English

A note on weak Banach mean equicoontinuity

Dynamical Systems 2024-01-19 v1

Abstract

Consider a topological dynamical system (X,T)(X, T) endowed with the metric dd. We introduce a novel function as BF(x,y)=lim supnm+infσSn,m1nmk=mn1d(Tkx,Tσ(k)y)\overline{BF}(x, y) = \limsup_{n-m \rightarrow +\infty} \inf_{\sigma \in S_{n,m}} \frac{1}{n-m} \sum_{k=m}^{n-1} d\left(T^{k} x, T^{\sigma(k)} y\right), where the permutation group Sn,mS_{n,m} is utilized. It is demonstrated that BF(x,y)BF(x, y) exists when x,yXx, y \in X are uniformly generic points. Leveraging this function, we introduce the concept of weak Banach mean equicontinuity and establish that the dynamical system (X,T)(X, T) exhibits weak Banach mean equicontinuity if and only if the uniform time averages fB(x)=limnm+1nmk=mn1f(Tkx)f_B^{*}(x) = \lim_{n-m \rightarrow +\infty} \frac{1}{n-m} \sum_{k=m}^{n-1} f\left(T^{k} x\right) are continuous for all fC(X)f \in C(X). Finally, we demonstrate that in the case of a transitive system, the equivalence between weak Banach mean equicontinuity and weak mean equicontinuity is established.

Keywords

Cite

@article{arxiv.2401.09744,
  title  = {A note on weak Banach mean equicoontinuity},
  author = {Zhongxuan Yang and Xiaojun Huang},
  journal= {arXiv preprint arXiv:2401.09744},
  year   = {2024}
}
R2 v1 2026-06-28T14:20:03.267Z