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Theories of types and names with positive stratified comprehension
Studia Logica 62 (2):215-242 (1999)
Abstract
We introduce a certain extension of -calculus, and show that it has the Church-Rosser property. The associated open-term extensional combinatory algebra is used as a basis to construct models for theories of Explict Mathematics (formulated in the language of "types and names") with positive stratified comprehension. In such models, types are interpreted as collections of solutions (of terms) w.r. to a set of numerals. Exploiting extensionality, we prove some consistency results for special ontological axioms which are refutable under elementary comprehension.Author's Profile
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Citations of this work
The axiom of choice and combinatory logic.Andrea Cantini - 2003 - Journal of Symbolic Logic 68 (4):1091-1108.
References found in this work
Constructivism in Mathematics: An Introduction.A. S. Troelstra & Dirk Van Dalen - 1988 - Amsterdam: North Holland. Edited by D. van Dalen.
The lambda calculus: its syntax and semantics.Hendrik Pieter Barendregt - 1981 - New York, N.Y.: Sole distributors for the U.S.A. and Canada, Elsevier Science Pub. Co..
Logical frameworks for truth and abstraction: an axiomatic study.Andrea Cantini (ed.) - 1996 - New York: Elsevier Science B.V..
Systems of explicit mathematics with non-constructive μ-operator. Part II.Solomon Feferman & Gerhard Jäger - 1996 - Annals of Pure and Applied Logic 79 (1):37-52.
Monotone inductive definitions in a constructive theory of functions and classes.Shuzo Takahashi - 1989 - Annals of Pure and Applied Logic 42 (3):255-297.
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