Generic Vopenka cardinals and models of ZF with few 1-Suslin sets

Abstract

We define a generic Vopenka cardinal to be an inaccessible cardinal such that for every first-order language L of cardinality less than and every set B of L-structures, if |B| = and every structure in B has cardinality less than , then an elementary embedding between two structures in B exists in some generic extension of V. We investigate connections between generic Vopenka cardinals in models of ZFC and the number and complexity of 1-Suslin sets of reals in models of ZF. In particular, we show that ZFC + (there is a generic Vopenka cardinal) is equiconsistent with ZF + (21 ≤ |S_1|) where S_1 is the pointclass of all 1-Suslin sets of reals, and also with ZF + (S_1 = 12) + ( = 2) where is the least ordinal that is not a surjective image of the reals.