English

Potential theory and $\mathbb{Z}^d$-extensions

Dynamical Systems 2021-12-16 v1 Probability

Abstract

We study hitting probabilities for Zd\mathbb{Z}^d-extensions of Gibbs-Markov maps. The goal is to estimate, given a finite ΣZd\Sigma \subset \mathbb{Z}^d and pp, qΣq \in \Sigma, the probability PpqP_{pq} that the process starting from pp returns to Σ\Sigma at site qq. Our study generalizes the methods available for random walks. We are able to give in many settings (square integrable jumps, jumps in the basin of a L\'evy or Cauchy random variable) asymptotics for the transition matrix (Ppq)p,qΣ(P_{pq})_{p, q \in \Sigma} when the elements of Σ\Sigma are far apart. We use three main tools: a variant of the balayage identity using a transfer operator as a Markov transition kernel, a study inspired from fast-slow systems and the hitting time of small sets in hyperbolic systems to relate transfer operators and the transition matrices we seek to compute, and finally Fourier transform and perturbations of transfer operators \textit{\`a la} Nagaev-Guivarc'h to effectively compute these transition matrices in an asymptotic regime.

Keywords

Cite

@article{arxiv.2112.08339,
  title  = {Potential theory and $\mathbb{Z}^d$-extensions},
  author = {Damien Thomine},
  journal= {arXiv preprint arXiv:2112.08339},
  year   = {2021}
}

Comments

83 pages, 7 figures

R2 v1 2026-06-24T08:18:59.806Z