Mercurial > hg > ltpda
view m-toolbox/classes/+utils/@math/pf2ss.m @ 21:8be9deffe989 database-connection-manager
Update ltpda_uo.update
author | Daniele Nicolodi <nicolodi@science.unitn.it> |
---|---|
date | Mon, 05 Dec 2011 16:20:06 +0100 |
parents | f0afece42f48 |
children |
line wrap: on
line source
% PF2SS Convert partial fraction models to state space matrices %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% % DESCRIPTION: % % Convert partial fraction models to state space matrices. This method % works only for poles of multiplicity one. In case of multiple parfrac % models they must have the same set of poles. % % % CALL: % % [A,B,C,D] = pf2ss(pf) % % INPUTS: % % Assuming to have M pf models with N poles (common to every model) % % - res, vector of matrix of residuals NxM, M is the number of pf % models % - poles, vector of poles Nx1 % - dterm, vector of direct terms, Mx1 % % OUTPUT: % % - A matrix % - B matrix % - C matrix % - D matrix % % % % NOTE: % % This method works only for poles of multiplicity one. % In case of multiple parfrac models they must have the same set of poles %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% % HISTORY: 29-01-2010 L Ferraioli % Creation %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% % VERSION: '$Id: vcfit.m,v 1.10 2009/04/21 10:15:35 luigi Exp $'; % %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% function [A,B,C,D] = pf2ss(res,poles,dterm) [N,M]=size(res); % pf = varargin{:}; % % %%% get poles, residues and direct terms % poles = pf(1).poles; % a common set of poles is assumed % % N = length(poles); % M = numel(pf); % % res = zeros(N,M); % init residues matrix % % if size(poles,2)>1 % poles = poles.'; % end % dterm = zeros(M,1); % init dterm matrix % % for ii=1:M % r = pf(ii).res; % if size(r,2)>1 % r = r.'; % end % res(:,ii) = r; % dterm(ii,1) = pf(ii).dir; % end %%% Marking complex and real poles % cindex = 1; pole is complex, next conjugate pole is marked with cindex % = 2. cindex = 0; pole is real cindex=zeros(1,N); for m=1:N if imag(poles(m))~=0 if m==1 cindex(m)=1; else if cindex(m-1)==0 || cindex(m-1)==2 cindex(m)=1; cindex(m+1)=2; else cindex(m)=2; end end end end %%% Build SS matrices % init matrices A = diag(poles); B = ones(N,M); C = res.'; D = dterm; for kk = 1:N if cindex(kk) == 1 A(kk,kk)=real(poles(kk)); A(kk,kk+1)=imag(poles(kk)); A(kk+1,kk)=-1*imag(poles(kk)); A(kk+1,kk+1)=real(poles(kk)); B(kk,:) = 2; B(kk+1,:) = 0; C(:,kk+1) = imag(C(:,kk)); C(:,kk) = real(C(:,kk)); end end end