function [pars, cosnJ] = ident_bruteforce(J,n,TeX, pnames_TeX,tittxt) % function [pars, cosnJ] = ident_bruteforce(J,n,TeX, pnames_TeX,tittxt) % % given the Jacobian matrix J of moment derivatives w.r.t. parameters % computes, for each column of J, the groups of columns from 1 to n that % can repliate at best the derivatives of that column % % INPUTS % J [double] (normalized) Jacobian matrix of moment derivatives % n [scalar] maximum size of covariance groups tested % TeX [scalar] Indicator whether TeX-output is requested % pnames_TeX [char] list of tex names % tittxt [string] string indicating the title text for % graphs and figures % % OUTPUTS % pars : cell array with groupf of params for each column of J for 1 to n % cosnJ : the cosn of each column with the selected group of columns % Copyright (C) 2009-2018 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 1.e-8 if ll>1 && ((cosnJ(ii,ll)-cosnJ(ii,ll-1))<1.e-8) pars{ii,ll} = [pars{ii,ll-1} NaN]; cosnJ(ii,ll) = cosnJ(ii,ll-1); else tmp3 = tmp2(find(cosnJ2(:,1)==max(cosnJ2(:,1))),:); pars{ii,ll} = tmp3(1,:); end else pars{ii,ll} = NaN(1,ll); end dyn_waitbar(ii/k,h) end dyn_waitbar_close(h); if TeX filename = [OutputDirectoryName '/' M_.fname '_collin_patterns_',tittxt1,'_' int2str(ll) '.tex']; fidTeX = fopen(filename,'w'); fprintf(fidTeX,'%% TeX-table generated by ident_bruteforce (Dynare).\n'); fprintf(fidTeX,['%% Collinearity patterns with ',int2str(ll),' parameter(s): ',tittxt,'\n']); fprintf(fidTeX,['%% ' datestr(now,0)]); fprintf(fidTeX,' \n'); fprintf(fidTeX,' \n'); fprintf(fidTeX,'{\\tiny \n'); fprintf(fidTeX,'\\begin{longtable}{llc} \n'); fprintf(fidTeX,['\\caption{Collinearity patterns with ',int2str(ll),' parameter(s): ',tittxt,'}\n ']); fprintf(fidTeX,['\\label{Table:CollinearityPatterns:',tittxt1,':',int2str(ll),'}\\\\\n']); fprintf(fidTeX,'\\toprule \n'); fprintf(fidTeX,' Parameter & Explanatory & cosn \\\\ \n'); fprintf(fidTeX,' & parameter(s) & \\\\ \n'); fprintf(fidTeX,'\\midrule \\endfirsthead \n'); fprintf(fidTeX,'\\caption{(continued)}\\\\\n '); fprintf(fidTeX,'\\bottomrule \n'); fprintf(fidTeX,' Parameter & Explanatory & cosn \\\\ \n'); fprintf(fidTeX,' & parameter(s) & \\\\ \n'); fprintf(fidTeX,'\\midrule \\endhead \n'); fprintf(fidTeX,'\\bottomrule \\multicolumn{3}{r}{(Continued on next page)}\\endfoot \n'); fprintf(fidTeX,'\\bottomrule\\endlastfoot \n'); for i=1:k plist=''; for ii=1:ll if ~isnan(pars{i,ll}(ii)) plist = [plist ' $' pnames_TeX{pars{i,ll}(ii)} '\;\; $ ']; else plist = [plist ' ---- ']; end end fprintf(fidTeX,'$%s$ & [%s] & %7.3f \\\\ \n',... pnames_TeX{i},... plist,... cosnJ(i,ll)); end fprintf(fidTeX,'\\bottomrule \n'); fprintf(fidTeX,'\\end{longtable}\n'); fprintf(fidTeX,'} \n'); fprintf(fidTeX,'%% End of TeX file.\n'); fclose(fidTeX); end end