English

Weakly tame systems, their characterizations and application

Dynamical Systems 2021-09-29 v3 Number Theory

Abstract

We explore the notion of discrete spectrum and its various characterizations for ergodic measure-preserving actions of an amenable group on a compact metric space. We introduce a notion of 'weak-tameness', which is a measure-theoretic version of a notion of `tameness' introduced by E. Glasner, based on the work of A. K\"ohler [A. K\"ohler introduced this notion and call such systems "regular".], and characterize such topological dynamical systems as systems for which every invariant measure has a discrete spectrum. Using the work of M. Talagrand, we also characterize weakly tame as well as tame systems in terms of the notion of 'witness of irregularity' which is based on up-crossings. Then we establish that strong Veech systems are tame. In particular, for any amenable group TT, the flow on the orbit closure of the translates of a `Veech function' fK(T)f\in \mathbb{K}(T) is tame. Thus Sarnak's M\"obius orthogonality conjecture holds for this flow and as a consequence, we obtain an improvement of Motohashi-Ramachandra 1976's theorem on the Mertens function in short intervals. We further improve Motohashi-Ramachandra's bound to 1/21/2 under Chowla conjecture.

Keywords

Cite

@article{arxiv.2001.05947,
  title  = {Weakly tame systems, their characterizations and application},
  author = {e. H. el Abdalaoui and M. Nerurkar},
  journal= {arXiv preprint arXiv:2001.05947},
  year   = {2021}
}

Comments

43 pages with 58 references. The paper is reorganized and sections 4 and 6 are augmented. We further add an appendix in which an estimation of the average of Chowla of order 2 is obtained with the help of Davenport's estimation and an observation due to J. Bourgain

R2 v1 2026-06-23T13:13:14.580Z