Lifting mixing properties by Rokhlin cocycles

Abstract

We study the problem of lifting various mixing properties from a base automorphism T∈ Aut to skew products of the form , where :X G is a cocycle with values in a locally compact Abelian group G, =(Sg)g∈ G is a measurable representation of G in Aut and acts on the product space (X× Y,,μ) by (x,y)=(Tx,S(x)(y)). It is also shown that whenever T is ergodic (mildly mixing, mixing) but is not ergodic (is not mildly mixing, not mixing), then on a non-trivial factor ⊂ of the corresponding Rokhlin cocycle x S(x)| is a coboundary (a quasi-coboundary).