Exact pairs for arithmetical ideals in the Rogers semilattices
Exact pairs for arithmetical ideals in the Rogers semilattices
(Russian, English abstract)
Siberian Electronic Mathematical Reports, 23, 1, pp. 383-392 (2026)
Abstract:
In this paper we study the question of the existence of exact pairs for ideals in upper semilattices of computable numberings and prove that all proper $\Sigma^0_3$-ideals in the semilattices of computable numberings of the families of all partial recursive functions, r.e. sets, left-r.e. reals, and Martin-Löf random left-r.e. reals have exact pairs.
Keywords: computable numbering, Rogers semilattice, ideal, exact pair, left-r.e. real.