Frechet Borel Ideals with Borel orthogonal

Abstract

We study Borel ideals I on N with the Fr\'echet property such its orthogonal I is also Borel (where A∈ I iff A B is finite for all B∈ I and I is Fr\'echet if I=I). Let B be the smallest collection of ideals on N containing the ideal of finite sets and closed under countable direct sums and orthogonal. All ideals in B are Fr\'echet, Borel and have Borel orthogonal. We show that B has exactly 1 non isomorphic members. The family B can be characterized as the collection of all Borel ideals which are isomorphic to an ideal of the form Iwf A, where Iwf is the ideal on N<ω generated by the wellfounded trees. Also, we show that A⊂eq Q is scattered iff WO(Q) A is isomorphic to an ideal in B, where WO(Q) is the ideal of well founded subset of Q.