trzeros — transmission zeros and normal rank
[tr]=trzeros(Sl) [nt,dt,rk]=trzeros(Sl)
linear system (syslin list)
complex vectors
real vector
integer (normal rank of Sl)
Called with one output argument, trzeros(Sl) returns the
transmission zeros of the linear system Sl.
Sl may have a polynomial (but square) D matrix.
Called with 2 output arguments, trzeros returns the
transmission zeros of the linear system Sl as tr=nt./dt;
(Note that some components of dt may be zeros)
Called with 3 output arguments, rk is the normal rank of Sl
Transfer matrices are converted to state-space.
If Sl is a (square) polynomial matrix trzeros returns the
roots of its determinant.
For usual state-space system trzeros uses the state-space
algorithm of Emami-Naeni and Van Dooren.
If D is invertible the transmission zeros are the eigenvalues
of the "A matrix" of the inverse system : A - B*inv(D)*C;
If C*B is invertible the transmission zeros are the eigenvalues
of N*A*M where M*N is a full rank factorization of
eye(A)-B*inv(C*B)*C;
For systems with a polynomial D matrix zeros are
calculated as the roots of the determinant of the system matrix.
Caution: the computed zeros are not always reliable, in particular in case of repeated zeros.
W1=ssrand(2,2,5);trzeros(W1) //call trzeros roots(det(systmat(W1))) //roots of det(system matrix) s=poly(0,'s');W=[1/(s+1);1/(s-2)];W2=(s-3)*W*W';[nt,dt,rk]=trzeros(W2); St=systmat(tf2ss(W2));[Q,Z,Qd,Zd,numbeps,numbeta]=kroneck(St); St1=Q*St*Z;rowf=(Qd(1)+Qd(2)+1):(Qd(1)+Qd(2)+Qd(3)); colf=(Zd(1)+Zd(2)+1):(Zd(1)+Zd(2)+Zd(3)); roots(St1(rowf,colf)), nt./dt //By Kronecker form