Weakly 2-randoms and 1-generics in Scott sets

Abstract

Let S be a Scott set, or even an ω-model of WWKL. Then for each A∈ S, either there is X ∈ S that is weakly 2-random relative to A, or there is X∈ S that is 1-generic relative to A. It follows that if A1,…, An ∈ S are non-computable, there is X ∈ S such that each Ai is Turing incomparable with X, answering a question of Kucera and Slaman. More generally, any ∀∃ sentence in the language of partial orders that holds in D also holds in DS, where DS is the partial order of Turing degrees of elements of S.