Why a Logic is not only its Set of Valid Inferences

Barrio, Eduardo Alejandro; Pailós, Federico Matías

doi:10.36446/af.2021.461

Anál. Filos.

2021

DOI: 10.36446/af.2021.461

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Why a Logic is not only its Set of Valid Inferences

Eduardo Alejandro Barrio

Federico Matías Pailós

Abstract: The main idea that we want to defend in this paper is that the question of what a logic is should be addressed differently when structural properties enter the game. In particular, we want to support the idea according to which it is not enough to identify the set of valid inferences to characterize a logic. In other words, we will argue that two logical theories could identify the same set of validities (e.g. its logical truths and valid inferences), but not be the same logic.

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Sequent Calculi for First-order $$\textrm{ST}$$

Paoli,

Přenosil

2024

J Philos Logic

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Strict-Tolerant Logic ($$\textrm{ST}$$ ST ) underpins naïve theories of truth and vagueness (respectively including a fully disquotational truth predicate and an unrestricted tolerance principle) without jettisoning any classically valid laws. The classical sequent calculus without Cut is sometimes advocated as an appropriate proof-theoretic presentation of $$\textrm{ST}$$ ST . Unfortunately, there is only a partial correspondence between its derivability relation and the relation of local metainferential $$\textrm{ST}$$ ST -validity – these relations coincide only upon the addition of elimination rules and only within the propositional fragment of the calculus, due to the non-invertibility of the quantifier rules. In this paper, we present two calculi for first-order $$\textrm{ST}$$ ST with an eye to recapturing this correspondence in full. The first calculus is close in spirit to the Epsilon calculus. The other calculus includes rules for the discharge of sequent-assumptions; moreover, it is normalisable and admits interpolation.

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Sequent Calculi for First-order $$\textrm{ST}$$

Paoli,

Přenosil

2024

J Philos Logic

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Substructural heresies

Dicher

2023

Inquiry

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Why a Logic is not only its Set of Valid Inferences

Cited by 2 publications

References 17 publications

Sequent Calculi for First-order $$\textrm{ST}$$

Sequent Calculi for First-order $$\textrm{ST}$$

Substructural heresies

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