We study dynamical systems using measures taking values in a non-Archimedean field. The underlying space for such measure is a zero-dimensional topological space. In this paper we elaborate on the natural translation of several notions, e.g., probability measures, isomorphic transformations, entropy, from classical dynamical systems to a non-Archimedean setting
AbstractThe aim of this article is to formalize definition of chaos (in terms of topological entropy...
We construct a natural invariant measure concentrated on the set of square-free numbers, and invaria...
. By a result of F. Hofbauer [11], piecewise monotonic maps of the interval can be identified with ...
We introduce the notion of metric entropy for a nonautonomous dynamical system given by a sequence o...
Includes bibliographical references (pages [379]-385) and index.xii, 391 pages ;"This comprehensive ...
In this thesis, many classical results of topological dynamics are adapted to the set-valued case. ...
This is the author accepted manuscriptAlthough chaotic attractors for autonomous dynamical systems s...
International audienceWe make the first steps towards an understanding of the ergodic properties of ...
The theory of complex dynamics in one variable, initiated by Fatou and Julia in the early twentieth ...
Abstract: The key idea here is borrowed from dimension theory. The starting point is a new concept w...
In this thesis we study topological entropy as an invariant of topological dynamical systems. The fi...
Classical dynamical systems involves the study of the long-time behavior of a fixed map or vector fi...
This thesis concerns itself with some aspects of topological dynamics. We approach the subject using...
Il y a de nombreuses manières d’aborder l’étude des systèmes dynamiques. De manière générale, on mun...
Abstract. We construct a continuous dynamical system on a compact connected metric space which has a...
AbstractThe aim of this article is to formalize definition of chaos (in terms of topological entropy...
We construct a natural invariant measure concentrated on the set of square-free numbers, and invaria...
. By a result of F. Hofbauer [11], piecewise monotonic maps of the interval can be identified with ...
We introduce the notion of metric entropy for a nonautonomous dynamical system given by a sequence o...
Includes bibliographical references (pages [379]-385) and index.xii, 391 pages ;"This comprehensive ...
In this thesis, many classical results of topological dynamics are adapted to the set-valued case. ...
This is the author accepted manuscriptAlthough chaotic attractors for autonomous dynamical systems s...
International audienceWe make the first steps towards an understanding of the ergodic properties of ...
The theory of complex dynamics in one variable, initiated by Fatou and Julia in the early twentieth ...
Abstract: The key idea here is borrowed from dimension theory. The starting point is a new concept w...
In this thesis we study topological entropy as an invariant of topological dynamical systems. The fi...
Classical dynamical systems involves the study of the long-time behavior of a fixed map or vector fi...
This thesis concerns itself with some aspects of topological dynamics. We approach the subject using...
Il y a de nombreuses manières d’aborder l’étude des systèmes dynamiques. De manière générale, on mun...
Abstract. We construct a continuous dynamical system on a compact connected metric space which has a...
AbstractThe aim of this article is to formalize definition of chaos (in terms of topological entropy...
We construct a natural invariant measure concentrated on the set of square-free numbers, and invaria...
. By a result of F. Hofbauer [11], piecewise monotonic maps of the interval can be identified with ...
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