Forcing axioms via ground model interpretations
Abstract
We study principles of the form: if a name is forced to have a certain property , then there is a ground model filter such that satisfies . We prove a general correspondence connecting these name principles to forcing axioms. Special cases of the main theorem are: Any forcing axiom can be expressed as a name principle. For instance, is equivalent to a principle for rank names (equivalently, nice names) for subsets of , and a principle for rank names for sets of reals. Moreover, -bounded forcing axioms are equivalent to name principles. Bagaria's characterisation of via generic absoluteness is a corollary. We further systematically study name principles where is a notion of largeness for subsets of (such as being unbounded, stationary or in the club filter) and corresponding forcing axioms.
Keywords
Cite
@article{arxiv.2110.11781,
title = {Forcing axioms via ground model interpretations},
author = {Philipp Schlicht and Christopher Turner},
journal= {arXiv preprint arXiv:2110.11781},
year = {2021}
}