Yet another ideal version of the bounding number

Abstract

Let I be an ideal on ω. For f,g∈ωω we write f ≤I g if f(n) ≤ g(n) for all n∈ω A with some A∈I. Moreover, we denote DI=\f∈ωω: f-1[\n\]∈I for every n∈ ω\ (in particular, DFin denotes the family of all finite-to-one functions). We examine cardinal numbers b(≥I (DI × DI)) and b(≥I (DFin× DFin)) describing the smallest sizes of unbounded from below with respect to the order ≤I sets in DFin and DI, respectively. For a maximal ideal I, these cardinals were investigated by M. Canjar in connection with coinitial and cofinal subsets of the ultrapowers. We show that b(≥I (DFin × DFin)) =b for all ideals I with the Baire property and that 1 ≤ b(≥I (DI × DI)) ≤b for all coanalytic weak P-ideals (this class contains all 04 ideals). What is more, we give examples of Borel (even 02) ideals I with b(≥I (DI × DI))=b as well as with b(≥I (DI × DI)) =1.