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Post's problem for supertasks has both positive and negative solutions

Joel David Hamkins & Andrew Lewis

Archive for Mathematical Logic 41 (6):507-523 (2002)

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Infinite time extensions of Kleene’s $${\mathcal{O}}$$.Ansten Mørch Klev - 2009 - Archive for Mathematical Logic 48 (7):691-703.details Using infinite time Turing machines we define two successive extensions of Kleene’s ${\mathcal{O}}$ and characterize both their height and their complexity. Specifically, we first prove that the one extension—which we will call ${\mathcal{O}^{+}}$ —has height equal to the supremum of the writable ordinals, and that the other extension—which we will call ${\mathcal{O}}^{++}$ —has height equal to the supremum of the eventually writable ordinals. Next we prove that ${\mathcal{O}^+}$ is Turing computably isomorphic to the halting problem of infinite time Turing computability, (...) Philosophy of Artificial Intelligence in Philosophy of Cognitive Science Direct download (4 more) Export citation Bookmark 1 citation
Post’s Problem for ordinal register machines: An explicit approach.Joel David Hamkins & Russell G. Miller - 2009 - Annals of Pure and Applied Logic 160 (3):302-309.details We provide a positive solution for Post’s Problem for ordinal register machines, and also prove that these machines and ordinal Turing machines compute precisely the same partial functions on ordinals. To do so, we construct ordinal register machine programs which compute the necessary functions. In addition, we show that any set of ordinals solving Post’s Problem must be unbounded in the writable ordinals. Logic and Philosophy of Logic, Miscellaneous in Logic and Philosophy of Logic Science, Logic, and Mathematics Direct download (4 more) Export citation Bookmark 1 citation
Infinite time Turing machines.Joel David Hamkins - 2002 - Minds and Machines 12 (4):567-604.details Infinite time Turing machines extend the operation of ordinary Turing machines into transfinite ordinal time. By doing so, they provide a natural model of infinitary computability, a theoretical setting for the analysis of the power and limitations of supertask algorithms. Computation and Physical Systems in Philosophy of Computing and Information Direct download (18 more) Export citation Bookmark 19 citations
Infinite Time Decidable Equivalence Relation Theory.Samuel Coskey & Joel David Hamkins - 2011 - Notre Dame Journal of Formal Logic 52 (2):203-228.details We introduce an analogue of the theory of Borel equivalence relations in which we study equivalence relations that are decidable by an infinite time Turing machine. The Borel reductions are replaced by the more general class of infinite time computable functions. Many basic aspects of the classical theory remain intact, with the added bonus that it becomes sensible to study some special equivalence relations whose complexity is beyond Borel or even analytic. We also introduce an infinite time generalization of the (...) Logic and Philosophy of Logic Logic and Philosophy of Logic, Miscellaneous in Logic and Philosophy of Logic Model Theory in Logic and Philosophy of Logic Direct download (5 more) Export citation Bookmark 3 citations

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