The independence of GCH and a combinatorial principle related to Banach-Mazur games

Abstract

It was proved recently that Telg\'arsky's conjecture, which concerns partial information strategies in the Banach-Mazur game, fails in models of GCH+. The proof introduces a combinatorial principle that is shown to follow from GCH+, namely: : Every separative poset P with the -cc contains a dense sub-poset D such that |\ q ∈ D \,:\, p extends q \| < for every p ∈ P. We prove this principle is independent of GCH and CH, in the sense that does not imply CH, and GCH does not imply assuming the consistency of a huge cardinal. We also consider the more specific question of whether holds with P equal to the weight-ω measure algebra. We prove, again assuming the consistency of a huge cardinal, that the answer to this question is independent of ZFC+GCH.