An effective version of the Stone duality

Abstract

The paper studies computability-theoretic aspects of topological T0-spaces. We introduce effective versions of the notions of a countable c-poset and a (second-countable) topological space with base. Based on this, we prove an effective version of the known Stone-type duality between the category AS (whose objects are almost semispectral spaces with base and whose morphisms are spectral mappings) and the category DP (whose objects are distributive c-posets and whose morphisms are strict mappings). Namely, we show that for an arbitrary set Z⊂eq ω, this duality is preserved when one restricts to objects which have Z-computably enumerable presentations only. Following this approach, we establish several results in computable topology. We prove that every degree spectrum of a countable algebraic structure can be realized as the degree spectrum of a topological space with base. We show that for any non-zero natural number N, there is a computable topological space with base that has precisely N-many computable copies, up to effective spectral homeomorphisms.