Newelski's Conjecture for o-Minimal and p-Adic Groups

Abstract

Let M0 denote either the field structure Qp of p -adic numbers, or an o-minimal expansion of the field structure R of real numbers. We investigate the minimal flows and Ellis groups of definable groups over M0 from the perspective of definable topological dynamics. This paper builds on the research initiated in BY-APAL and generalizes the main results thereof in two key ways: First, we extend the scope of these results from reductive algebraic groups to arbitrary definable groups. Second, we generalize the approach from p -adically closed fields to o-minimal expansions of real closed fields. Let G be a definable group over M0, and let B be a definably amenable component (see Definition def-DAC) of G. In a certain sense, B can be regarded as a ``maximal definably amenable subgroup'' of G (see Fact fact-max-DA-subgroup). The main conclusion of this paper is as follows: For any M M0, the Ellis group of the universal definable flow of G over M is isomorphic to that of B over M. In particular, the Ellis groups of the universal definable flow of G are model-independent, as is the case for B (see CS-Definably-Amenable-NIP-Groups). As a consequence, we conclude that Newelski's Conjecture holds if and only if G is definably amenable when M0 = Qp.