We consider the projected Lyapunov and Stein equations arising in model order reduction and optimal control of descriptor systems. The projected Lyapunov equation is transformed to an equivalent projected Stein equation then solved by a generalized Smith iterative method. For a projected general Stein equation with a singular matrix "E", a double Cayley transform is devised to remove the singularity, and then the generalized Smith method is applied. Numerical examples are provided to demonstrate the feasibility and efficiency of our approach.</p
AbstractIn the present paper, we propose Krylov subspace methods for solving large Lyapunov matrix e...
AbstractThis note studies the iterative solution to the Stein matrix equation. Firstly, it is shown ...
AbstractWe study generalized Lyapunov equations and present generalizations of Lyapunov stability th...
In this paper, we establish a model reduction technique for periodic discrete-time descriptor system...
The optimal projection approach to solving the H2 reduced order model problem produces two coupled, ...
We discuss the numerical solution of large-scale sparse projected discrete-time periodic Lyapunov eq...
In this paper, we establish a connection between Krylov subspace techniques for Multipoint Pade inte...
AbstractIn this paper, we establish a connection between Krylov subspace techniques for Multipoint P...
Periodic control systems are of interest in many engineering and mechanical research. Many important...
In the numerical treatment of large-scale Sylvester and Lyapunov equations, projection methods requi...
AbstractThe optimal projection approach to solving the H2 reduced order model problem produces two c...
This dissertation concerns the model reduction of linear periodic descriptor systems both in continu...
AbstractWe investigate projected iterative algorithms for solving constrained symmetric singular lin...
Abstract-First-order necessary conditions for quadratically optimal reduced-order modeling of linear...
In this note we present a modified cyclic low-rank Smith method to compute low-rank approximations t...
AbstractIn the present paper, we propose Krylov subspace methods for solving large Lyapunov matrix e...
AbstractThis note studies the iterative solution to the Stein matrix equation. Firstly, it is shown ...
AbstractWe study generalized Lyapunov equations and present generalizations of Lyapunov stability th...
In this paper, we establish a model reduction technique for periodic discrete-time descriptor system...
The optimal projection approach to solving the H2 reduced order model problem produces two coupled, ...
We discuss the numerical solution of large-scale sparse projected discrete-time periodic Lyapunov eq...
In this paper, we establish a connection between Krylov subspace techniques for Multipoint Pade inte...
AbstractIn this paper, we establish a connection between Krylov subspace techniques for Multipoint P...
Periodic control systems are of interest in many engineering and mechanical research. Many important...
In the numerical treatment of large-scale Sylvester and Lyapunov equations, projection methods requi...
AbstractThe optimal projection approach to solving the H2 reduced order model problem produces two c...
This dissertation concerns the model reduction of linear periodic descriptor systems both in continu...
AbstractWe investigate projected iterative algorithms for solving constrained symmetric singular lin...
Abstract-First-order necessary conditions for quadratically optimal reduced-order modeling of linear...
In this note we present a modified cyclic low-rank Smith method to compute low-rank approximations t...
AbstractIn the present paper, we propose Krylov subspace methods for solving large Lyapunov matrix e...
AbstractThis note studies the iterative solution to the Stein matrix equation. Firstly, it is shown ...
AbstractWe study generalized Lyapunov equations and present generalizations of Lyapunov stability th...