/* * This file replicates the estimation of the cash in advance model described * Frank Schorfheide (2000): "Loss function-based evaluation of DSGE models", * Journal of Applied Econometrics, 15(6), 645-670. * * The data are in file "fsdat_simul.m", and have been artificially generated. * They are therefore different from the original dataset used by Schorfheide. * * The equations are taken from J. Nason and T. Cogley (1994): "Testing the * implications of long-run neutrality for monetary business cycle models", * Journal of Applied Econometrics, 9, S37-S70. * Note that there is an initial minus sign missing in equation (A1), p. S63. * * This implementation was written by Michel Juillard. Please note that the * following copyright notice only applies to this Dynare implementation of the * model. */ /* * Copyright © 2004-2019 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 . */ var m P c e W R k d n l gy_obs gp_obs y dA; varexo e_a e_m; parameters alp bet gam mst rho psi del; alp = 0.33; bet = 0.99; gam = 0.003; mst = 1.011; rho = 0.7; psi = 0.787; del = 0.02; model; dA = exp(gam+e_a); log(m) = (1-rho)*log(mst) + rho*log(m(-1))+e_m; -P/(c(+1)*P(+1)*m)+bet*P(+1)*(alp*exp(-alp*(gam+log(e(+1))))*k^(alp-1)*n(+1)^(1-alp)+(1-del)*exp(-(gam+log(e(+1)))))/(c(+1)*P(+1)*m(+1))=0; W = l/n; -(psi/(1-psi))*(c*P/(1-n))+l/n = 0; R = P*(1-alp)*exp(-alp*(gam+e_a))*k(-1)^alp*n^(-alp)/W; 1/(c*P)-bet*P*(1-alp)*exp(-alp*(gam+e_a))*k(-1)^alp*n^(1-alp)/(m*l*c(+1)*P(+1)) = 0; c+k = exp(-alp*(gam+e_a))*k(-1)^alp*n^(1-alp)+(1-del)*exp(-(gam+e_a))*k(-1); P*c = m; m-1+d = l; e = exp(e_a); y = k(-1)^alp*n^(1-alp)*exp(-alp*(gam+e_a)); exp(gy_obs) = dA*y/y(-1); exp(gp_obs) = (P/P(-1))*m(-1)/dA; end; shocks; var e_a; stderr 0.014; var e_m; stderr 0.005; end; steady_state_model; dA = exp(gam); gst = 1/dA; m = mst; khst = ( (1-gst*bet*(1-del)) / (alp*gst^alp*bet) )^(1/(alp-1)); xist = ( ((khst*gst)^alp - (1-gst*(1-del))*khst)/mst )^(-1); nust = psi*mst^2/( (1-alp)*(1-psi)*bet*gst^alp*khst^alp ); n = xist/(nust+xist); P = xist + nust; k = khst*n; l = psi*mst*n/( (1-psi)*(1-n) ); c = mst/P; d = l - mst + 1; y = k^alp*n^(1-alp)*gst^alp; R = mst/bet; W = l/n; ist = y-c; q = 1 - d; e = 1; gp_obs = log(m/dA); gy_obs = log(dA); end; steady; check; estimated_params; alp, beta_pdf, 0.356, 0.02; bet, beta_pdf, 0.993, 0.002; gam, normal_pdf, 0.0085, 0.003; mst, normal_pdf, 1.0002, 0.007; rho, beta_pdf, 0.129, 0.05; psi, beta_pdf, 0.65, 0.05; del, beta_pdf, 0.01, 0.005; stderr e_a, inv_gamma_pdf, 0.035449, inf; stderr e_m, inv_gamma_pdf, 0.008862, inf; end; varobs gp_obs gy_obs; estimation(order=1,datafile=fsdat_simul_logged,consider_all_endogenous,nobs=192,mh_replic=2000, mh_nblocks=1,smoother, mh_jscale=0.8); ex_=[]; for shock_iter=1:M_.exo_nbr ex_=[ex_ oo_.SmoothedShocks.Mean.(M_.exo_names{shock_iter})]; end ex_ = ex_(2:end,:); % ex_ = zeros(size(ex_)); y0=[]; for endo_iter=1:M_.endo_nbr y0 = [y0; oo_.SmoothedVariables.Mean.(M_.endo_names{endo_iter})(1)]; end; %make sure decision rules were updated [oo_.dr,info,M_] = resol(0,M_,options_,oo_); dr = oo_.dr; iorder=1; y_=simult_(M_,options_,y0,dr,ex_,iorder); fsdat_simul_logged; %Needs bigger tolerance than ML, because transformation from parameters to steady states is not linear and steady state at mean parameters is not mean of steady states if mean(abs(y_(strmatch('gy_obs',M_.endo_names,'exact'),:)'-(gy_obs(1:options_.nobs))))>1e-3 ||... mean(abs(y_(strmatch('gy_obs',M_.endo_names,'exact'),:)'-oo_.SmoothedVariables.Mean.gy_obs))>1e-3 ||... mean(abs(y_(strmatch('gp_obs',M_.endo_names,'exact'),:)'-(gp_obs(1:options_.nobs))))>1e-1 ||... mean(abs(y_(strmatch('gp_obs',M_.endo_names,'exact'),:)'-oo_.SmoothedVariables.Mean.gp_obs))>1e-2 error('Smoother is wrong') end % figure % plot((gy_obs)) % hold on % plot(y_(strmatch('gy_obs',M_.endo_names,'exact'),:),'r--') % % figure % plot((gp_obs)) % hold on % plot(y_(strmatch('gp_obs',M_.endo_names,'exact'),:),'r--')