English

Amenability, definable groups, and automorphism groups

Logic 2019-01-11 v2 Dynamical Systems General Topology

Abstract

We prove several theorems relating amenability of groups in various categories (discrete, definable, topological, automorphism group) to model-theoretic invariants (quotients by connected components, Lascar Galois group, G-compactness, ...). For example, if MM is a countable, ω\omega-categorical structure and Aut(M)Aut(M) is amenable, as a topological group, then the Lascar Galois group GalL(T)Gal_{L}(T) of the theory TT of MM is compact, Hausdorff (also over any finite set of parameters), that is TT is G-compact. An essentially special case is that if Aut(M)Aut(M) is extremely amenable, then GalL(T)Gal_{L}(T) is trivial, so, by a theorem of Lascar, the theory TT can be recovered from its category Mod(T)Mod(T) of models. On the side of definable groups, we prove for example that if GG is definable in a model MM, and GG is definably amenable, then the connected components GM00{G^{*}}^{00}_{M} and GM000{G^{*}}^{000}_{M} coincide, answering positively a question from an earlier paper of the authors. We also take the opportunity to further develop the model-theoretic approach to topological dynamics, obtaining for example some new invariants for topological groups, as well as allowing a uniform approach to the theorems above and the various categories.

Keywords

Cite

@article{arxiv.1612.07560,
  title  = {Amenability, definable groups, and automorphism groups},
  author = {Krzysztof Krupinski and Anand Pillay},
  journal= {arXiv preprint arXiv:1612.07560},
  year   = {2019}
}
R2 v1 2026-06-22T17:32:14.185Z