The discrete-time bounded-real lemma is further developed for nonminimal digital systems. Based on this lemma, rigorous necessary and sufficient conditions for the existence of positive definite solutions to the Lyapunov equation for n-dimensional (n-D) digital systems are proposed. These new conditions are improvements and extensions of earlier conditions and can be applied to n-D digital systems with characteristic polynomials involving 1-D factor polynomials. Further, the results in this paper show that the positive definite solutions to the n-D Lyapunov equation of a n-D system with characteristic polynomial involving 1-D factors can be obtained from the solutions of a k-D (o ≤ k ≤ n) subsystem and m (1 ≤ m ≤ n) 1-D subsystems. This cou...
We show that for any positive integer d, there are families of switched linear systems— in fixed dim...
his paper deals with the existence and synthesis of parameterized-(control) Lyapunov functions (p-(C...
This paper proposes a set of Lyapunov-type conditions that are suited for stability analysis of larg...
Lower bounds for the stability margins of 2-D digital systems are extended to n-D systems. These bou...
The very strict positive real lemma is further developed for nonminimal 1-D continuous-time systems ...
This paper considers the problem of computing a Lyapunov function for nonlinear discrete–time system...
In this article we look into stability properties of strongly autonomous n-D systems, i.e. systems h...
Non-negative definite Lyapunov functionals are employed to obtain sufficient conditions that guarant...
AbstractThe aim of this article is to present some new stability sufficient conditions for discrete-...
This paper is concerned with the problem of stability analysis for delayed linear discrete-time syst...
AbstractIt is given a simple and unified new proof for the following well-known stability condition:...
This paper considers the problem of stability verification for discrete–time nonlinear systems via L...
This paper presents an alternative approach for obtaining a converse Lyapunov theorem for discrete-t...
This paper addresses the problem of establishing stability of 2D mixed continuous-discrete-time syst...
AbstractThis paper describes how the well-known Lyapunov theory can be used for thedevelopment of a ...
We show that for any positive integer d, there are families of switched linear systems— in fixed dim...
his paper deals with the existence and synthesis of parameterized-(control) Lyapunov functions (p-(C...
This paper proposes a set of Lyapunov-type conditions that are suited for stability analysis of larg...
Lower bounds for the stability margins of 2-D digital systems are extended to n-D systems. These bou...
The very strict positive real lemma is further developed for nonminimal 1-D continuous-time systems ...
This paper considers the problem of computing a Lyapunov function for nonlinear discrete–time system...
In this article we look into stability properties of strongly autonomous n-D systems, i.e. systems h...
Non-negative definite Lyapunov functionals are employed to obtain sufficient conditions that guarant...
AbstractThe aim of this article is to present some new stability sufficient conditions for discrete-...
This paper is concerned with the problem of stability analysis for delayed linear discrete-time syst...
AbstractIt is given a simple and unified new proof for the following well-known stability condition:...
This paper considers the problem of stability verification for discrete–time nonlinear systems via L...
This paper presents an alternative approach for obtaining a converse Lyapunov theorem for discrete-t...
This paper addresses the problem of establishing stability of 2D mixed continuous-discrete-time syst...
AbstractThis paper describes how the well-known Lyapunov theory can be used for thedevelopment of a ...
We show that for any positive integer d, there are families of switched linear systems— in fixed dim...
his paper deals with the existence and synthesis of parameterized-(control) Lyapunov functions (p-(C...
This paper proposes a set of Lyapunov-type conditions that are suited for stability analysis of larg...