We present a new numerical method for the γ-iteration in robust control based on the extended matrix pencil formulation of [Benner, Byers, Mehrmann, Xu 2007]. The new method bases the γ iteration on the computation of special subspaces associated with matrix pencils. We introduce a permuted graph representation of these subspaces, which avoids the known difficulties that arise when the iteration is based on the solution of algebraic Riccati equations but at the same time makes use of the special symmetry structures that are present in the problems. We show that the new method is applicable in many situations where the conventional methods fail
AbstractIn optimal and robust control problems, the so-called continuous algebraic Riccati equation ...
The numerical computation of Lagrangian invariant subspaces of large scale Hamiltonian matrices is d...
AbstractIn this work, we consider the so-called Lur’e matrix equations that arise e.g. in model redu...
AbstractWe present a numerical method for the solution of the optimal H∞ control problem based on th...
We present a new numerical method (based on the computation of deflating subspaces) for the γ-iterat...
We present formulas for the construction of optimal H∞ controllers that can be implemented in a nume...
The $\mathcal{H}_\infty$ control problem is studied for linear constant coefficient descriptor syste...
We consider the (sub)optimal H∞-control problem for discrete time descriptor systems. Necessary and ...
We present a class of fast subspace algorithms based on orthogonal iterations for structured matrice...
AbstractWe derive necessary and sufficient conditions for the existence of the stabilizing solution ...
In this paper we employ the Rosenbrock system matrix pencil for the computation of output-nulling su...
The solution of the pole assignment problem by feedback in singular systems is parameterized and con...
We discuss numerical methods for the stabilization of large linear multi-input control systems of th...
AbstractWe present new algorithms for the numerical approximation of eigenvalues and invariant subsp...
We introduce a numerical method for the numerical solution of the Lur'e equations, a system of matri...
AbstractIn optimal and robust control problems, the so-called continuous algebraic Riccati equation ...
The numerical computation of Lagrangian invariant subspaces of large scale Hamiltonian matrices is d...
AbstractIn this work, we consider the so-called Lur’e matrix equations that arise e.g. in model redu...
AbstractWe present a numerical method for the solution of the optimal H∞ control problem based on th...
We present a new numerical method (based on the computation of deflating subspaces) for the γ-iterat...
We present formulas for the construction of optimal H∞ controllers that can be implemented in a nume...
The $\mathcal{H}_\infty$ control problem is studied for linear constant coefficient descriptor syste...
We consider the (sub)optimal H∞-control problem for discrete time descriptor systems. Necessary and ...
We present a class of fast subspace algorithms based on orthogonal iterations for structured matrice...
AbstractWe derive necessary and sufficient conditions for the existence of the stabilizing solution ...
In this paper we employ the Rosenbrock system matrix pencil for the computation of output-nulling su...
The solution of the pole assignment problem by feedback in singular systems is parameterized and con...
We discuss numerical methods for the stabilization of large linear multi-input control systems of th...
AbstractWe present new algorithms for the numerical approximation of eigenvalues and invariant subsp...
We introduce a numerical method for the numerical solution of the Lur'e equations, a system of matri...
AbstractIn optimal and robust control problems, the so-called continuous algebraic Riccati equation ...
The numerical computation of Lagrangian invariant subspaces of large scale Hamiltonian matrices is d...
AbstractIn this work, we consider the so-called Lur’e matrix equations that arise e.g. in model redu...