A Path-Complete Lyapunov Function is an algebraic criterion composed of a finite number of functions, called pieces, and a directed, labeled graph defining Lyapunov inequalities between these pieces. It provides a stability certificate for discrete-time arbitrary switching systems. In this paper, we prove that the satisfiability of such a criterion implies the existence of a Common Lyapunov Function, expressed as the composition of minima and maxima of the pieces of the Path-Complete Lyapunov function. the converse however is not true even for discrete-time linear systems: we present such a system where a max-of-2 quadratics Lyapunov function exists while no corresponding Path-Complete Lyapunov function with 2 quadratic pieces exists. In li...
This paper presents an alternative approach for obtaining a converse Lyapunov theorem for discrete-t...
We show that for any positive integer d, there are families of switched linear systems— in fixed dim...
In this paper, we consider linear switched systems. x( t) = A(u( t))x( t), x is an element of R-n, u...
A Path-Complete Lyapunov Function is an algebraic criterion composed of a finite number of functions...
We study optimization-based criteria for the stability of switching systems, known as Path-Complete ...
We provide an algorithmic procedure allowing to compare stability certificates for discretetime swit...
International audienceWe use a graph-theory-based argument to propose a novel Lyapunov construction ...
We introduce the framework of path-complete graph Lyapunov functions for approximation of the joint ...
We study the stability of switching dynamical systems with the following dynamics
We study optimization-based criteria for the stability of switching systems, known as Path-Complete ...
We study path-complete Lyapunov functions, which are stability criteria for switched systems, descri...
This paper investigates, in the context of discrete-time switched systems, the problem of comparison...
We study criteria allowing to compare the conservativeness of stability certificates for switching s...
In this paper, in the framework of stability analysis of switched systems, we review and analyze mul...
International audienceIt is known that for consensus of systems interconnected under a general direc...
This paper presents an alternative approach for obtaining a converse Lyapunov theorem for discrete-t...
We show that for any positive integer d, there are families of switched linear systems— in fixed dim...
In this paper, we consider linear switched systems. x( t) = A(u( t))x( t), x is an element of R-n, u...
A Path-Complete Lyapunov Function is an algebraic criterion composed of a finite number of functions...
We study optimization-based criteria for the stability of switching systems, known as Path-Complete ...
We provide an algorithmic procedure allowing to compare stability certificates for discretetime swit...
International audienceWe use a graph-theory-based argument to propose a novel Lyapunov construction ...
We introduce the framework of path-complete graph Lyapunov functions for approximation of the joint ...
We study the stability of switching dynamical systems with the following dynamics
We study optimization-based criteria for the stability of switching systems, known as Path-Complete ...
We study path-complete Lyapunov functions, which are stability criteria for switched systems, descri...
This paper investigates, in the context of discrete-time switched systems, the problem of comparison...
We study criteria allowing to compare the conservativeness of stability certificates for switching s...
In this paper, in the framework of stability analysis of switched systems, we review and analyze mul...
International audienceIt is known that for consensus of systems interconnected under a general direc...
This paper presents an alternative approach for obtaining a converse Lyapunov theorem for discrete-t...
We show that for any positive integer d, there are families of switched linear systems— in fixed dim...
In this paper, we consider linear switched systems. x( t) = A(u( t))x( t), x is an element of R-n, u...