Infinite time extensions of Kleene’s $${\mathcal{O}}$$

Archive for Mathematical Logic 48 (7):691-703 (2009)
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Abstract

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, and that ${\mathcal{O}^{++}}$ is Turing computably isomorphic to the halting problem of eventual computability

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10.1007/s00153-009-0146-2

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Citations of this work

The computational strengths of α-tape infinite time Turing machines.Benjamin Rin - 2014 - Annals of Pure and Applied Logic 165 (9):1501-1511.

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References found in this work

On notation for ordinal numbers.S. C. Kleene - 1938 - Journal of Symbolic Logic 3 (4):150-155.
The truth is never simple.John P. Burgess - 1986 - Journal of Symbolic Logic 51 (3):663-681.
Infinite time Turing machines.Joel David Hamkins & Andy Lewis - 2000 - Journal of Symbolic Logic 65 (2):567-604.
Recursive well-orderings.Clifford Spector - 1955 - Journal of Symbolic Logic 20 (2):151-163.

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