Reflection in second-order set theory with abundant urelements bi-interprets a supercompact cardinal

Abstract

After reviewing various natural bi-interpretations in urelement set theory, including second-order set theories with urelements, we explore the strength of second-order reflection in these contexts. Ultimately, we prove, second-order reflection with the abundant atom axiom is bi-interpretable and hence also equiconsistent with the existence of a supercompact cardinal. The proof relies on a reflection characterization of supercompactness, namely, a cardinal is supercompact if and only if every 11 sentence true in a structure M (of any size) containing in a language of size less than is also true in a substructure m M of size less than with m∈.