AbstractIn this work, we consider the so-called Lur’e matrix equations that arise e.g. in model reduction and linear-quadratic infinite time horizon optimal control. We characterize the set of solutions in terms of deflating subspaces of even matrix pencils. In particular, it is shown that there exist solutions which are extremal in terms of definiteness. It is shown how these special solutions can be constructed via deflating subspaces of even matrix pencils
Abstract. This paper presents algorithms for computing stable Lagrangian invariant subspaces of a Ha...
AbstractWe study the discrete time algebraic Riccati equation. In particular we show that even in th...
In this monograph, we solve rather general linear, infinite-dimensional, time-invariant control prob...
AbstractIn this work, we consider the so-called Lur’e matrix equations that arise e.g. in model redu...
We introduce a numerical method for the numerical solution of the Lur'e equations, a system of matri...
In this master’s thesis we adapt recent results on optimal control of continuous-time linear differe...
AbstractThe conditions for the existence of a unique solution of the matrix equation AXB−CXD=E are p...
AbstractUnmixed solutions of the matrix equation XDX+XA+AX*−C=0, D⩾0 are studied
This paper investigates the properties of the solutions of the generalised discrete algebraic Riccat...
AbstractIf a matrix pencil A−λB is known only to within a tolerance ϵ (because of measurement or rou...
[[abstract]]This paper presents algorithms far computing stable Lagrangian invariant subspaces of a ...
AbstractInfinite matrices, the forerunner and a main constituent of many branches of classical mathe...
The $\mathcal{H}_\infty$ control problem is studied for linear constant coefficient descriptor syste...
AbstractThe infinite-dimensional versions of the linear quadratic cost control problem and of the li...
AbstractMatrix pencils depending on a parameter and their canonical forms under equivalence are disc...
Abstract. This paper presents algorithms for computing stable Lagrangian invariant subspaces of a Ha...
AbstractWe study the discrete time algebraic Riccati equation. In particular we show that even in th...
In this monograph, we solve rather general linear, infinite-dimensional, time-invariant control prob...
AbstractIn this work, we consider the so-called Lur’e matrix equations that arise e.g. in model redu...
We introduce a numerical method for the numerical solution of the Lur'e equations, a system of matri...
In this master’s thesis we adapt recent results on optimal control of continuous-time linear differe...
AbstractThe conditions for the existence of a unique solution of the matrix equation AXB−CXD=E are p...
AbstractUnmixed solutions of the matrix equation XDX+XA+AX*−C=0, D⩾0 are studied
This paper investigates the properties of the solutions of the generalised discrete algebraic Riccat...
AbstractIf a matrix pencil A−λB is known only to within a tolerance ϵ (because of measurement or rou...
[[abstract]]This paper presents algorithms far computing stable Lagrangian invariant subspaces of a ...
AbstractInfinite matrices, the forerunner and a main constituent of many branches of classical mathe...
The $\mathcal{H}_\infty$ control problem is studied for linear constant coefficient descriptor syste...
AbstractThe infinite-dimensional versions of the linear quadratic cost control problem and of the li...
AbstractMatrix pencils depending on a parameter and their canonical forms under equivalence are disc...
Abstract. This paper presents algorithms for computing stable Lagrangian invariant subspaces of a Ha...
AbstractWe study the discrete time algebraic Riccati equation. In particular we show that even in th...
In this monograph, we solve rather general linear, infinite-dimensional, time-invariant control prob...