In this paper, we study possible low rank solution methods for generalized Lyapunov equations arising in bilinear and stochastic control. We show that under certain assumptions one can expect a strong singular value decay in the solution matrix allowing for low rank approximations. Since the theoretical tools strongly make use of a connection to the standard linear Lyapunov equation, we can even extend the result to the d-dimensional case described by a tensorized linear system of equations. We further provide some reasonable extensions of some of the most frequently used linear low rank solution techniques such as the alternating directions implicit (ADI) iteration and the Krylov-Plus-Inverted-Krylov (K-PIK) method. By means of some standa...
We discuss the numerical solution of large-scale sparse projected discrete-time periodic Lyapunov eq...
One of the most computationally expensive steps of the low-rank ADI method for large-scale Lyapunov ...
We address the problem of computing a low-rank estimate Y of the solution X of the Lyapunov equation...
In this paper, we study possible low rank solution methods for generalized Lyapunov equations arisin...
Abstract. This paper presents the Cholesky factor–alternating direction implicit (CF–ADI) algorithm,...
This paper is concerned with the numerical solution of symmetric large-scale Lyapunov equations with...
none3siAn iterative method for the low-rank approximate solution of a class of generalized Lyapunov ...
In this note we present a modified cyclic low-rank Smith method to compute low-rank approximations t...
In this note we present a modified cyclic low-rank Smith method to compute low-rank approximations t...
AbstractThe Lyapunov matrix equation AX+XA⊤=B is N-stable when all eigenvalues of the real n×n matri...
Abstract. This paper presents the Cholesky factor–alternating direction implicit (CF–ADI) algo-rithm...
This Article- Conference proceedings is brought to you for free and open access by Scholars ' M...
This work was also published as a Rice University thesis/dissertation: http://hdl.handle.net/1911/96...
Two approaches for approximating the solution of large-scale Lyapunov equations are considered: the ...
The low-rank alternating directions implicit (LR-ADI) iteration is a frequently employed method for ...
We discuss the numerical solution of large-scale sparse projected discrete-time periodic Lyapunov eq...
One of the most computationally expensive steps of the low-rank ADI method for large-scale Lyapunov ...
We address the problem of computing a low-rank estimate Y of the solution X of the Lyapunov equation...
In this paper, we study possible low rank solution methods for generalized Lyapunov equations arisin...
Abstract. This paper presents the Cholesky factor–alternating direction implicit (CF–ADI) algorithm,...
This paper is concerned with the numerical solution of symmetric large-scale Lyapunov equations with...
none3siAn iterative method for the low-rank approximate solution of a class of generalized Lyapunov ...
In this note we present a modified cyclic low-rank Smith method to compute low-rank approximations t...
In this note we present a modified cyclic low-rank Smith method to compute low-rank approximations t...
AbstractThe Lyapunov matrix equation AX+XA⊤=B is N-stable when all eigenvalues of the real n×n matri...
Abstract. This paper presents the Cholesky factor–alternating direction implicit (CF–ADI) algo-rithm...
This Article- Conference proceedings is brought to you for free and open access by Scholars ' M...
This work was also published as a Rice University thesis/dissertation: http://hdl.handle.net/1911/96...
Two approaches for approximating the solution of large-scale Lyapunov equations are considered: the ...
The low-rank alternating directions implicit (LR-ADI) iteration is a frequently employed method for ...
We discuss the numerical solution of large-scale sparse projected discrete-time periodic Lyapunov eq...
One of the most computationally expensive steps of the low-rank ADI method for large-scale Lyapunov ...
We address the problem of computing a low-rank estimate Y of the solution X of the Lyapunov equation...