Rank-one nonsingular actions of countable groups and their odometer factors

Abstract

For an arbitrary countable discrete infinite group G, nonsingular rank-one actions are introduced. It is shown that the class of nonsingular rank-one actions coincides with the class of nonsingular (C,F)-actions. Given a decreasing sequence 1⊃neq2⊃neq·s of cofinite subgroups in G with n=1∞g∈ Ggng-1=\1G\, the projective limit of the homogeneous G-spaces G/n as n∞ is a G-space. Endowing this G-space with an ergodic nonsingular nonatomic measure we obtain a dynamical system which is called a nonsingular odometer. Necessary and sufficient conditions are found for a rank-one nonsingular G-action to have a finite factor and a nonsingular odometer factor in terms of the underlying (C,F)-parameters. Similar conditions are also found for a rank-one nonsingular G-action to be isomorphic to an odometer. Minimal Radon uniquely ergodic locally compact Cantor models are constructed for the nonsingular rank-one extensions of odometers. Several concrete examples are constructed and several facts are proved that illustrate a sharp difference of the nonsingular noncommutative case from the classical finite measure preserving one: odometer actions which are not of rank one, factors of rank-one systems which are not of rank-one, however each probability preserving odometer is a factor of an infinite measure preserving rank-one system, etc.