A Lopez-Escobar Theorem for Continuous Domains

Abstract

We prove an effective version of the Lopez-Escobar theorem for continuous domains. Let Mod(τ) be the set of countable structures with universe ω in vocabulary τ topologized by the Scott topology. We show that an invariant set X ⊂eq Mod(τ) is 0α in the effective Borel hierarchy of this topology if and only if it is definable by a pα - formula, a positive 0α formula in the infinitary logic Lω1,ω. As a corollary of this result we obtain a new pullback theorem for positive computable embeddings: Let K be positively computably embeddable in K' by , then for every pα formula in the vocabulary of K' there is a pα formula in the vocabulary of K such that for all A ∈ K, A if and only if (A) . We use this to obtain new results on the possibility of positive computable embeddings into the class of linear orderings.