English

Lifting mixing properties by Rokhlin cocycles

Dynamical Systems 2011-02-07 v1

Abstract

We study the problem of lifting various mixing properties from a base automorphism TAut\xbmT\in {\rm Aut}\xbm to skew products of the form \tfs\tfs, where \va:XG\va:X\to G is a cocycle with values in a locally compact Abelian group GG, \cs=(Sg)gG\cs=(S_g)_{g\in G} is a measurable representation of GG in Aut\ycn{\rm Aut}\ycn and \tfs\tfs acts on the product space (X×Y,\cb\ot\cc,μ\otν)(X\times Y,\cb\ot\cc,\mu\ot\nu) by \tfs(x,y)=(Tx,S\va(x)(y)).\tfs(x,y)=(Tx,S_{\va(x)}(y)). It is also shown that whenever TT is ergodic (mildly mixing, mixing) but \tfs\tfs is not ergodic (is not mildly mixing, not mixing), then on a non-trivial factor \ca\cc\ca\subset\cc of \cs\cs the corresponding Rokhlin cocycle xS\va(x)\cax\mapsto S_{\va(x)}|_{\ca} is a coboundary (a quasi-coboundary).

Keywords

Cite

@article{arxiv.1102.0848,
  title  = {Lifting mixing properties by Rokhlin cocycles},
  author = {M. Lemanczyk and F. Parreau},
  journal= {arXiv preprint arXiv:1102.0848},
  year   = {2011}
}
R2 v1 2026-06-21T17:21:29.827Z