Very large set axioms over constructive set theories

Abstract

We investigate large set axioms defined in terms of elementary embeddings over constructive set theories, focusing on IKP and CZF. Most previously studied large set axioms, notably the constructive analogues of large cardinals below 0, have proof-theoretic strength weaker than full Second-order Arithmetic. On the other hand, the situation is dramatically different for those defined via elementary embeddings. We show that by adding to IKP the basic properties of an elementary embedding j V M for 0-formulas, which we will denote by 0-BTEEM, we obtain the consistency of ZFC and more. We will also see that the consistency strength of a Reinhardt set exceeds that of ZF+WA. Furthermore, we will define super Reinhardt sets and TR, which is a constructive analogue of V being totally Reinhardt, and prove that their proof-theoretic strength exceeds that of ZF with choiceless large cardinals.