Inconsistency of Reinhardt cardinals with ZF

Abstract

A proof will be presented that the existence of a non-trivial 1-elementary embedding j: Vλ+3 Vλ+3 is inconsistent with ZF. Sections 1 and 2 shall review various important contributions from the literature, notably including Goldberg2020, Schlutzenberg2020, and Woodin2010, the latter reference being where the crucial forcing construction is presented. Section 3 shall introduce some new large cardinal properties, of consistency strength intermediate between I3 and I2, and greater than I1, respectively. The proof of the inconsistency with ZF of the existence of a non-trivial 1-elementary embedding j:Vλ+3 Vλ+3 shall be given in Section 4. The claims of Sections 2 and 4 are provable in ZF; those of Section 3, with the exception of the last two theorems, in ZFC.