Switch to: References

Citations of:

The Range of Modal Logic: An essay in memory of George Gargov

Johan van Benthem

Journal of Applied Non-Classical Logics 9 (2):407-442 (1999)

Add citations

You must login to add citations.

Guards, Bounds, and generalized semantics.Johan van Benthem - 2005 - Journal of Logic, Language and Information 14 (3):263-279.details Some initial motivations for the Guarded Fragment still seem of interest in carrying its program further. First, we stress the equivalence between two perspectives: (a) satisfiability on standard models for guarded first-order formulas, and (b) satisfiability on general assignment models for arbitrary first-order formulas. In particular, we give a new straightforward reduction from the former notion to the latter. We also show how a perspective shift to general assignment models provides a new look at the fixed-point extension LFP(FO) of first-order (...) Download Export citation Bookmark 5 citations
Some characterization and preservation theorems in modal logic.Tin Perkov - 2012 - Annals of Pure and Applied Logic 163 (12):1928-1939.details A class of Kripke models is modally definable if there is a set of modal formulas such that the class consists exactly of models on which every formula from that set is globally true. In this paper, a class is also considered definable if there is a set of formulas such that it consists exactly of models in which every formula from that set is satisfiable. The notion of modal definability is then generalized by combining these two. For thus obtained (...) Download Export citation Bookmark 2 citations
Mereological Bimodal Logics.Li Dazhu & Yanjing Wang - 2022 - Review of Symbolic Logic 15 (4):823-858.details In this paper, using a propositional modal language extended with the window modality, we capture the first-order properties of various mereological theories. In this setting, $\Box \varphi $ reads all the parts (of the current object) are $\varphi $, interpreted on the models with a whole-part binary relation under various constraints. We show that all the usual mereological theories can be captured by modal formulas in our language via frame correspondence. We also correct a mistake in the existing completeness proof (...) Download Export citation Bookmark
On the Modal Logic of Subset and Superset: Tense Logic over Medvedev Frames.Wesley H. Holliday - 2017 - Studia Logica 105 (1):13-35.details Viewing the language of modal logic as a language for describing directed graphs, a natural type of directed graph to study modally is one where the nodes are sets and the edge relation is the subset or superset relation. A well-known example from the literature on intuitionistic logic is the class of Medvedev frames $\langle W,R\rangle$ where $W$ is the set of nonempty subsets of some nonempty finite set $S$, and $xRy$ iff $x\supseteq y$, or more liberally, where $\langle W,R\rangle$ (...) Download Export citation Bookmark 5 citations
Modal Frame Correspondences and Fixed-Points.Johan Van Benthem - 2006 - Studia Logica 83 (1-3):133-155.details Taking Löb's Axiom in modal provability logic as a running thread, we discuss some general methods for extending modal frame correspondences, mainly by adding fixed-point operators to modal languages as well as their correspondence languages. Our suggestions are backed up by some new results – while we also refer to relevant work by earlier authors. But our main aim is advertizing the perspective, showing how modal languages with fixed-point operators are a natural medium to work with. Download Export citation Bookmark 15 citations

1