Mercurial > hg > ltpda
view m-toolbox/classes/+utils/@math/pfallps2.m @ 3:960fe1aa1c10 database-connection-manager
Add LTPDADatabaseConnectionManager implementation. Java code
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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% PFALLPS2 all pass filtering to stabilize TF poles and zeros. % %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% % DESCRIPTION: % % All pass filtering in order to stabilize transfer function poles and % zeros. It inputs a partial fraction expanded discrete model and % outputs a pole-zero minimum phase system % % CALL: % % [resp,np] = pfallps2(ip,mresp,f) % % INPUTS: % % ip: are poles % f: is the frequancies vector in (Hz) % fs: is the sampling frequency in (Hz) % % OUTPUTS: % % resp: is the functions phase frequency response % np: are the new stable poles % % NOTE: % %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% % VERSION: $Id: pfallpz.m,v 1.6 2009/06/10 15:47:00 luigi Exp $ % % HISTORY: 12-09-2008 L Ferraioli % Creation %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% function varargout = pfallps2(ip,mresp,f) [a,b] = size(ip); if a<b ip = ip.'; % reshape as a column vector end [a,b] = size(f); if a<b f = f.'; % reshape as a column vector end %%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% Nb = numel(ip); for nn = 1:Nb p = ip(nn).poles; % stabilizing poles sp = p; unst = real(p) > 0; sp(unst) = conj(sp(unst)); pp = p(unst); psp = sp(unst); allpstr = '(1'; for jj = 1:numel(sp(unst)) allpstr = [allpstr sprintf('.*((s-%0.20d)./(s+%0.20d))',pp(jj),psp(jj))]; end allpstr = [allpstr ')']; funcell{nn} = allpstr; end s = (1i*2*pi).*f; fullallprsp = 1; for nn = 1:Nb nterm = eval(funcell{nn}); % willing to work with columns if size(nterm,2)>1 nterm = nterm.'; end allprsp(:,nn) = nterm; fullallprsp = fullallprsp.*nterm; end phs = angle(fullallprsp); for kk=1:Nb resp(:,kk) = mresp(:,kk).*(cos(phs)+1i.*sin(phs)); end % output if nargout == 1 varargout{1} = resp; else error('Too many output arguments!') end end