Computable choice functions for computable linear orderings

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Mathematical Logic Quarterly 49 (5):485-510 (2003)
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Abstract

A choice set for a computable linear ordering is a set which contains one element from each maximal block of the ordering. We obtain a partial characterization of the computable linear order-types for which each computable model has a computable choice set, and a full characterization in the relativized case; Every model of the linear order-type α of degree ≤ d has a choice set of degree ≤ d iff α can written as a finite sum of order-types, each of which either has finitely many blocks, or has order-type n · η for some integer n

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10.1002/malq.200310053

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