On minimal flows of commutative p-adic groups

Abstract

We study the definable topological dynamics (G,SG(M)) of a definable group acting on its type space, where M is a structure and G is a group definable in M. In Newelski-I, Newelski raised a question of whether weakly generic types coincide with almost periodic types in definable topological dynamics. In YZ-Sta, we introduced the notion of stationarity, showing the answer is positive when G is a stationary definably amenable group definable over the field of p-adic numbers or an o-minimal expansion of real closed field. In this paper, we continue with the work of YZ-Sta, focusing on the case where G is a commutative group definable over the field of p-adic numbers, and showing that weakly generic types coincide with almost periodic types if and only if either G has definable f-generics or G is stationary.