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WOLLIC
2009
Springer
2009
Springer
Sound and Complete Tree-Sequent Calculus for Inquisitive Logic
Abstract. We introduce a tree-sequent calculus for inquisitive logic (Groenendijk 2008) as a special form of labelled deductive system (Gabbay 1996). In particular, we establish that (i) our tree-sequent calculus is sound and complete with respect to Groenendijk’s inquisitive semantics and that (ii) our tree-sequent calculus is decidable and enjoys cut-elimination theorem. (ii) is semantically revealed by our argument for (i). The key idea obtaining our results is as follows: In Groenendijk’s inquisitive semantics, a formula of propositional logic is evaluated by a pair of worlds on a model. Given the appropriate pre-order on the set of such pairs, any inquisitive model can be regarded as a Kripke model for intuitionistic logic. This equivalence enables us to connect inquisitive semantics with the tree-sequent technique for non-classical logics (Kashima 1999).
Real-time TrafficApplied Computing | Groenendijk’s Inquisitive Semantics | Inquisitive Logic | Tree-sequent Calculus | WOLLIC 2009 |
Related Content
| Added | 25 May 2010 |
| Updated | 25 May 2010 |
| Type | Conference |
| Year | 2009 |
| Where | WOLLIC |
| Authors | Katsuhiko Sano |
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