More on cardinal invariants of analytic P-ideals

Abstract

Given an ideal I on ω let a(I) (a(I)) be minimum of the cardinalities of infinite (uncountable) maximal I-almost disjoint subsets of [ω]ω, and denote bI anddI the unbounding and dominating numbers of (ωω,I). We show that (1) a(I)>omega if I is a summable ideal; (2) a(Z)=ω and a(Z) a if Z is a tall density ideal, (3) b a(I), and bI=b and dI=d, for any analytic P-ideal I on ω. Given an analytic P-ideal I we investigate the relationship between the Sack, the I-bounding, I-dominating and ωω-bounding properties of a given poset P. For example, for the density zero ideal Z we can prove: (i) a poset P is Z-bounding iff it has the Sacks property, (ii) if P adds a slalom capturing all ground model reals then P is Z-dominating.