English

Tight Eventually Different Families

Logic 2024-05-22 v5

Abstract

Generalizing the notion of a tight almost disjoint family, we introduce the notions of a {\em tight eventually different} family of functions in Baire space and a {\em tight eventually different set of permutations} of ω\omega. Such sets strengthen maximality, exist under MA(σlinked)\mathsf{MA} (\sigma {\rm -linked}) and come with a properness preservation theorem. The notion of tightness also generalizes earlier work on the forcing indestructibility of maximality of families of functions. As a result we compute the cardinals ae\mathfrak{a}_e and ap\mathfrak{a}_p in many known models by giving explicit witnesses and therefore obtain the consistency of several constellations of cardinal characteristics of the continuum including ae=ap=d<aT\mathfrak{a}_e = \mathfrak{a}_p = \mathfrak{d} < \mathfrak{a}_T, ae=ap<d=aT\mathfrak{a}_e = \mathfrak{a}_p < \mathfrak{d} = \mathfrak{a}_T, ae=ap=u<non(N)=cof(N)\mathfrak{a}_e = \mathfrak{a}_p = \mathfrak{u} < non(\mathcal N) = cof(\mathcal N) and ae=ap=i<u\mathfrak{a}_e = \mathfrak{a}_p =\mathfrak{i} < \mathfrak{u}. We also show that there are Π11\Pi^1_1 tight eventually different families and tight eventually different sets of permutations in LL thus obtaining the above inequalities alongside Π11\Pi^1_1 witnesses for ae=ap=1\mathfrak{a}_e = \mathfrak{a}_p = \aleph_1. Moreover, we prove that tight eventually different families are Cohen indestructible and are never analytic.

Keywords

Cite

@article{arxiv.2104.11291,
  title  = {Tight Eventually Different Families},
  author = {Vera Fischer and Corey Bacal Switzer},
  journal= {arXiv preprint arXiv:2104.11291},
  year   = {2024}
}

Comments

25 pages, submitted. Fifth draft includes numerous updates suggested by an anonymous referee. In particular the proof of Theorem 9.6 has been rewritten to clarify some ambiguities in the previous draft

R2 v1 2026-06-24T01:26:42.386Z