Add to ORKGWe introduce the Ellis semigroup of a nonautonomous discrete dynamical system (X, f1,∞) when X is a metric compact space. The underlying set of this semigroup is the pointwise closure of {fn1| n ∈ N) in the space Xx. By using the convergence of a sequence of points with respect to an ultrafilter it is possible to give a precise description of the semigroup and its operation. This notion extends the classical Ellis semigroup of a discrete dynamical system. We show several properties that connect this semigroup and the topological properties of the nonautonomous discrete dynamical system.Keywords: Free ultrafilter, discrete dynamical system, nonautonomous discrete dynamical system, Ellis semigroup, compact metric space, p-limit poin
This work deals with certain point patterns of an Euclidean space, for which the calculation of the ...
This work deals with certain point patterns of an Euclidean space, for which the calculation of the ...
peer reviewedIn the theory of dynamical systems, the notion of ω-limit sets of points is classical. ...
summary:We consider discrete dynamical systems whose phase spaces are compact metrizable countable s...
Abstract. A dynamical version of the Bourgain-Fremlin-Talagrand dichotomy shows that the enveloping ...
We consider a discrete non-autonomous semi-dynamical system generated by a family of continuous maps...
Nonautonomous dynamical systems provide a mathematical framework for temporally changing phenomena, ...
The ultimate goal of this thesis is to present how the Stone–Čech Compactification can be used to ca...
We define and study expansiveness, shadowing, and topological stability for a nonautonomous discrete...
AbstractGiven a dynamical system (X,f) with X a compact metric space and a free ultrafilter p on N, ...
The area of dynamical systems where one investigates dynamical properties that can be described in t...
International audienceWe discuss the application of various concepts from the theory of topological ...
International audienceWe discuss the application of various concepts from the theory of topological ...
Our main focus will be to investigate the various facets of what are commonly called dynamical syste...
Abstract. A new class of dynamical systems is defined, the class of “locally equicon-tinuous systems...
This work deals with certain point patterns of an Euclidean space, for which the calculation of the ...
This work deals with certain point patterns of an Euclidean space, for which the calculation of the ...
peer reviewedIn the theory of dynamical systems, the notion of ω-limit sets of points is classical. ...
summary:We consider discrete dynamical systems whose phase spaces are compact metrizable countable s...
Abstract. A dynamical version of the Bourgain-Fremlin-Talagrand dichotomy shows that the enveloping ...
We consider a discrete non-autonomous semi-dynamical system generated by a family of continuous maps...
Nonautonomous dynamical systems provide a mathematical framework for temporally changing phenomena, ...
The ultimate goal of this thesis is to present how the Stone–Čech Compactification can be used to ca...
We define and study expansiveness, shadowing, and topological stability for a nonautonomous discrete...
AbstractGiven a dynamical system (X,f) with X a compact metric space and a free ultrafilter p on N, ...
The area of dynamical systems where one investigates dynamical properties that can be described in t...
International audienceWe discuss the application of various concepts from the theory of topological ...
International audienceWe discuss the application of various concepts from the theory of topological ...
Our main focus will be to investigate the various facets of what are commonly called dynamical syste...
Abstract. A new class of dynamical systems is defined, the class of “locally equicon-tinuous systems...
This work deals with certain point patterns of an Euclidean space, for which the calculation of the ...
This work deals with certain point patterns of an Euclidean space, for which the calculation of the ...
peer reviewedIn the theory of dynamical systems, the notion of ω-limit sets of points is classical. ...