On Infinite Transformations with Maximal Control of Ergodic Two-fold Product Powers

Abstract

We study the rich behavior of ergodicity and conservativity of Cartesian products of infinite measure preserving transformations. A class of transformations is constructed such that for any subset R⊂ Q (0,1) there exists T in this class such that Tp× Tq is ergodic if and only if pq ∈ R. This contrasts with the finite measure preserving case where Tp× Tq is ergodic for all nonzero p and q if and only if T× T is ergodic. We also show that our class is rich in the behavior of conservative products. For each positive integer k, a family of rank-one infinite measure preserving transformations is constructed which have ergodic index k, but infinite conservative index.