On the structure of Borel ideals in-between the ideals ED and Fin in the Katetov order

Abstract

For a family F⊂eq ωω we define the ideal I(F) on ω×ω to be the ideal generated by the family \A⊂eq ω×ω:∃ f∈ F\,∀∞ n\, (|\k:(n,k)∈ A\|≤ f(n))\. Using ideals of the form I(F), we show that the structure of Borel ideals in-between two well known Borel ideals ED = \A⊂eqω×ω:∃ m \, ∀∞ n\, (|\k:(n,k)∈ A\|<m))\ and Fin = \A⊂eqω×ω:∀∞ n \, (|\k:(n,k)∈ A\|<0))\ in the Katetov order is fairly complicated. Namely, there is a copy of P(ω)/Fin in-between ED and Fin, and consequently there are increasing and decreasing chains of length b and antichains of size c.