Modal Aggregation and the Theory of Paraconsistent Filters

Mathematical Logic Quarterly 42 (1):175-190 (1996)
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Abstract

This paper articulates the structure of a two species of weakly aggregative necessity in a common idiom, neighbourhood semantics, using the notion of a k-filter of propositions. A k-filter on a non-empty set I is a collection of subsets of I which contains I, is closed under supersets on I, and contains ∪{Xi ≤ Xj : 0 ≤ i < j ≤ k} whenever it contains the subsets X0,…, Xk. The mathematical content of the proof that weakly aggregative modal logic is complete relative to k-ary frame theory, the standard semantic idiom for weakly aggregative modal logic is presented in language-independent terms as a representation theorem for k-filters: every non-trivial k-filter is included in the union of ≤ k non-trivial filters. The elementary theory of k-filters is developed and then applied in the form of an ultrafilter extension result for k-ary frame theory

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10.1002/malq.19960420115

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Non-kripkean deontic logic.Peter K. Schotch & Raymond E. Jennings - 1981 - In Risto Hilpinen (ed.), New Studies in Deontic Logic: Norms, Actions, and the Foundations of Ethics. Dordrecht, Netherland: Wiley-Blackwell. pp. 149--162.

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