English

Shrinking Targets for Countable Markov Maps

Dynamical Systems 2011-09-14 v2

Abstract

Let TT be an expanding Markov map with a countable number of inverse branches and a repeller Λ\Lambda contained within the unit interval. Given αR+\alpha \in \R_+ we consider the set of points xΛx \in \Lambda for which Tn(x)T^n(x) hits a shrinking ball of radius enαe^{-n\alpha} around yy for infinitely many iterates nn. Let s(α)s(\alpha) denote the infimal value of ss for which the pressure of the potential slogT-s\log|T'| is below sαs \alpha. Building on previous work of Hill, Velani and Urba\'{n}ski we show that for all points yy contained within the limit set of the associated iterated function system the Hausdorff dimension of the shrinking target set is given by s(α)s(\alpha). Moreover, when Λˉ=[0,1]\bar{\Lambda}=[0,1] the same holds true for all y[0,1]y \in [0,1]. However, given β(0,1)\beta \in (0,1) we provide an example of an expanding Markov map TT with a repeller Λ\Lambda of Hausdorff dimension β\beta with a point yΛˉy\in \bar{\Lambda} such that for all αR+\alpha \in \R_+ the dimension of the shrinking target set is zero.

Keywords

Cite

@article{arxiv.1107.4736,
  title  = {Shrinking Targets for Countable Markov Maps},
  author = {Henry WJ Reeve},
  journal= {arXiv preprint arXiv:1107.4736},
  year   = {2011}
}

Comments

25 pages

R2 v1 2026-06-21T18:41:04.953Z