AbstractWe consider the problem of computing the inverse of a large class of infinite systems of linear equations, which are described by a finite set of data. The class consists of equations in which the linear operator is represented by a discrete time-varying dynamical system whose local state space is of finite dimension at each time point k, and which reduces to time invariant systems for time points k→±∞. In this generalization of classical matrix inversion theory, inner–outer factorizations of operators play the role that QR-factorization plays in classical linear algebra. Numerically, they lead to so-called `square root' implementations, for which attractive algorithms can be derived, which do not require the determination of spurio...
AbstractIn this paper we develop various representations for systems described by aset of high-order...
AbstractThe problem of approximating the solution of infinite linear systems finitely expressed by a...
AbstractInfinite matrices, the forerunner and a main constituent of many branches of classical mathe...
AbstractWe consider the problem of computing the inverse of a large class of infinite systems of lin...
AbstractWe study a class of block structured matrices R={Rij}i,j=1N with a property that the solutio...
Linear algebra problems such as matrix-vector multiplication, inversion and factorizations may be st...
We introduce a numerical method for the numerical solution of the Lur'e equations, a system of matri...
AbstractA new stability preserving model reduction algorithm for discrete linear SISO-systems based ...
AbstractWe derive minimal quasi-separable (i.e. state space) representations for the upper and lower...
AbstractLU-factorization has been an original motivation for the development of Semi-Separability (s...
We present a simple bound on the finite horizon ℒ2/[0, T]-induced norm of a linear time-invariant (L...
AbstractThis paper deals with the existence and associated realization theory of skew polynomial fra...
this paper that the concept of time-varying state dimensions (which is necessary for minimal realiza...
We consider linear discrete-time descriptor systems, i.e. systems of linear equations of the form $E...
International audienceIn this paper, we study the problem of computing the $\mathcal{L}\infty$- nor...
AbstractIn this paper we develop various representations for systems described by aset of high-order...
AbstractThe problem of approximating the solution of infinite linear systems finitely expressed by a...
AbstractInfinite matrices, the forerunner and a main constituent of many branches of classical mathe...
AbstractWe consider the problem of computing the inverse of a large class of infinite systems of lin...
AbstractWe study a class of block structured matrices R={Rij}i,j=1N with a property that the solutio...
Linear algebra problems such as matrix-vector multiplication, inversion and factorizations may be st...
We introduce a numerical method for the numerical solution of the Lur'e equations, a system of matri...
AbstractA new stability preserving model reduction algorithm for discrete linear SISO-systems based ...
AbstractWe derive minimal quasi-separable (i.e. state space) representations for the upper and lower...
AbstractLU-factorization has been an original motivation for the development of Semi-Separability (s...
We present a simple bound on the finite horizon ℒ2/[0, T]-induced norm of a linear time-invariant (L...
AbstractThis paper deals with the existence and associated realization theory of skew polynomial fra...
this paper that the concept of time-varying state dimensions (which is necessary for minimal realiza...
We consider linear discrete-time descriptor systems, i.e. systems of linear equations of the form $E...
International audienceIn this paper, we study the problem of computing the $\mathcal{L}\infty$- nor...
AbstractIn this paper we develop various representations for systems described by aset of high-order...
AbstractThe problem of approximating the solution of infinite linear systems finitely expressed by a...
AbstractInfinite matrices, the forerunner and a main constituent of many branches of classical mathe...