Prevalence of Generic Laver Diamond

Abstract

Viale VialeGuessingModel introduced the notion of Generic Laver Diamond at ---which we denote Lav()---asserting the existence of a single function from H that behaves much like a supercompact Laver function, except with generic elementary embeddings rather than internal embeddings. Viale proved that the Proper Forcing Axiom (PFA) implies Lav(ω2). We strengthen his theorem by weakening the hypothesis to a statement strictly weaker than PFA. We also show that the principle Lav() provides a uniform, simple construction of 2-cardinal diamonds, and prove that Lav() is quite prevalent in models of set theory; in particular: 1) L satisfies Lav+() whenever is a successor cardinal, or when the appropriate version of Chang's Conjecture fails. 2) For any successor cardinal , there is a -directed closed class forcing---namely, the forcing from Friedman-Holy MR2860182---that forces Lav().