Reconstructing Structures with the Strong Small Index Property up to Bi-Definability

Abstract

Let K be the class of countable structures M with the strong small index property and locally finite algebraicity, and K* the class of M ∈ K such that aclM(\ a \) = \ a \ for every a ∈ M. For homogeneous M ∈ K, we introduce what we call the expanded group of automorphisms of M, and show that it is second-order definable in Aut(M). We use this to prove that for M, N ∈ K*, Aut(M) and Aut(N) are isomorphic as abstract groups if and only if (Aut(M), M) and (Aut(N), N) are isomorphic as permutation groups. In particular, we deduce that for 0-categorical structures the combination of strong small index property and no algebraicity implies reconstruction up to bi-definability, in analogy with Rubin's well-known ∀ ∃-interpretation technique of [7]. Finally, we show that every finite group can be realized as the outer automorphism group of Aut(M) for some countable 0-categorical homogeneous structure M with the strong small index property and no algebraicity.