AbstractThe problem of eliminating the right half plane zeros of an rmvf (rational matrix valued function) G(z) with minimal realization G(z)=D+C(zIn−A)−1B by multiplication on the right by a suitably chosen J-inner rmvf Θ(z) is studied. The analysis exploits the theory of Smith–McMillan forms to extend the method of J-lossless conjugators that was introduced by Kimura to more general settings
Minimal bases of rational vector spaces are a well-known and important tool in systems theory. If m...
We shall study three different, yet related mathematical problems. The first is given as follows. Be...
We study the structure of the zeros of optimal polynomial approximants to reciprocals of functions i...
AbstractThe problem of eliminating the right half plane zeros of an rmvf (rational matrix valued fun...
AbstractThe problem of eliminating the right half plane poles of an rmvf (rational matrix valued fun...
AbstractThe problem of cancelling a specified part of the zeros of a completely general rational mat...
AbstractWe study the problem of eliminating the minimal indices (the indices of a minimal polynomial...
AbstractGiven a rational m × n matrix function W(z) and a subset σ of the complex plane C, we give a...
AbstractWe develop a recursive algorithm for obtaining factorizations of the type R(λ)=R1(λ)R2(λ) wh...
AbstractThe extended (J, J′)-lossless factorization for discrete-time rational matrix functions with...
AbstractWe show that the singularities of a matrix-valued noncommutative rational function which is ...
AbstractIn this paper, we present a direct algorithm to construct the minimal Z-pairs for rational f...
AbstractGiven the location of the zeros and poles of a rational function, we find a region that must...
AbstractThe paper is concerned with description of common zero data of two square size rational matr...
AbstractIn an earlier work, the authors have introduced a coordinate-free, module-theoretic definiti...
Minimal bases of rational vector spaces are a well-known and important tool in systems theory. If m...
We shall study three different, yet related mathematical problems. The first is given as follows. Be...
We study the structure of the zeros of optimal polynomial approximants to reciprocals of functions i...
AbstractThe problem of eliminating the right half plane zeros of an rmvf (rational matrix valued fun...
AbstractThe problem of eliminating the right half plane poles of an rmvf (rational matrix valued fun...
AbstractThe problem of cancelling a specified part of the zeros of a completely general rational mat...
AbstractWe study the problem of eliminating the minimal indices (the indices of a minimal polynomial...
AbstractGiven a rational m × n matrix function W(z) and a subset σ of the complex plane C, we give a...
AbstractWe develop a recursive algorithm for obtaining factorizations of the type R(λ)=R1(λ)R2(λ) wh...
AbstractThe extended (J, J′)-lossless factorization for discrete-time rational matrix functions with...
AbstractWe show that the singularities of a matrix-valued noncommutative rational function which is ...
AbstractIn this paper, we present a direct algorithm to construct the minimal Z-pairs for rational f...
AbstractGiven the location of the zeros and poles of a rational function, we find a region that must...
AbstractThe paper is concerned with description of common zero data of two square size rational matr...
AbstractIn an earlier work, the authors have introduced a coordinate-free, module-theoretic definiti...
Minimal bases of rational vector spaces are a well-known and important tool in systems theory. If m...
We shall study three different, yet related mathematical problems. The first is given as follows. Be...
We study the structure of the zeros of optimal polynomial approximants to reciprocals of functions i...