The proper forcing axiom for 1-sized posets, ω1-linked symmetrically proper forcing, and the size of the continuum

Abstract

We show that the Proper Forcing Axiom for forcing notions of size 1 is consistent with the continuum being arbitrarily large. In fact, assuming GCH holds and ≥ω2 is a regular cardinal, we prove that there is a proper and 2-c.c.\ forcing giving rise to a model of this forcing axiom together with 20= and which, in addition, satisfies all statements of the form H(2) ∃ y(a, y), where a∈ H(2) and (x, y) is a 0 formula with the property that for every ground model M of CH with a∈ M there is, in M, a suitably nice poset -- specifically, a poset Q⊂eqH()M which is ω1-linked and symmetrically proper -- adding some b such that (a, b). In particular, P forces Moore's Measuring principle, Baumgartner's Axiom for 1-dense sets of reals, Todorcevi\'c's Open Colouring Axiom for sets of size 1, the Abraham-Rubin-Shelah Open Colouring Axiom, and Todorcevi\'c's P-ideal Dichotomy for 1-generated ideals on ω1, among other statements. Hence, all these statements are simultaneously compatible with a large continuum. Finally, we show that a further small variation of our construction yields a model satisfying, in addition to all the earlier conclusions, Martin's Maximum for posets of size 1.