In the framework of the ISS Lyapunov formulation a small gain theorem has recently been proved which allows the explicit construction of Lyapunov functions for interconnected systems. In this note we recall the definitions of ISS Lyapunov functions and the corresponding general small gain theorems. These are then exemplarily used to prove input-to-state stability of and to construct ISS Lyapunov functions for four areas of applications: Linear systems, a Cohen-Grossberg neuronal network, error dynamics in formation control, as well as nonlinear transistor-linear resistor circuits
Submitted, 17 pagesIn this paper, we present a numerical algorithm for computing ISS Lyapunov func-t...
We consider the interconnections of arbitrary topology of a finite number of ISS hybrid systems and ...
Input-to-state stability (ISS) of a feedback interconnection of two discrete-time ISS systems satisf...
This paper provides a Lyapunov formulation of the cyclic-small-gain theorem for general dynamical ne...
The goal of this paper is to provide a Lyapunov statement and proof of the recent nonlinear small-ga...
Abstract. We consider interconnections of n nonlinear subsystems in the input-to-state stability (IS...
This paper presents a Lyapunov formulation of the cyclic-small-gain theorem for dynamical networks c...
This paper presents a Lyapunov formulation of the cyclic-small-gain theorem for dynamical networks c...
This paper presents a Lyapunov formulation of the cyclic-small-gain theorem for dynamical networks c...
Input-to-state stability (ISS) of a feedback interconnection of two discrete-time ISS systems satisf...
This paper presents a Lyapunov-based cyclic-small-gain theorem for the hybrid dynamical networks com...
Stability of an interconnected system consisting of two switched systems is investigated in the scen...
This technical report addresses necessary conditions and sufficient conditions for stability of inte...
This technical report addresses necessary conditions and sufficient conditions for stability of inte...
A general input-to-state stability (ISS)-type small-gain result is presented. It specializes to a sm...
Submitted, 17 pagesIn this paper, we present a numerical algorithm for computing ISS Lyapunov func-t...
We consider the interconnections of arbitrary topology of a finite number of ISS hybrid systems and ...
Input-to-state stability (ISS) of a feedback interconnection of two discrete-time ISS systems satisf...
This paper provides a Lyapunov formulation of the cyclic-small-gain theorem for general dynamical ne...
The goal of this paper is to provide a Lyapunov statement and proof of the recent nonlinear small-ga...
Abstract. We consider interconnections of n nonlinear subsystems in the input-to-state stability (IS...
This paper presents a Lyapunov formulation of the cyclic-small-gain theorem for dynamical networks c...
This paper presents a Lyapunov formulation of the cyclic-small-gain theorem for dynamical networks c...
This paper presents a Lyapunov formulation of the cyclic-small-gain theorem for dynamical networks c...
Input-to-state stability (ISS) of a feedback interconnection of two discrete-time ISS systems satisf...
This paper presents a Lyapunov-based cyclic-small-gain theorem for the hybrid dynamical networks com...
Stability of an interconnected system consisting of two switched systems is investigated in the scen...
This technical report addresses necessary conditions and sufficient conditions for stability of inte...
This technical report addresses necessary conditions and sufficient conditions for stability of inte...
A general input-to-state stability (ISS)-type small-gain result is presented. It specializes to a sm...
Submitted, 17 pagesIn this paper, we present a numerical algorithm for computing ISS Lyapunov func-t...
We consider the interconnections of arbitrary topology of a finite number of ISS hybrid systems and ...
Input-to-state stability (ISS) of a feedback interconnection of two discrete-time ISS systems satisf...