From Games to Truth Functions: A Generalization of Giles’s Game

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Studia Logica 102 (2):389-410 (2014)
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Abstract

Motivated by aspects of reasoning in theories of physics, Robin Giles defined a characterization of infinite valued Łukasiewicz logic in terms of a game that combines Lorenzen-style dialogue rules for logical connectives with a scheme for betting on results of dispersive experiments for evaluating atomic propositions. We analyze this game and provide conditions on payoff functions that allow us to extract many-valued truth functions from dialogue rules of a quite general form. Besides finite and infinite valued Łukasiewicz logics, also Meyer and Slaney’s Abelian logic and Cancellative Hoop Logic turn out to be characterizable in this manner

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10.1007/s11225-014-9550-7

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Citations of this work

Dialogical logic.Laurent Keiff - 2010 - Stanford Encyclopedia of Philosophy.
Many-valued logic.Siegfried Gottwald - 2008 - Stanford Encyclopedia of Philosophy.

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References found in this work

A non-classical logic for physics.Robin Giles - 1974 - Studia Logica 33 (4):397 - 415.
Dialogspiele als Semantische Grundlage von Logikkalkülen.Kuno Lorenz - 1968 - Archive for Mathematical Logic 11 (3-4):73-100.
Comparative logics.Ettore Casari - 1987 - Synthese 73 (3):421 - 449.

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