Recursive linear orders with recursive successivities

Annals of Pure and Applied Logic 27 (3):253-264 (1984)
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Abstract

A successivity in a linear order is a pair of elements with no other elements between them. A recursive linear order with recursive successivities U is recursively categorical if every recursive linear order with recursive successivities isomorphic to U is in fact recursively isomorphic to U . We characterize those recursive linear orders with recursive successivities that are recursively categorical as precisely those with order type k 1 + g 1 + k 2 + g 2 +…+ g n -1 + k n where each k n is a finite order type, non-empty for i ϵ{2,…, n -1} and each g i is an order type from among {ω,ω * ,ω+ω * }∪{ k ·η: k

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10.1016/0168-0072(84)90028-9

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Citations of this work

Δ20-categoricity in Boolean algebras and linear orderings.Charles F. D. McCoy - 2003 - Annals of Pure and Applied Logic 119 (1-3):85-120.
Relations Intrinsically Recursive in Linear Orders.Michael Moses - 1986 - Mathematical Logic Quarterly 32 (25-30):467-472.

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References found in this work

Recursive Boolean algebras with recursive atoms.Jeffrey B. Remmel - 1981 - Journal of Symbolic Logic 46 (3):595-616.
Effective content of field theory.G. Metakides - 1979 - Annals of Mathematical Logic 17 (3):289.

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