The inclusion relations of the countable models of set theory are all isomorphic

Abstract

The structures M,⊂eqM arising as the inclusion relation of a countable model of sufficient set theory M,∈M, whether well-founded or not, are all isomorphic. These structures M,⊂eqM are exactly the countable saturated models of the theory of set-theoretic mereology: an unbounded atomic relatively complemented distributive lattice. A very weak set theory suffices, even finite set theory, provided that one excludes the ω-standard models with no infinite sets and the ω-standard models of set theory with an amorphous set. Analogous results hold also for class theories such as G\"odel-Bernays set theory and Kelley-Morse set theory.