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  1. Realizability and intuitionistic logic.J. Diller & A. S. Troelstra - 1984 - Synthese 60 (2):253 - 282.
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  • Predicative functionals and an interpretation of ⌢ID.Jeremy Avigad - 1998 - Annals of Pure and Applied Logic 92 (1):1-34.
    In 1958 Gödel published his Dialectica interpretation, which reduces classical arithmetic to a quantifier-free theory T axiomatizing the primitive recursive functionals of finite type. Here we extend Gödel's T to theories Pn of “predicative” functionals, which are defined using Martin-Löf's universes of transfinite types. We then extend Gödel's interpretation to the theories of arithmetic inductive definitions IDn, so that each IDn is interpreted in the corresponding Pn. Since the strengths of the theories IDn are cofinal in the ordinal Γ0, as (...)
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  • Functional interpretation of Aczel's constructive set theory.Wolfgang Burr - 2000 - Annals of Pure and Applied Logic 104 (1-3):31-73.
    In the present paper we give a functional interpretation of Aczel's constructive set theories CZF − and CZF in systems T ∈ and T ∈ + of constructive set functionals of finite types. This interpretation is obtained by a translation × , a refinement of the ∧ -translation introduced by Diller and Nahm 49–66) which again is an extension of Gödel's Dialectica translation. The interpretation theorem gives characterizations of the definable set functions of CZF − and CZF in terms of (...)
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  • Kripke-style models for typed lambda calculus.John C. Mitchell & Eugenio Moggi - 1991 - Annals of Pure and Applied Logic 51 (1-2):99-124.
    Mitchell, J.C. and E. Moggi, Kripke-style models for typed lambda calculus, Annals of Pure and Applied Logic 51 99–124. The semantics of typed lambda calculus is usually described using Henkin models, consisting of functions over some collection of sets, or concrete cartesian closed categories, which are essentially equivalent. We describe a more general class of Kripke-style models. In categorical terms, our Kripke lambda models are cartesian closed subcategories of the presheaves over a poset. To those familiar with Kripke models of (...)
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  • Epistemology Versus Ontology: Essays on the Philosophy and Foundations of Mathematics in Honour of Per Martin-Löf.Peter Dybjer, Sten Lindström, Erik Palmgren & Göran Sundholm (eds.) - 2012 - Dordrecht, Netherland: Springer.
    This book brings together philosophers, mathematicians and logicians to penetrate important problems in the philosophy and foundations of mathematics. In philosophy, one has been concerned with the opposition between constructivism and classical mathematics and the different ontological and epistemological views that are reflected in this opposition. The dominant foundational framework for current mathematics is classical logic and set theory with the axiom of choice. This framework is, however, laden with philosophical difficulties. One important alternative foundational programme that is actively pursued (...)
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  • Inductive types and exact completion.Benno van den Berg - 2005 - Annals of Pure and Applied Logic 134 (2-3):95-121.
    Using the theory of exact completions, I construct a certain class of pretoposes, consisting of what one might call “predicative realizability toposes”, that can act as categorical models of certain predicative type theories, including Martin-Löf Type Theory.
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  • Proof Theory and Meaning.B. G. Sundholm - unknown
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  • Church's thesis, continuity, and set theory.M. Beeson & A. Ščedrov - 1984 - Journal of Symbolic Logic 49 (2):630-643.
    Under the assumption that all "rules" are recursive (ECT) the statement $\operatorname{Cont}(N^N,N)$ that all functions from N N to N are continuous becomes equivalent to a statement KLS in the language of arithmetic about "effective operations". Our main result is that KLS is underivable in intuitionistic Zermelo-Fraenkel set theory + ECT. Similar results apply for functions from R to R and from 2 N to N. Such results were known for weaker theories, e.g. HA and HAS. We extend not only (...)
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  • Categorical and algebraic aspects of Martin-löf type theory.Adam Obtułowicz - 1989 - Studia Logica 48 (3):299 - 317.
    In the paper there are introduced and discussed the concepts of an indexed category with quantifications and a higher level indexed category to present an algebraic characterization of some version of Martin-Löf Type Theory. This characterization is given by specifying an additional equational structure of those indexed categories which are models of Martin-Löf Type Theory. One can consider the presented characterization as an essentially algebraic theory of categorical models of Martin-Löf Type Theory. The paper contains a construction of an indexed (...)
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  • Domain interpretations of martin-löf’s partial type theory.Erik Palmgren & Viggo Stoltenberg-Hansen - 1990 - Annals of Pure and Applied Logic 48 (2):135-196.
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  • Denotational semantics for intuitionistic type theory using a hierarchy of domains with totality.Geir Waagbø - 1999 - Archive for Mathematical Logic 38 (1):19-60.
    A modified version of Normann's hierarchy of domains with totality [9] is presented and is shown to be suitable for interpretation of Martin-Löf's intuitionistic type theory. This gives an interpretation within classical set theory, which is natural in the sense that $\Sigma$ -types are interpreted as sets of pairs and $\Pi$ -types as sets of choice functions. The hierarchy admits a natural definition of the total objects in the domains, and following an idea of Berger [3] this makes possible an (...)
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  • Extensional realizability.Jaap van Oosten - 1997 - Annals of Pure and Applied Logic 84 (3):317-349.
    Two straightforward “extensionalisations” of Kleene's realizability are considered; denoted re and e. It is shown that these realizabilities are not equivalent. While the re-notion is a subset of Kleene's realizability, the e-notion is not. The problem of an axiomatization of e-realizability is attacked and one arrives at an axiomatization over a conservative extension of arithmetic, in a language with variables for finite sets. A derived rule for arithmetic is obtained by the use of a q-variant of e-realizability; this rule subsumes (...)
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