Filters and Ideal Independence

Abstract

A family I ⊂eq [ω]ω such that for all finite \Xi\i∈ n⊂eq I and A ∈ I \Xi\i∈ n, the set A i < n Xi is infinite, is said to be ideal independent. An ideal independent family which is maximal under inclusion is said to be a maximal ideal independent family and the least cardinality of such family is denoted smm. We show that u≤smm, which in particular establishes the independence of smm and i. Given an arbitrary set C of uncountable cardinals, we show how to simultaneously adjoin via forcing maximal ideal independent families of cardinality λ for each λ∈ C, thus establishing the consistency of C⊂eq spec(smm). Assuming CH, we construct a maximal ideal independent family, which remains maximal after forcing with any proper, ωω-bounding, p-point preserving forcing notion and evaluate smm in several well studied forcing extensions.