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Main Author: Zamperlin, Nicolò
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2409.15257
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author Zamperlin, Nicolò
author_facet Zamperlin, Nicolò
contents In this paper I introduce a generalized version of Richard Epstein's set-assignment semantics ([Epstein, 1990]). As a case study, I consider how this framework can be used to characterize William Parry's logic of analytic implication and some of its recent variations proposed by [Ferguson, 2023a]. In generalized Epstein semantics the parallel use of two algebras, one for extensional and the other for intensional values, allows to account for various forms of content sharing between formulae, which motivates the choice to investigate Parry systems. Hilbert-style axiomatizations and completeness proofs will be presented for all the considered calculi, in particular as main result I provide a set-assignment semantics for Parry's logic.
format Preprint
id arxiv_https___arxiv_org_abs_2409_15257
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Generalized Epstein semantics for Parry systems
Zamperlin, Nicolò
Logic
In this paper I introduce a generalized version of Richard Epstein's set-assignment semantics ([Epstein, 1990]). As a case study, I consider how this framework can be used to characterize William Parry's logic of analytic implication and some of its recent variations proposed by [Ferguson, 2023a]. In generalized Epstein semantics the parallel use of two algebras, one for extensional and the other for intensional values, allows to account for various forms of content sharing between formulae, which motivates the choice to investigate Parry systems. Hilbert-style axiomatizations and completeness proofs will be presented for all the considered calculi, in particular as main result I provide a set-assignment semantics for Parry's logic.
title Generalized Epstein semantics for Parry systems
topic Logic
url https://arxiv.org/abs/2409.15257