Turing degrees of hypersimple relations on computable structures

Annals of Pure and Applied Logic 121 (2-3):209-226 (2003)
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Abstract

Let be an infinite computable structure, and let R be an additional computable relation on its domain A. The syntactic notion of formal hypersimplicity of R on , first introduced and studied by Hird, is analogous to the computability-theoretic notion of hypersimplicity of R on A, given the definability of certain effective sequences of relations on A. Assuming that R is formally hypersimple on , we give general sufficient conditions for the existence of a computable isomorphic copy of on whose domain the image of R is hypersimple and of arbitrary nonzero computably enumerable Turing degree

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10.1016/s0168-0072(02)00113-6

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Valentina Harizanov
George Washington University

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References found in this work

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Recursive properties of relations on models.Geoffrey R. Hird - 1993 - Annals of Pure and Applied Logic 63 (3):241-269.

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