English

Namba forcing, weak approximation, and guessing

Logic 2019-02-20 v3

Abstract

We prove a variation of Easton's lemma for strongly proper forcings, and use it to prove that, unlike the stronger principle IGMP\textsf{IGMP}, GMP\textsf{GMP} together with 2ωω22^\omega \le \omega_2 is consistent with the existence of an ω1\omega_1-distributive nowhere c.c.c. forcing poset of size ω1\omega_1. We introduce the idea of a weakly guessing model, and prove that many of the strong consequences of the principle GMP\textsf{GMP} follow from the existence of stationarily many weakly guessing models. Using Namba forcing, we construct a model in which there are stationarily many indestructibly weakly guessing models which have a bounded countable subset not covered by any countable set in the model.

Keywords

Cite

@article{arxiv.1610.00319,
  title  = {Namba forcing, weak approximation, and guessing},
  author = {Sean Cox and John Krueger},
  journal= {arXiv preprint arXiv:1610.00319},
  year   = {2019}
}
R2 v1 2026-06-22T16:08:08.206Z