English

Bounded complexity, mean equicontinuity and discrete spectrum

Dynamical Systems 2020-11-25 v3

Abstract

We study dynamical systems which have bounded complexity with respect to three kinds metrics: the Bowen metric dnd_n, the max-mean metric d^n\hat{d}_n and the mean metric dˉn\bar{d}_n, both in topological dynamics and ergodic theory. It is shown that a topological dynamical system (X,T)(X,T) has bounded complexity with respect to dnd_n (resp. d^n\hat{d}_n) if and only if it is equicontinuous (resp. equicontinuous in the mean). However, we construct minimal systems which have bounded complexity with respect to dˉn\bar{d}_n but not equicontinuous in the mean. It turns out that an invariant measure μ\mu on (X,T)(X,T) has bounded complexity with respect to dnd_n if and only if (X,T)(X,T) is μ\mu-equicontinuous. Meanwhile, it is shown that μ\mu has bounded complexity with respect to d^n\hat{d}_n if and only if μ\mu has bounded complexity with respect to dˉn\bar{d}_n if and only if (X,T)(X,T) is μ\mu-mean equicontinuous if and only if it has discrete spectrum.

Keywords

Cite

@article{arxiv.1806.02980,
  title  = {Bounded complexity, mean equicontinuity and discrete spectrum},
  author = {Wen Huang and Jian Li and Jean-Paul Thouvenot and Leiye Xu and Xiangdong Ye},
  journal= {arXiv preprint arXiv:1806.02980},
  year   = {2020}
}

Comments

38 pages. Adding Appendix B (An Example by Cyr and Kra) and some references. To appear in Ergodic Theory Dynam. Systems

R2 v1 2026-06-23T02:23:13.253Z