Amenability, connected components, and definable actions

Abstract

We study amenability of definable and topological groups. Among our main technical tools is an elaboration on and strengthening of the Massicot-Wagner version of the stabilizer theorem, and some results around measures. As an application we show that if G is an amenable topological group, then the Bohr compactification of G coincides with a certain "weak Bohr compactification" introduced in [24]. Formally, G00topo = G000topo. We also prove wide generalizations of this result, implying in particular its extension to a "definable-topological" context, confirming the main conjectures from [24]. We introduce -definable group topologies on a given -definable group G (including group topologies induced by type-definable subgroups as well as uniformly definable group topologies), and prove that the existence of a mean on the lattice of closed, type-definable subsets of G implies (under some assumption) that cl(G00M) = cl(G000M) for any model M. We study the relationship between definability of an action of a definable group on a compact space, weakly almost periodic actions, and stability. We conclude that for any group G definable in a sufficiently saturated structure, every definable action of G on a compact space supports a G-invariant probability measure. This gives negative solutions to some questions and conjectures from [22] and [24]. We give an example of a -definable approximate subgroup X in a saturated extension of the group F2 × Z in a suitable language for which the -definable group H:= X contains no type-definable subgroup of bounded index. This refutes a conjecture by Wagner and shows that the Massicot-Wagner approach to prove that a locally compact "model" exists for each approximate subgroup does not work in general.