AbstractA parallel iterative scheme for solving coupled algebraic Lyapunov equations of discrete-time jump linear systems with Markovian transitions is introduced. The algorithm is computationally efficient since it operates on reduced-order decoupled algebraic discrete Lyapunov equations. Furthermore, the solutions at every iteration are computed by elementary matrix operations. Hence, the number of operations is minimal. Monotonicity of convergence is established under the existence conditions of unique positive solutions
AbstractLyapunov and Sylvester equations play an important role in linear systems theory. This paper...
Lyapunov and Sylvester equations play an important role in linear systems theory. This paper deals w...
AbstractIn this paper an algorithm for solving coupled differential matrix systems is presented. By ...
AbstractA parallel iterative scheme for solving coupled algebraic Lyapunov equations of discrete-tim...
AbstractIn this paper, two iterative methods are given to solve coupled discrete Markovian jump Lyap...
The solution of coupled discrete-time Markovian jump Lyapunov matrix equations (CDMJLMEs) is importa...
AbstractThe solution of coupled discrete-time Markovian jump Lyapunov matrix equations (CDMJLMEs) is...
In this paper, two iterative methods are given to solve coupled discrete Markovian jump Lyapunov equ...
© 2015 IEEE.In this technical note, implicit iterative algorithms with some tunable parameters are d...
© The Institution of Engineering and Technology 2016.In this study, the authors aim to study explici...
This paper studies the iterative solutions of Lyapunov matrix equations associated with Itô stochast...
AbstractThis paper describes how the well-known Lyapunov theory can be used for thedevelopment of a ...
The characterization of polynomials whose zeros lie in certain algebraic domains (and the unificatio...
This paper presents new sufficient conditions for convergence and asymptotic or exponential stabilit...
This article is concerned with the efficient numerical solution of the Lyapunov equation A(T) X + XA...
AbstractLyapunov and Sylvester equations play an important role in linear systems theory. This paper...
Lyapunov and Sylvester equations play an important role in linear systems theory. This paper deals w...
AbstractIn this paper an algorithm for solving coupled differential matrix systems is presented. By ...
AbstractA parallel iterative scheme for solving coupled algebraic Lyapunov equations of discrete-tim...
AbstractIn this paper, two iterative methods are given to solve coupled discrete Markovian jump Lyap...
The solution of coupled discrete-time Markovian jump Lyapunov matrix equations (CDMJLMEs) is importa...
AbstractThe solution of coupled discrete-time Markovian jump Lyapunov matrix equations (CDMJLMEs) is...
In this paper, two iterative methods are given to solve coupled discrete Markovian jump Lyapunov equ...
© 2015 IEEE.In this technical note, implicit iterative algorithms with some tunable parameters are d...
© The Institution of Engineering and Technology 2016.In this study, the authors aim to study explici...
This paper studies the iterative solutions of Lyapunov matrix equations associated with Itô stochast...
AbstractThis paper describes how the well-known Lyapunov theory can be used for thedevelopment of a ...
The characterization of polynomials whose zeros lie in certain algebraic domains (and the unificatio...
This paper presents new sufficient conditions for convergence and asymptotic or exponential stabilit...
This article is concerned with the efficient numerical solution of the Lyapunov equation A(T) X + XA...
AbstractLyapunov and Sylvester equations play an important role in linear systems theory. This paper...
Lyapunov and Sylvester equations play an important role in linear systems theory. This paper deals w...
AbstractIn this paper an algorithm for solving coupled differential matrix systems is presented. By ...