The Normal and Self-extensional Extension of Dunn–Belnap Logic

Logica Universalis 14 (3):281-296 (2020)
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Abstract

A logic \ is called self-extensional if it allows to replace occurrences of a formula by occurrences of an \-equivalent one in the context of claims about logical consequence and logical validity. It is known that no three-valued paraconsistent logic which has an implication can be self-extensional. In this paper we show that in contrast, the famous Dunn–Belnap four-valued logic has exactly one self-extensional four-valued extension which has an implication. We also investigate the main properties of this logic, determine the expressive power of its language, and provide a cut-free Gentzen-type proof system for it.

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10.1007/s11787-020-00254-1

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