Introduction to Turing categories

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Annals of Pure and Applied Logic 156 (2):183-209 (2008)
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Abstract

We give an introduction to Turing categories, which are a convenient setting for the categorical study of abstract notions of computability. The concept of a Turing category first appeared in the work of Longo and Moggi; later, Di Paolo and Heller introduced the closely related recursion categories. One of the purposes of Turing categories is that they may be used to develop categorical formulations of recursion theory, but they also include other notions of computation, such as models of combinatory logic and of the lambda calculus. In this paper our aim is to give an introduction to the basic structural theory, while at the same time illustrating how the notion is a meeting point for various other areas of logic and computation. We also provide a detailed exposition of the connection between Turing categories and partial combinatory algebras and show the sense in which the study of Turing categories is equivalent to the study of PCAs

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10.1016/j.apal.2008.04.005

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Citations of this work

Computability in partial combinatory algebras.Sebastiaan A. Terwijn - 2020 - Bulletin of Symbolic Logic 26 (3-4):224-240.

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References found in this work

Handbook of Logic in Computer Science.S. Abramsky, D. Gabbay & T. Maibaurn (eds.) - 1992 - Oxford University Press.
Some Reasons for Generalizing Recursion Theory.G. Kreisel, R. O. Gandy & C. E. M. Yates - 1975 - Journal of Symbolic Logic 40 (2):230-232.
A General Form of Relative Recursion.Jaap van Oosten - 2006 - Notre Dame Journal of Formal Logic 47 (3):311-318.

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