Applications of weak Kripke semantics to intermediate consequences

Studia Logica 45 (1):119 - 134 (1986)
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Abstract

Section 1 contains a Kripke-style completeness theorem for arbitrary intermediate consequences. In Section 2 we apply weak Kripke semantics to splittings in order to obtain generalized axiomatization criteria of the Jankov-type. Section 3 presents new and short proofs of recent results on implicationless intermediate consequences. In Section 4 we prove that these consequences admit no deduction theorem. In Section 5 all maximal logics in the 3 rd counterslice are determined. On these results we reported at the 1980 meeting on Mathematical Logic at Oberwolfach. This paper concerns propositional logic only.

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10.1007/bf01881553

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Citations of this work

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A Strange Remark Attributed to Gödel.Lloyd Humberstone - 2003 - History and Philosophy of Logic 24 (1):39-44.

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Splittings of lattices of quasivarieties.Andrzej Wronski - 1981 - Bulletin of the Section of Logic 10 (3):128-129.

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