Oligomorphic groups, their automorphism groups, and the complexity of their isomorphism

Abstract

The paper establishes results following two interconnected directions. 1. Let G be a Roelcke precompact closed subgroup of the group Sym(ω) of permutations of the natural numbers. Let Aut(G) denote the group of continuous automorphisms of G. Then Inn(G) is closed in Aut(G), where Aut(G) carries the topology of pointwise convergence for its (faithful) action on the cosets of open subgroups. Under the stronger hypothesis that~G is oligomorphic, \+ NG/G is profinite, where \+ NG denotes the normaliser of~G in Sym(ω), and the topological group Out(G)= Aut(G)/Inn(G) is totally disconnected, locally compact. 2a. We provide a general method to show smoothness of the isomorphism relation for appropriate Borel classes of oligomorphic groups. We apply it to two such classes: the oligomorphic groups with no algebraicity, and the oligomorphic groups with finitely many essential subgroups up to conjugacy. 2b. Using this method we also show that if G is in such a Borel class, then Aut(G) is topologically isomorphic to an oligomorphic group, and Out(G) is profinite.