Add to ORKGWe present a simpler elementary proof on positive topological entropy of the N-buffer switched flow networks based on a new simple theorem on positive topological entropy of continuous map on compact metric space. 1
summary:A continuous map $f$ of the interval is chaotic iff there is an increasing sequence of nonne...
Abstract. Let (X, d, T) be a dynamical system, where (X, d) is a compact metric space and T: X → X a...
Abstract. In discrete dynamical systems topological entropy is a topological invariant and a measure...
We present a simpler elementary proof on positive topological entropy of the N-buffer switched flow ...
We present a simple theory on topological entropy of the continuous maps defined on a compact metric...
We present a simple theory on topological entropy of the continuous maps defined on a compact metric...
We introduce a concept of measure-theoretic entropy for flows and study its invariance under measure...
In this thesis we study topological entropy as an invariant of topological dynamical systems. The fi...
In [1] the notion of topological entropy was introduced as a flow-isomorphism invariant. It was conj...
Discrete dynamical systems are given by the pair (X, f ) where X is a compact metric space and f : X...
In this paper, we consider positively weak measure expansive homeomorphisms and flows with the shado...
Robustness of water distribution networks is related to their connectivity and topological structure...
An effective construction of positive-entropy almost one-to-one topological extensions of the Chacón...
70 pages, 7 figuresInternational audienceIn this work, we introduce the notion of entropy at infinit...
Agraïments: The second author has been supported by Marie Curie IEF grant number 234559, and would l...
summary:A continuous map $f$ of the interval is chaotic iff there is an increasing sequence of nonne...
Abstract. Let (X, d, T) be a dynamical system, where (X, d) is a compact metric space and T: X → X a...
Abstract. In discrete dynamical systems topological entropy is a topological invariant and a measure...
We present a simpler elementary proof on positive topological entropy of the N-buffer switched flow ...
We present a simple theory on topological entropy of the continuous maps defined on a compact metric...
We present a simple theory on topological entropy of the continuous maps defined on a compact metric...
We introduce a concept of measure-theoretic entropy for flows and study its invariance under measure...
In this thesis we study topological entropy as an invariant of topological dynamical systems. The fi...
In [1] the notion of topological entropy was introduced as a flow-isomorphism invariant. It was conj...
Discrete dynamical systems are given by the pair (X, f ) where X is a compact metric space and f : X...
In this paper, we consider positively weak measure expansive homeomorphisms and flows with the shado...
Robustness of water distribution networks is related to their connectivity and topological structure...
An effective construction of positive-entropy almost one-to-one topological extensions of the Chacón...
70 pages, 7 figuresInternational audienceIn this work, we introduce the notion of entropy at infinit...
Agraïments: The second author has been supported by Marie Curie IEF grant number 234559, and would l...
summary:A continuous map $f$ of the interval is chaotic iff there is an increasing sequence of nonne...
Abstract. Let (X, d, T) be a dynamical system, where (X, d) is a compact metric space and T: X → X a...
Abstract. In discrete dynamical systems topological entropy is a topological invariant and a measure...