Weak mixing for nonsingular Bernoulli actions of countable amenable groups

Abstract

Let G be an amenable discrete countable infinite group, A a finite set, and (μg)g∈ G a family of probability measures on A such that ∈fg∈ Ga∈ Aμg(a)>0. It is shown (among other results) that if the Bernoulli shiftwise action of G on the infinite product space g∈ G(A,μg) is nonsingular and conservative then it is weakly mixing. This answers in positive a question by Z.~Kosloff who proved recently that the conservative Bernoulli Zd-actions are ergodic. As a byproduct, we prove a weak version of the pointwise ratio ergodic theorem for nonsingular actions of G.