Strong meager properties for filters
Volume 146 / 1995
Fundamenta Mathematicae 146 (1995), 283-293
DOI: 10.4064/fm-146-3-283-293
Abstract
We analyze several "strong meager" properties for filters on the natural numbers between the classical Baire property and a filter being $F_σ$. Two such properties have been studied by Talagrand and a few more combinatorial ones are investigated. In particular, we define the notion of a P⁺-filter, a generalization of the traditional concept of P-filter, and prove the existence of a non-meager P⁺-filter. Our motivation lies in understanding the structure of filters generated by complements of members of a maximal almost disjoint family.