The Geometry of Negation

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Journal of Applied Non-Classical Logics 13 (1):9-19 (2003)
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Abstract

There are two natural ways of thinking about negation: (i) as a form of complementation and (ii) as an operation of reversal, or inversion (to deny that p is to say that things are “the other way around”). A variety of techniques exist to model conception (i), from Euler and Venn diagrams to Boolean algebras. Conception (ii), by contrast, has not been given comparable attention. In this note we outline a twofold geometric proposal, where the inversion metaphor is understoood as involving a rotation o a reflection, respectively. These two options are equivalent in classical two-valued logic but they differ significantly in many-valued logics. Here we show that they correspond to two basic sorts of negation operators—Post’s and Kleene’s—and we provide a simple group-theoretic argument demonstrating their generative power.

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10.3166/jancl.13.9-19

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Achille C. Varzi
Columbia University

Citations of this work

Formes, objets et négation selon Granger.Fabien Schang - 2020 - Philosophiques 47 (1):3-33.
Negation and Dichotomy.Fabien Schang (ed.) - 2009 - Bydgoszcz: Kazimierz Wielki University Press.
Negating as turning upside down.Bartłomiej Skowron & Wiesław Kubiś - 2018 - Studies in Logic, Grammar and Rhetoric 54 (1):115-129.

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References found in this work

A Natural History of Negation.Laurence R. Horn - 1989 - University of Chicago Press.
From Frege to Gödel.Jean Van Heijenoort (ed.) - 1967 - Cambridge,: Harvard University Press.
Many-valued logic.Nicholas Rescher - 1969 - New York,: McGraw-Hill.

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