English

Modified shrinking target problem for Matrix Transformations of Tori

Dynamical Systems 2024-01-23 v3

Abstract

We calculate the Hausdorff dimension of the fractal set \begin{equation*} \Big\{\mathtt{x}\in \mathbb{T}^d: \prod_{1\leq i\leq d}|T_{\beta_i}^n(x_i)-x_i| < \psi(n) \text{ for infinitely many } n\in \mathbb{N}\Big\}, \end{equation*} where the TβiT_{\beta_i} is the standard βi\beta_i-transformation with βi>1\beta_i>1, ψ\psi is a positive function on N\mathbb{N} and |\cdot| is the usual metric on the torus T\mathbb{T}. Moreover, we investigate a modified version of the shrinking target problem, which unifies the shrinking target problems and quantitative recurrence properties for matrix transformations of tori. Let TT be a d×dd\times d non-singular matrix with real coefficients. Then, TT determines a self-map of the dd-dimensional torus Td:=Rd/Zd\mathbb{T}^d:=\mathbb{R}^d / \mathbb{Z}^d. For any 1id1\leq i \leq d, let ψi\psi_i be a positive function on N\mathbb{N} and Ψ(n):=(ψ1(n),,ψd(n))\Psi(n):=(\psi_1(n),\dots, \psi_d(n)) with nNn\in \mathbb{N}. We obtain the Hausdorff dimension of the fractal set \begin{equation*} \big\{\mathtt{x}\in \mathbb{T}^d: T^n(x)\in L(f_n(\mathtt{x}), \Psi(n)) \text{ for infinitely many } n\in \mathbb{N}\big\}, \end{equation*} where L(fn(x,Ψ(n)))L(f_n(\mathtt{x}, \Psi(n))) is a hyperrectangle and {fn}n1\{f_n\}_{n\geq 1} is a sequence of Lipschitz vector-valued functions on Td\mathbb{T}^d with a uniform Lipschitz constant.

Keywords

Cite

@article{arxiv.2304.07532,
  title  = {Modified shrinking target problem for Matrix Transformations of Tori},
  author = {Na Yuan and ShuaiLing Wang},
  journal= {arXiv preprint arXiv:2304.07532},
  year   = {2024}
}
R2 v1 2026-06-28T10:06:55.428Z