Selfextensional logics with a distributive nearlattice term

Archive for Mathematical Logic 58 (1-2):219-243 (2019)
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Abstract

We define when a ternary term m of an algebraic language \ is called a distributive nearlattice term -term) of a sentential logic \. Distributive nearlattices are ternary algebras generalising Tarski algebras and distributive lattices. We characterise the selfextensional logics with a \-term through the interpretation of the DN-term in the algebras of the algebraic counterpart of the logics. We prove that the canonical class of algebras associated with a selfextensional logic with a \-term is a variety, and we obtain that the logic is in fact fully selfextensional.

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10.1007/s00153-018-0628-1

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Protoalgebraic Logics.Janusz Czelakowski - 2001 - Kluwer Academic Publishers.

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