Free access online proceedingsThis paper investigates the topological entropy of continuous-time polytopic systems. The topological entropy is a measure that quantifies the instability in dynamical linear systems and has important applications in autonomous systems. Polytopic systems are dynamical linear systems whose coefficients are functions of an uncertain vector constrained into a polytope. A novel approach is proposed for establishing upper bounds of the largest topological entropy of continuous-time polytopic systems based on the Routh-Hurwitz stability criterion. The upper bounds are established through Linear Matrix Inequality (LMI) feasibility tests, which amount to solving convex optimization problems. A numerical example illustr...
Discrete dynamical systems are given by the pair (X, f ) where X is a compact metric space and f : X...
Summarization: The problem of stochastic stability of continuous dynamic systems is examined from th...
AbstractThe well-known combinatorial lemma of Karpovsky, Milman and Alon and a very recent one of Ke...
The topological entropy plays a key role in linear dynamical systems, allowing one to establish the ...
The topological entropy is a measure that quantifies the unstable of a dynamical system, and plays a...
In this work we develop a method for finding rigorous bounds for topological entropy of discrete tim...
We present a method to compute rigorous upper bounds for the topological entropy h(T,A) of a continu...
There are many tools todeal with the idea of "complex dynamical behaviour" for the family C(I) of co...
Abstract—It is well known in the field of dynamical systems that entropy can be defined rigorously f...
In this thesis, we provide an initial investigation into bounds for topological entropy of switched ...
AbstractWe study the topological entropy of a particular class of dynamical systems: cellular automa...
The aim of this paper is to analyze a classical duopoly model introduced by Tönu Puu in 1991. For th...
We study the topological entropy of a particular class of dynamical systems: cellular automata. The ...
We study here a method for estimating the topological entropy of a smooth dynamical system. Our meth...
A well-known formula for the topological entropy of a symbolic system is htop(X) = limn→∞ log N(Λn)/...
Discrete dynamical systems are given by the pair (X, f ) where X is a compact metric space and f : X...
Summarization: The problem of stochastic stability of continuous dynamic systems is examined from th...
AbstractThe well-known combinatorial lemma of Karpovsky, Milman and Alon and a very recent one of Ke...
The topological entropy plays a key role in linear dynamical systems, allowing one to establish the ...
The topological entropy is a measure that quantifies the unstable of a dynamical system, and plays a...
In this work we develop a method for finding rigorous bounds for topological entropy of discrete tim...
We present a method to compute rigorous upper bounds for the topological entropy h(T,A) of a continu...
There are many tools todeal with the idea of "complex dynamical behaviour" for the family C(I) of co...
Abstract—It is well known in the field of dynamical systems that entropy can be defined rigorously f...
In this thesis, we provide an initial investigation into bounds for topological entropy of switched ...
AbstractWe study the topological entropy of a particular class of dynamical systems: cellular automa...
The aim of this paper is to analyze a classical duopoly model introduced by Tönu Puu in 1991. For th...
We study the topological entropy of a particular class of dynamical systems: cellular automata. The ...
We study here a method for estimating the topological entropy of a smooth dynamical system. Our meth...
A well-known formula for the topological entropy of a symbolic system is htop(X) = limn→∞ log N(Λn)/...
Discrete dynamical systems are given by the pair (X, f ) where X is a compact metric space and f : X...
Summarization: The problem of stochastic stability of continuous dynamic systems is examined from th...
AbstractThe well-known combinatorial lemma of Karpovsky, Milman and Alon and a very recent one of Ke...