Mercurial > hg > ltpda
view m-toolbox/classes/+utils/@math/pfallpsyms.m @ 7:1e91f84a4be8 database-connection-manager
Make ltpda_up.retrieve work with java.sql.Connection objects
author | Daniele Nicolodi <nicolodi@science.unitn.it> |
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date | Mon, 05 Dec 2011 16:20:06 +0100 |
parents | f0afece42f48 |
children |
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% % DESCRIPTION: % % All pass filtering in order to stabilize transfer function poles and % zeros. It inputs a partial fraction expanded continuous model and % outputs a pole-zero minimum phase system % % CALL: % % [nr,np,nd,resp] = pfallpsyms(r,p,d,f) % % INPUTS: % % r: are residues % p: are poles % d: is direct term % f: is the frequancies vector in (Hz) % fs: is the sampling frequency in (Hz) % % OUTPUTS: % % resp: is the minimum phase frequency response % np: are the new stable poles % nz: are the new stable zeros % % NOTE: % % This function make use of symbolic math toolbox functions % %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% % VERSION: '$Id: pfallpsyms.m,v 1.3 2008/11/10 15:40:11 luigi Exp $'; % % HISTORY: 12-09-2008 L Ferraioli % Creation %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% function [nr,np,nd,nmresp] = pfallpsyms(r,p,d,f) % Reshaping [a,b] = size(r); if a<b r = r.'; % reshape as a column vector end [a,b] = size(p); if a<b p = p.'; % reshape as a column vector end [a,b] = size(f); if a<b f = f.'; % reshape as a column vector end [a,b] = size(d); if a ~= b disp(' Function can handle only single constant direct terms. Only first term will be considered! ') d = d(1); end if isempty(d) d = 0; end % digits(100) % Defining inputs as symbolic variable r = sym(r,'f'); p = sym(p,'f'); d = sym(d,'f'); f = sym(f,'f'); syms z % Function gain coefficient if double(d) == 0 k = sum(r); else k = d; end %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% f = sym(f,'f'); syms z p = sym(p,'f'); % stabilize poles sp = p; unst = abs(double(sp)) > 1; sp(unst) = 1./conj(sp(unst)); skp = prod(1./conj(p(unst))); [Na,Nb] = size(r); for nn = 1:Nb % digits(100) % Defining inputs as symbolic variable rt = sym(r(:,nn),'f'); % p = sym(p,'f'); dt = sym(d(1,nn),'f'); % f = sym(f,'f'); % fs = sym(fs,'f'); % syms z % Function gain coefficient if double(d) == 0 k = sum(r); else k = d; end Np = length(p); % Defining the symbolic transfer function vter = rt./(z-p); vter = [vter; dt]; Mter = diag(vter); H = trace(Mter); % Factorizing the transfer function HH = factor(H); % Extracting numerator and denominator [N,D] = numden(HH); % Symbolci calculation of function zeros cN = coeffs(expand(N),z); n = length(cN); cN2 = -1.*cN(2:end)./cN(1); A = sym(diag(ones(1,n-2),-1)); A(1,:) = cN2; zrs = eig(A); % if double(d) == 0 % zrs = [zrs; sym(0,'f')]; % end if isempty(skp) skp = sym(1,'f'); end if isempty(k) k = sym(1,'f'); end % Calculating new gain % sk = real(k*skz*skp); sk = real(k*skp); HHHn = sym(1,'f'); for ii = 1:length(zrs) HHHn = HHHn.*(z-zrs(ii)); end for jj = 1:Np tsp = sp; tsp(jj) = []; tHHHd = sym(1,'f'); for kk = 1:Np-1 tHHHd = tHHHd.*(z-tsp(kk)); end HHHd(jj,1) = tHHHd; end for jj = 1:Np sr(jj,1) = subs(sk*HHHn/(z*HHHd(jj,1)),z,sp(jj)); end np = double(sp); for kk = 1:Np if imag(np(kk)) == 0 sr(kk) = real(sr(kk)); end end nr(:,nn) = double(sr); nd(:,nn) = double(dt); % Model evaluation pfparams.type = 'cont'; pfparams.freq = f; pfparams.res = nr(:,nn); pfparams.pol = np; pfparams.dterm = nd(:,nn); pfr = utils.math.pfresp(pfparams); resp = pfr.resp; ratio = mean(abs(mresp(:,nn))./abs(resp)); resp = resp.*ratio; nr(:,nn) = nr(:,nn).*ratio; nd(:,nn) = nd(:,nn).*ratio; nmresp(:,nn) = resp; end