Linear matrix equations, such as the Sylvester and Lyapunov equations, play an important role in various applications, including the stability analysis and dimensionality reduction of linear dynamical control systems and the solution of partial differential equations. In this work, we present and analyze a new algorithm, based on tensorized Krylov subspaces, for quickly updating the solution of such a matrix equation when its coefficients undergo low-rank changes. We demonstrate how our algorithm can be utilized to accelerate the Newton method for solving continuous-time algebraic Riccati equations. Our algorithm also forms the basis of a new divide-and-conquer approach for linear matrix equations with coefficients that feature hierarchical...
Abstract. In this paper, we describe tensor methods for large systems of nonlinear equa-tions based ...
In the numerical treatment of large-scale Sylvester and Lyapunov equations, projection methods requi...
In this paper we propose a method for the numerical solution of linear systems of equations in low r...
Linear matrix equations, such as the Sylvester and Lyapunov equations, play an important role in var...
Linear matrix equations, such as the Sylvester and Lyapunov equations, play an important role in var...
In this work, we consider two types of large-scale quadratic matrix equations: continuous-time algeb...
Includes bibliographical references (pages 100-103).This dissertation deals with numerical solutions...
We consider generalizations of the Sylvester matrix equation, consisting of the sum of a Sylvester o...
This work is concerned with the numerical solution of large-scale linear matrix equations A1XB1T++AK...
none4siBlock Krylov subspace methods (KSMs) comprise building blocks in many state-of-the-art solver...
Matrix Lyapunov and Riccati equations are an important tool in mathematical systems theory. They are...
Balanced truncation is a standard technique for model reduction of linear time invariant dynamical s...
International audienceWe study large-scale, continuous-time linear time-invariant control systems wi...
This work develops novel rational Krylov methods for updating a large-scale matrix function f(A) whe...
Abstract. In this paper, we describe tensor methods for large systems of nonlinear equa-tions based ...
In the numerical treatment of large-scale Sylvester and Lyapunov equations, projection methods requi...
In this paper we propose a method for the numerical solution of linear systems of equations in low r...
Linear matrix equations, such as the Sylvester and Lyapunov equations, play an important role in var...
Linear matrix equations, such as the Sylvester and Lyapunov equations, play an important role in var...
In this work, we consider two types of large-scale quadratic matrix equations: continuous-time algeb...
Includes bibliographical references (pages 100-103).This dissertation deals with numerical solutions...
We consider generalizations of the Sylvester matrix equation, consisting of the sum of a Sylvester o...
This work is concerned with the numerical solution of large-scale linear matrix equations A1XB1T++AK...
none4siBlock Krylov subspace methods (KSMs) comprise building blocks in many state-of-the-art solver...
Matrix Lyapunov and Riccati equations are an important tool in mathematical systems theory. They are...
Balanced truncation is a standard technique for model reduction of linear time invariant dynamical s...
International audienceWe study large-scale, continuous-time linear time-invariant control systems wi...
This work develops novel rational Krylov methods for updating a large-scale matrix function f(A) whe...
Abstract. In this paper, we describe tensor methods for large systems of nonlinear equa-tions based ...
In the numerical treatment of large-scale Sylvester and Lyapunov equations, projection methods requi...
In this paper we propose a method for the numerical solution of linear systems of equations in low r...