Sciweavers

APAL
2005

A Sahlqvist theorem for distributive modal logic

13 years 11 months ago
A Sahlqvist theorem for distributive modal logic
In this paper we consider distributive modal logic, a setting in which we may add modalities, such as classical types of modalities as well as weak forms of negation, to the fragment of classical propositional logic given by conjunction, disjunction, true, and false. For these logics we define both algebraic semantics, in the form of distributive modal algebras, and relational semantics, in the form of ordered Kripke structures. The main contributions of this paper lie in extending the notion of Sahlqvist axioms to our generalized setting and proving both a correspondence and a canonicity result for distributive modal logics axiomatized by Sahlqvist axioms. Our proof of the correspondence result relies on a reduction to the classical case, but our canonicity proof departs from the traditional style and uses the newly extended algebraic theory of canonical extensions.
Mai Gehrke, Hideo Nagahashi, Yde Venema
Added 15 Dec 2010
Updated 15 Dec 2010
Type Journal
Year 2005
Where APAL
Authors Mai Gehrke, Hideo Nagahashi, Yde Venema
Comments (0)