function [par,Par,Error,Y,iterations,x] = \ ppp_optimise(system_name,x_0,par_0,simpar,u,y_0,free,Q,extras); ## Levenberg-Marquardt optimisation for PPP/MTT ## Usage: [par,Par,Error,Y,iterations,x] = ppp_optimise(system_name,x_0,par_0,simpar,u,y_0,free[,extras]); ## system_name String containing system name ## x_0 Initial state ## par_0 Initial parameter vector estimate ## simpar Simulation parameters: ## .first first time ## .dt time increment ## .stepfactor Euler integration step factor ## u System input (column vector, each row is u') ## y_0 Desired model output ## free one row for each adjustable parameter ## first column parameter indices ## second column corresponding sensitivity indices ## Q vector of positive output weights. ## extras (opt) optimisation parameters ## .criterion convergence criterion ## .max_iterations limit to number of iterations ## .v Initial Levenberg-Marquardt parameter ###################################### ##### Model Transformation Tools ##### ###################################### ############################################################### ## Version control history ############################################################### ## $Id$ ## $Log$ ## Revision 1.11 2002/05/20 13:32:36 gawthrop ## Sanity check on y_0 ## ## Revision 1.10 2002/05/13 16:01:09 gawthrop ## Addes Q weighting matrix ## ## Revision 1.9 2002/05/08 10:14:21 gawthrop ## Idetification now OK (Moved data range in ppp_optimise by one sample interval) ## ## Revision 1.8 2002/04/23 17:50:39 gawthrop ## error --> err to avoid name clash with built in function ## ## Revision 1.7 2001/08/10 16:19:06 gawthrop ## Tidied up the optimisation stuff ## ## Revision 1.6 2001/07/03 22:59:10 gawthrop ## Fixed problems with argument passing for CRs ## ## Revision 1.5 2001/06/06 07:54:38 gawthrop ## Further fixes to make nonlinear PPP work ... ## ## Revision 1.4 2001/05/26 15:46:38 gawthrop ## Updated to account for new nonlinear ppp ## ## Revision 1.3 2001/04/05 11:50:12 gawthrop ## Tidied up documentation + verbose mode ## ## Revision 1.2 2001/04/04 08:36:25 gawthrop ## Restuctured to be more logical. ## Data is now in columns to be compatible with MTT. ## ## Revision 1.1 2000/12/28 11:58:07 peterg ## Put under CVS ## ############################################################### ## Copyright (C) 1999,2000 by Peter J. Gawthrop sim_command = sprintf("%s_ssim(x_0,par,simpar,u,i_s)", system_name); ## Extract indices i_t = free(:,1); # Parameters i_s = free(:,2)'; # Sensitivities if nargin<9 extras.criterion = 1e-5; extras.max_iterations = 10; extras.v = 1e-5; extras.verbose = 0; endif [n_data,n_y] = size(y_0); if n_data<n_y error("ppp_optimise: y_0 should be in columns, not rows") endif if nargin<8 Q = ones(n_y,1); endif n_th = length(i_s); err_old = inf; err_old_old = inf; err = 1e50; reduction = inf; predicted_reduction = 0; par = par_0; Par = par_0; step = ones(n_th,1); Error = []; Y = []; iterations = 0; v = extras.v; # Levenverg-Marquardt parameter. r = 1; # Step ratio if extras.verbose # Diagnostics printf("Iteration: %i\n", iterations); printf(" error: %g\n", err); printf(" reduction: %g\n", reduction); printf(" prediction: %g\n", predicted_reduction); printf(" ratio: %g\n", r); printf(" L-M param: %g\n", v); printf(" parameters: "); for i_th=1:n_th printf("%g ", par(i_t(i_th))); endfor printf("\n"); endif while (abs(reduction)>extras.criterion)&&\ (abs(err)>extras.criterion)&&\ (iterations<extras.max_iterations) iterations = iterations + 1 # Increment iteration counter [y,y_par,x] = eval(sim_command); # Simulate [N_data,N_y] = size(y) if (N_y!=n_y) mess = sprintf("n_y (%i) in data not same as n_y (%i) in model", n_y,N_y); error(mess); endif ## Use the last part of the simulation to compare with data ## ### Removed #### And shift back by one data point # if ( (N_data-n_data)<1 ) # error(sprintf("y_0 (%i) must be shorter than y (%i)", n_data, N_data)); # endif y = y(N_data-n_data+1:N_data,:); y_par = y_par(N_data-n_data+1:N_data,:); if extras.visual==1 ## Plot title("Optimisation data"); plot([y y_0]) endif ##Evaluate error, cost derivative J and cost second derivative JJ err = 0; J = zeros(n_th,1); JJ = zeros(n_th,n_th); for i = 1:n_y E = y(:,i) - y_0(:,i); # Error in ith output err = err + Q(i)*(E'*E); # Sum the squared error over outputs y_par_i = y_par(:,i:n_y:n_y*n_th); # sensitivity function (ith output) J = J + Q(i)*y_par_i'*E; # Jacobian JJ = JJ + Q(i)*y_par_i'*y_par_i; # Newton Euler approx Hessian endfor if iterations>1 # Adjust the Levenberg-Marquardt parameter reduction = err_old-err; predicted_reduction = 2*J'*step + step'*JJ*step; r = predicted_reduction/reduction; if (r<0.25)||(reduction<0) v = 4*v; elseif r>0.75 v = v/2; endif if reduction<0 # Its getting worse par(i_t) = par(i_t) + step; # rewind parameter err = err_old; # rewind error err_old = err_old_old; # rewind old error if extras.verbose printf(" Rewinding ....\n"); endif endif endif ## Compute step using pseudo inverse JJL = JJ + v*eye(n_th); # Levenberg-Marquardt term step = pinv(JJL)*J; # Step size par(i_t) = par(i_t) - step; # Increment parameters err_old_old = err_old; # Save old error err_old = err; # Save error ##Some diagnostics Error = [Error err]; # Save error Par = [Par par]; # Save parameters Y = [Y y]; # Save output if extras.verbose # Diagnostics printf("Iteration: %i\n", iterations); printf(" error: %g\n", err); printf(" reduction: %g\n", reduction); printf(" prediction: %g\n", predicted_reduction); printf(" ratio: %g\n", r); printf(" L-M param: %g\n", v); printf(" parameters: "); for i_th=1:n_th printf("%g ", par(i_t(i_th))); endfor printf("\n"); endif endwhile endfunction