On Recurrence Axioms

Abstract

The Recurrence Axiom for a class P of \ and a set A of parameters is an axiom scheme in the language of ZFC asserting that if a statement with parameters from A is forced by a poset in P, then there is a ground containing the parameters and satisfying the statement. The tightly super-C(∞)-P-Laver generic hyperhuge continuum implies the Recurrence Axiom for P and H(20). The consistency strength of this assumption can be decided thanks to our main theorems asserting that the minimal ground (bedrock) exists under a tightly P-generic hyperhuge cardinal , and that in the bedrock is genuinely hyperhuge, or even super C(∞) hyperhuge if is a tightly super-C(∞)-P-Laver generic hyperhuge definable cardinal. The Laver Generic Maximum (LGM), one of the strongest combinations of axioms in our context, integrates practically all known set-theoretic principles and axioms in itself, either as its consequences or as theorems holding in (many) grounds of the universe. For example, double plus version of Martin's Maximum is a consequence of LGM while Cicho\'n's Maximum is a phenomenon in many grounds of the universe under LGM.