The main aim of this paper is localization of the chain recurrent set in shape theoretical framework. Namely, using the intrinsic approach to shape from [1] we present a result which claims that under certain conditions the chain recurrent set preserves local shape properties. We proved this result in [2] using the notion of a proper covering. Here we give a new proof using the Lebesque number for a covering and verify this result by investigating the symbolical image of a couple of systems of differential equations following [3]
AbstractIn this paper, we introduce a new concept called ‘a pair of coincident invariant measures’ a...
Abstract Some properties of internally chain transitive sets for continuous maps in metric spaces ar...
It is known by the Conley’s theorem that the chain recurrent set CR(’) of a deterministic flow’ on a...
Abstract. In this paper we present equivalent definitions of chain recurrent set for continuous dyna...
In this paper we give a new definition of the chain recurrent set of a continuous map using finite s...
When studying the behaviour of dynamical systems, one particular goal is to find and isolate the per...
International audienceFor a continuous flow on a compact metric space, the aim of this paper is to p...
The global behavior of a dynamical system can be described by its Morse decompositions or its attrac...
n this paper we associate a pseudo-metric to a dynamical system on a compact metric space. We show t...
In the study of some dynamical systems the limsup set of a sequence of measurable sets is often of i...
In this series of three papers, we study the geometrical and statistical structure of a class of cou...
In a series of three papers, we study the geometrical and statistical structure of a class of couple...
We introduce “state space persistence analysis” for deducing the symbolic dynamics of time series da...
this paper, and in particular by applying Theorem 3.9 below. In the case corresponding to the identi...
We call a property is a stable (or robust) property if it holds for a system as well as all nearby s...
AbstractIn this paper, we introduce a new concept called ‘a pair of coincident invariant measures’ a...
Abstract Some properties of internally chain transitive sets for continuous maps in metric spaces ar...
It is known by the Conley’s theorem that the chain recurrent set CR(’) of a deterministic flow’ on a...
Abstract. In this paper we present equivalent definitions of chain recurrent set for continuous dyna...
In this paper we give a new definition of the chain recurrent set of a continuous map using finite s...
When studying the behaviour of dynamical systems, one particular goal is to find and isolate the per...
International audienceFor a continuous flow on a compact metric space, the aim of this paper is to p...
The global behavior of a dynamical system can be described by its Morse decompositions or its attrac...
n this paper we associate a pseudo-metric to a dynamical system on a compact metric space. We show t...
In the study of some dynamical systems the limsup set of a sequence of measurable sets is often of i...
In this series of three papers, we study the geometrical and statistical structure of a class of cou...
In a series of three papers, we study the geometrical and statistical structure of a class of couple...
We introduce “state space persistence analysis” for deducing the symbolic dynamics of time series da...
this paper, and in particular by applying Theorem 3.9 below. In the case corresponding to the identi...
We call a property is a stable (or robust) property if it holds for a system as well as all nearby s...
AbstractIn this paper, we introduce a new concept called ‘a pair of coincident invariant measures’ a...
Abstract Some properties of internally chain transitive sets for continuous maps in metric spaces ar...
It is known by the Conley’s theorem that the chain recurrent set CR(’) of a deterministic flow’ on a...