Stabilizing Quantum Disjunction

Tranchini, Luca

doi:10.1007/s10992-018-9460-7

Cited by 4 publications

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“…These stronger permutations were first formulated in natural deduction format by[29] and have been recently discussed in the context of proof-theoretic semantics by[31,32] 7. The general form of the γ + -conversions for an arbitrary polynomial connective (of which the one given here is a simple instance) is given in Appendix D.…”

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The Naturality of Natural Deduction (II): On Atomic Polymorphism and Generalized Propositional Connectives

2021

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In a previous paper (of which this is a prosecution) we investigated the extraction of proof-theoretic properties of natural deduction derivations from their impredicative translation into System F. Our key idea was to introduce an extended equational theory for System F codifying at a syntactic level some properties found in parametric models of polymorphic type theory. A different approach to extract proof-theoretic properties of natural deduction derivations was proposed in a recent series of papers on the basis of an embedding of intuitionistic propositional logic into a predicative fragment of System F, called atomic System F. In this paper we show that this approach finds a general explanation within our equational study of second-order natural deduction, and a clear semantic justification in terms of parametricity.

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The Naturality of Natural Deduction (II): On Atomic Polymorphism and Generalized Propositional Connectives

2021

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“…Generalized permuations were first introduced by Seely[18] and have been recently investigated in the context of proof-theoretic semantics by Tranchini[20,21].…”

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The naturality of natural deduction (II). Some remarks on atomic polymorphism

Pistone¹,

Tranchini²,

Petrolo³

2019

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In this paper (which is a prosecution of "The naturality of natural deduction", Studia Logica 2019) we investigate the exact relationship between the Russell-Prawitz translation of intuitionistic propositional logic into intuitionistc secondorder propositional logic (System F ), and its variant proposed by Fernando Ferreira and Gilda Ferreira into the atomic fragment of System F (System F at ).In the previous paper we investigated the Russell-Prawitz translation via an extended equational theory for System F arising from its categorical semantics. The main result of this paper is that the Russell-Prawitz translation and Ferreira and Ferreira's translation are equivalent modulo this extended equational theory.This result highlights a close connection between our previous work and that of Ferreira and Ferreira. We argue however that the approach obtained by coupling the original Russell-Prawitz translation with our extended equational theory is more satisfactory for the study of proof identity than the one based on System F at .

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Intensional Harmony as Isomorphism

Pistone,

Tranchini

2024

Outstanding Contributions to Logic

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Stabilizing Quantum Disjunction

Cited by 4 publications

References 14 publications

The Naturality of Natural Deduction (II): On Atomic Polymorphism and Generalized Propositional Connectives

The Naturality of Natural Deduction (II): On Atomic Polymorphism and Generalized Propositional Connectives

The naturality of natural deduction (II). Some remarks on atomic polymorphism

Intensional Harmony as Isomorphism

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