Ergodicity criteria for non-expanding transformations of 2-adic spheres

Abstract

In the paper, we obtain necessary and sufficient conditions for ergodicity (with respect to the normalized Haar measure) of discrete dynamical systems <f; S2-r(a)> on 2-adic spheres S2-r(a) of radius 2-r, r 1, centered at some point a from the ultrametric space of 2-adic integers Z2. The map f Z2 Z2 is assumed to be non-expanding and measure-preserving; that is, f satisfies a Lipschitz condition with a constant 1 with respect to the 2-adic metric, and f preserves a natural probability measure on Z2, the Haar measure μ2 on Z2 which is normalized so that μ2( Z2)=1.