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Theorie Der Numerierungen III

Mathematical Logic Quarterly 23 (19‐24):289-371 (1976)

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  1. Countable algebra and set existence axioms.Harvey M. Friedman - 1983 - Annals of Pure and Applied Logic 25 (2):141.
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  • A Real Number Structure that is Effectively Categorical.Peter Hertling - 1999 - Mathematical Logic Quarterly 45 (2):147-182.
    On countable structures computability is usually introduced via numberings. For uncountable structures whose cardinality does not exceed the cardinality of the continuum the same can be done via representations. Which representations are appropriate for doing real number computations? We show that with respect to computable equivalence there is one and only one equivalence class of representations of the real numbers which make the basic operations and the infinitary normed limit operator computable. This characterizes the real numbers in terms of the (...)
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  • Computable and continuous partial homomorphisms on metric partial algebras.Viggo Stoltenberg-Hansen & John V. Tucker - 2003 - Bulletin of Symbolic Logic 9 (3):299-334.
    We analyse the connection between the computability and continuity of functions in the case of homomorphisms between topological algebraic structures. Inspired by the Pour-El and Richards equivalence theorem between computability and boundedness for closed linear operators on Banach spaces, we study the rather general situation of partial homomorphisms between metric partial universal algebras. First, we develop a set of basic notions and results that reveal some of the delicate algebraic, topological and effective properties of partial algebras. Our main computability concepts (...)
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  • d-computable Categoricity for Algebraic Fields.Russell Miller - 2009 - Journal of Symbolic Logic 74 (4):1325 - 1351.
    We use the Low Basis Theorem of Jockusch and Soare to show that all computable algebraic fields are d-computably categorical for a particular Turing degree d with d' = θ", but that not all such fields are 0'-computably categorical. We also prove related results about algebraic fields with splitting algorithms, and fields of finite transcendence degree over ℚ.
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  • A decomposition of the Rogers semilattice of a family of d.c.e. sets.Serikzhan A. Badaev & Steffen Lempp - 2009 - Journal of Symbolic Logic 74 (2):618-640.
    Khutoretskii's Theorem states that the Rogers semilattice of any family of c.e. sets has either at most one or infinitely many elements. A lemma in the inductive step of the proof shows that no Rogers semilattice can be partitioned into a principal ideal and a principal filter. We show that such a partitioning is possible for some family of d.c.e. sets. In fact, we construct a family of c.e. sets which, when viewed as a family of d.c.e. sets, has (up (...)
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  • P ≠ NP for all infinite Boolean algebras.Mihai Prunescu - 2003 - Mathematical Logic Quarterly 49 (2):210-213.
    We prove that all infinite Boolean rings have the property P ≠ NP according to the digital nondeterminism.
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  • Strong reducibility of partial numberings.Dieter Spreen - 2005 - Archive for Mathematical Logic 44 (2):209-217.
    A strong reducibility relation between partial numberings is introduced which is such that the reduction function transfers exactly the numbers which are indices under the numbering to be reduced into corresponding indices of the other numbering. The degrees of partial numberings of a given set with respect to this relation form an upper semilattice.In addition, Ershov’s completion construction for total numberings is extended to the partial case: every partially numbered set can be embedded in a set which results from the (...)
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  • Can partial indexings be totalized?Dieter Spreen - 2001 - Journal of Symbolic Logic 66 (3):1157-1185.
    In examples like the total recursive functions or the computable real numbers the canonical indexings are only partial maps. It is even impossible in these cases to find an equivalent total numbering. We consider effectively given topological T 0 -spaces and study the problem in which cases the canonical numberings of such spaces can be totalized, i.e., have an equivalent total indexing. Moreover, we show under very natural assumptions that such spaces can effectively and effectively homeomorphically be embedded into a (...)
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  • Recursive Boolean algebras with recursive atoms.Jeffrey B. Remmel - 1981 - Journal of Symbolic Logic 46 (3):595-616.
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  • Recursive isomorphism types of recursive Boolean algebras.J. B. Remmel - 1981 - Journal of Symbolic Logic 46 (3):572-594.
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  • Universal recursion theoretic properties of R.e. Preordered structures.Franco Montagna & Andrea Sorbi - 1985 - Journal of Symbolic Logic 50 (2):397-406.
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  • Some applications of computable one-one numberings.Martin Kummer - 1990 - Archive for Mathematical Logic 30 (4):219-230.
    We present a simple proof of a Theorem of Khutoretskij on the number of incomparable one-one numberings of an r.e. family of r.e. sets. The proof directly generalizes to effective domains. In the second part, applying a Theorem of Goncharov, we show that for anyk≧ there exist total recursive functions having exactlyk recursive isomorphism classes. Using a Theorem of Selivanov, it is shown that a certain notion of computability via gödelization is different from Lacombe's notion ofV-recursiveness. Finally, we discuss the (...)
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  • Classifications of Computable Structures.Karen Lange, Russell Miller & Rebecca M. Steiner - 2018 - Notre Dame Journal of Formal Logic 59 (1):35-59.
    Let K be a family of structures, closed under isomorphism, in a fixed computable language. We consider effective lists of structures from K such that every structure in K is isomorphic to exactly one structure on the list. Such a list is called a computable classification of K, up to isomorphism. Using the technique of Friedberg enumeration, we show that there is a computable classification of the family of computable algebraic fields and that with a 0'-oracle, we can obtain similar (...)
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  • On the existence of universal numberings for finite families of d.c.e. sets.Kuanysh Abeshev - 2014 - Mathematical Logic Quarterly 60 (3):161-167.
    We investigate properties of universal numberings of finite families of d.c.e. sets. We show different cases of finite families of d.c.e. sets for which there is a universal numbering and for which there is not.
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  • On local non‐compactness in recursive mathematics.Jakob G. Simonsen - 2006 - Mathematical Logic Quarterly 52 (4):323-330.
    A metric space is said to be locally non-compact if every neighborhood contains a sequence that is eventually bounded away from every element of the space, hence contains no accumulation point. We show within recursive mathematics that a nonvoid complete metric space is locally non-compact iff it is without isolated points.The result has an interesting consequence in computable analysis: If a complete metric space has a computable witness that it is without isolated points, then every neighborhood contains a computable sequence (...)
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  • Rogers semilattices of limitwise monotonic numberings.Nikolay Bazhenov, Manat Mustafa & Zhansaya Tleuliyeva - 2022 - Mathematical Logic Quarterly 68 (2):213-226.
    Limitwise monotonic sets and functions constitute an important tool in computable structure theory. We investigate limitwise monotonic numberings. A numbering ν of a family is limitwise monotonic (l.m.) if every set is the range of a limitwise monotonic function, uniformly in k. The set of all l.m. numberings of S induces the Rogers semilattice. The semilattices exhibit a peculiar behavior, which puts them in‐between the classical Rogers semilattices (for computable families) and Rogers semilattices of ‐computable families. We show that every (...)
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