AbstractWe derive minimal representations for the inverses of Lyapunov and Sylvester operators
This article gives algorithms for V- and W-operators in inverse resolution. It discusses also the co...
This paper deals with a module theoretic approach to the dipolynomial matrix parametrization of disc...
AbstractWe develop a theory of minimal realizations of a finite sequence over an integral domain R, ...
AbstractSylvester and Lyapunov operators in real and complex matrix spaces are studied, which includ...
Sylvester and Lyapunov operators in real and complex matrix spaces are studied, which include as par...
AbstractWe derive minimal quasi-separable (i.e. state space) representations for the upper and lower...
The main topic of the thesis is the study of inverse problems and, in particular, it is the study of...
AbstractThe problem of minimal inverses for linear time invariant multivariable systems is formulate...
We present a new method for the computation of Lyapunov exponents utilizing representations of ortho...
We give a sufficient condition (the solvability of two standard equations) of Sylvester matrix by us...
AbstractWe study the existence of generalized inverses which are minimal with respect to vector norm...
We want look at the coordinate-free formulation of the idea of a diagonal matrix, which will be call...
AbstractThe group inverse J# of the Sylvester transformation J(X) = AX − XB is (provided that it exi...
The work covers the subalgebras of the linear limited operators with certain structure of decreasing...
We propose an algorithm for computing the inverses of rational matrices and in particular the invers...
This article gives algorithms for V- and W-operators in inverse resolution. It discusses also the co...
This paper deals with a module theoretic approach to the dipolynomial matrix parametrization of disc...
AbstractWe develop a theory of minimal realizations of a finite sequence over an integral domain R, ...
AbstractSylvester and Lyapunov operators in real and complex matrix spaces are studied, which includ...
Sylvester and Lyapunov operators in real and complex matrix spaces are studied, which include as par...
AbstractWe derive minimal quasi-separable (i.e. state space) representations for the upper and lower...
The main topic of the thesis is the study of inverse problems and, in particular, it is the study of...
AbstractThe problem of minimal inverses for linear time invariant multivariable systems is formulate...
We present a new method for the computation of Lyapunov exponents utilizing representations of ortho...
We give a sufficient condition (the solvability of two standard equations) of Sylvester matrix by us...
AbstractWe study the existence of generalized inverses which are minimal with respect to vector norm...
We want look at the coordinate-free formulation of the idea of a diagonal matrix, which will be call...
AbstractThe group inverse J# of the Sylvester transformation J(X) = AX − XB is (provided that it exi...
The work covers the subalgebras of the linear limited operators with certain structure of decreasing...
We propose an algorithm for computing the inverses of rational matrices and in particular the invers...
This article gives algorithms for V- and W-operators in inverse resolution. It discusses also the co...
This paper deals with a module theoretic approach to the dipolynomial matrix parametrization of disc...
AbstractWe develop a theory of minimal realizations of a finite sequence over an integral domain R, ...