1984
DOI: 10.1016/0168-0072(84)90028-9
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Recursive linear orders with recursive successivities

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Cited by 27 publications
(5 citation statements)
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“…. , a s } for every s ∈ ω. THEOREM 4 [6]. Let A be a computable structure and R be a k-place computable relation on A.…”
Section: Intrinsically Computable Idealsmentioning
confidence: 99%
“…. , a s } for every s ∈ ω. THEOREM 4 [6]. Let A be a computable structure and R be a k-place computable relation on A.…”
Section: Intrinsically Computable Idealsmentioning
confidence: 99%
“…Though not part of the language of linear orders, every linear order has an associated immediate successor relation , where holds for if and only if b is the -immediate successor of a . As explained in [19, Section 3], a computable linear order is -decidable if and only if the immediate successor relation is computable. It is straightforward to check that a computable copy of is computably isomorphic to the usual presentation if and only if is computable.…”
Section: Cohesive Powers Of Computable Copies Ofmentioning
confidence: 99%
“…As explained above, it follows from [19, Section 3] that a computable copy of is computably isomorphic to the usual presentation if and only if is -decidable. Thus we show that if is a -decidable copy of and C is cohesive, then .…”
Section: Cohesive Powers Of Computable Copies Ofmentioning
confidence: 99%
“…Effectively, we mentioned the Remmel-Dzgoev characterization of computably categorical linear orderings in terms of their successor relation. Moses [15] showed that a computable linear ordering L is 1-decidable if and only if the successor relation on L is computable. This is one reason why the complexity of the successor relation on computable linear orderings was studied intensively, in particular in the theorem of Downey, Lempp and Wu mentioned above.…”
Section: The Successor Relationmentioning
confidence: 99%