)) - .5*s(idx)./(x(idx).*x(idx)) ; end if nargout >1 Dldens = ldens ; if length(s)==1 Dldens(idx) = - (nu+1)./(x(idx)) + s./(x(idx).^3) ; else Dldens(idx) = - (nu(idx)+1)./(x(idx)) + s(idx)./(x(idx).^3) ; end end if nargout == 3 D2ldens = ldens ; if length(s)==1 D2ldens(idx) = (nu+1)./(x(idx).^2) - 3*s(idx)./(x(idx).^4) ; else D2ldens(idx) = (nu(idx)+1)./(x(idx).^2) - 3*s(idx)./(x(idx).^4) ; end end