An unusual example of a universal automorphism group

Abstract

Let M be a Fra\"iss\'e structure (a countably infinite ultrahomogeneous structure). We refer to the class of structures embeddable in M as the ω-age of M. We consider the following two properties of M: we say that M has a universal automorphism group if, for each A in the ω-age of M, there is an embedding Aut(A) Aut(M), and we say that M has group-extensible ω-age if, for each A in the ω-age of M, there is an embedding A M such that each automorphism of the image extends to an automorphism of M and the extension map preserves group composition. It is immediate that if M has group-extensible ω-age, then M has a universal automorphism group. We give an example of a Fra\"iss\'e structure with a universal automorphism group whose ω-age is not group-extensible, showing that the above two properties are not equivalent.