Largest initial segments pointwise fixed by automorphisms of models of set theory

Abstract

Given a model M of set theory, and a nontrivial automorphism j of M, let Ifix(j) be the submodel of M whose universe consists of elements m of M such that j(x)=x for every x in the transitive closure of m (where the transitive closure of m is computed within M). Here we study the class C of structures of the form Ifix(j), where the ambient model M satisfies a frugal yet robust fragment of ZFC known as MOST, and j(m)=m whenever m is a finite ordinal in the sense of M. We show that every structure in C satisfies MOST+0P-Collection. We also show that the following countable structures are in C: (a) transitive models of MOST+0P-Collection, (b) recursively saturated models of MOST+0P-Collection, (c) models of ZFC. It follows from (b) that the theory of C is precisely MOST+0P-Collection. We conclude by proving a refinement of a result due to Amir Togha.