English

Topologically Mixing Properties of Multiplicative Integer System

Dynamical Systems 2019-11-25 v1

Abstract

Motivated from the study of multiple ergodic average, the investigation of multiplicative shift spaces has drawn much of interest among researchers. This paper focuses on the relation of topologically mixing properties between multiplicative shift spaces and traditional shift spaces. Suppose that XΩ(l)\mathsf{X}_{\Omega}^{(l)} is the multiplicative subshift derived from the shift space Ω\Omega with given l>1l > 1. We show that XΩ(l)\mathsf{X}_{\Omega}^{(l)} is (topologically) transitive/mixing if and only if Ω\Omega is extensible/mixing. After introducing ll-directional mixing property, we derive the equivalence between ll-directional mixing property of XΩ(l)\mathsf{X}_{\Omega}^{(l)} and weakly mixing property of Ω\Omega.

Keywords

Cite

@article{arxiv.1911.10000,
  title  = {Topologically Mixing Properties of Multiplicative Integer System},
  author = {Jung-Chao Ban and Chih-Hung Chang and Wen-Guei Hu and Guan-Yu Lai and Yu-Liang Wu},
  journal= {arXiv preprint arXiv:1911.10000},
  year   = {2019}
}

Comments

14 pages, 6 figures

R2 v1 2026-06-23T12:24:27.057Z