Mixing sequences for non-mixing transformations and group actions

Abstract

We establish that there are non-mixing maps that are mixing on appropriate sequences including sequences (si) which satisfy the Rajchman dissociated property. Our examples are based on the staircase rank one construction, M-towers constructions and the Gaussian transformations. As a consequence, we obtain there are non-mixing maps which are mixing along the squares. We further prove that a sequence M=(mn) is a mixing sequence for some weak mixing 1/2-rigid transformation T if and only if the complement of M is a thick set. This result is generalized to r/(r+1)-rigid transformations for r∈ N. Moreover, by applying Host-Parreau characterization of the set of continuity from Harmonic Analysis, we extend our results to the infinite countable abelian group actions.