English

\'Etale dynamical systems and topological entropy

Dynamical Systems 2018-01-24 v3 Algebraic Geometry General Topology

Abstract

In this paper, we consider two questions about topological entropy of dynamical systems. We propose to resolve these questions by the same approach of using \'etale analogs of topological and algebraic dynamical systems. The first question is to define topological entropy for a topological dynamical system (f,X,Ω)(f,X,\Omega ). The main idea is to make use - in addition to invariant compact subspaces of (X,Ω)(X,\Omega ) - of compactifications of \'etale covers π:(f,X,Ω)(f,X,Ω)\pi :(f',X',\Omega ')\rightarrow (f,X,\Omega ), that is πf=fπ\pi \circ f'=f\circ \pi and the fibers of π\pi are all finite. We prove some basic results and propose a conjecture, whose validity allows us to prove further results. The second question is to define topological entropy for algebraic dynamical systems, with the requirement that it should be as close to the pullback on cohomology groups as possible. To this end, we develop an \'etale analog of algebraic dynamical systems.

Keywords

Cite

@article{arxiv.1607.07412,
  title  = {\'Etale dynamical systems and topological entropy},
  author = {Tuyen Trung Truong},
  journal= {arXiv preprint arXiv:1607.07412},
  year   = {2018}
}

Comments

13 pages. Title changed, exposition and structure of the paper improved. The topological case: The infimum is now taken on all etale covers p :(f',X',\Omega ') ->(f,X,\Omega ), that is when p has finite fibres. This unifies the treatments of both topological and algebraic cases. A conjecture is proposed. The algebraic case: The case when K has positive characteristic is described in more details

R2 v1 2026-06-22T15:03:49.810Z