Recursive functionals

Bibliographic Information

Recursive functionals

Luis E. Sanchis

(Studies in logic and the foundations of mathematics, v. 131)

North-Holland, 1992

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Note

Includes bibliographical references (p. 265-267) and index

Description and Table of Contents

Description

This work is a self-contained elementary exposition of the theory of recursive functionals, that also includes a number of advanced results. Although aiming basically at a theory of higher order computability, attention is restricted to second order functionals, where the arguments are numerical functions and the values, when defined, are natural numbers. This theory is somewhat special, for to some extent it can be reduced to first order theory, but when properly extended and relativized it requires the full machinery of higher order computations. In the theory of recursive monotonic functionals the author formulates a reasonable notion of computation which provides the right frame for what appears to be a convincing form of the extended Church's thesis. At the same time, the theory provides sufficient room to formulate the classical results that are usually derived in terms of singular functionals. Presented are complete proofs of Gandy's selector theorem, Kleene's theorem on hyperarithmetical predicates, and Grilliot's theorem on effectively discontinuous functionals.

Table of Contents

Mappings and Domains. Functionals and Predicates. Basic Operations. Primitive Recursive Operations. Basic Recursion. Church's Thesis. Functional Recursion. Recursive Algorithms. Formalization: Structural Semantics. Formalization: Reductional Semantics. Interpreters. A Universal Interpreter. Enumeration. Continuous Functionals. A Selector Theorem. Hyperenumeration. Recursion in Normal Classes. Recursion and Church's Thesis. References. Index.

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Details

  • NCID
    BA17101709
  • ISBN
    • 0444894470
  • LCCN
    92010555
  • Country Code
    ne
  • Title Language Code
    eng
  • Text Language Code
    eng
  • Place of Publication
    Amsterdam ; Tokyo
  • Pages/Volumes
    xii, 277 p.
  • Size
    23 cm
  • Classification
  • Subject Headings
  • Parent Bibliography ID
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