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Arrow Logic and Multi-Modal Logic

Maarten Marx, Laszls Pslos & Michael Masuch

Center for the Study of Language and Information Publications (1996)

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On fork arrow logic and its expressive power.Paulo A. S. Veloso, Renata P. de Freitas, Petrucio Viana, Mario Benevides & Sheila R. M. Veloso - 2007 - Journal of Philosophical Logic 36 (5):489 - 509.details We compare fork arrow logic, an extension of arrow logic, and its natural first-order counterpart (the correspondence language) and show that both have the same expressive power. Arrow logic is a modal logic for reasoning about arrow structures, its expressive power is limited to a bounded fragment of first-order logic. Fork arrow logic is obtained by adding to arrow logic the fork modality (related to parallelism and synchronization). As a result, fork arrow logic attains the expressive power of its first-order (...) Logic and Philosophy of Logic Logics in Logic and Philosophy of Logic Modal Logic in Logic and Philosophy of Logic Direct download (4 more) Export citation Bookmark
On Fork Arrow Logic and Its Expressive Power.Paulo A. S. Veloso, Renata P. De Freitas, Petrucio Viana, Mario Benevides & Sheila R. M. Veloso - 2007 - Journal of Philosophical Logic 36 (5):489 - 509.details We compare fork arrow logic, an extension of arrow logic, and its natural first-order counterpart (the correspondence language) and show that both have the same expressive power. Arrow logic is a modal logic for reasoning about arrow structures, its expressive power is limited to a bounded fragment of first-order logic. Fork arrow logic is obtained by adding to arrow logic the fork modality (related to parallelism and synchronization). As a result, fork arrow logic attains the expressive power of its first-order (...) Logic and Philosophy of Logic Logics in Logic and Philosophy of Logic Modal Logic in Logic and Philosophy of Logic Modal and Intensional Logic in Logic and Philosophy of Logic Direct download (3 more) Export citation Bookmark
Arrow logic and infinite counting.Ágnes Kurucz - 2000 - Studia Logica 65 (2):199-222.details We consider arrow logics (i.e., propositional multi-modal logics having three -- a dyadic, a monadic, and a constant -- modal operators) augmented with various kinds of infinite counting modalities, such as 'much more', 'of good quantity', 'many times'. It is shown that the addition of these modal operators to weakly associative arrow logic results in finitely axiomatizable and decidable logics, which fail to have the finite base property. Logic and Philosophy of Logic Logics in Logic and Philosophy of Logic Direct download (5 more) Export citation Bookmark 1 citation
The Modal Multilogic of Geometry.Philippe Balbiani - 1998 - Journal of Applied Non-Classical Logics 8 (3):259-281.details ABSTRACT A spatial logic is a modal logic of which the models are the mathematical models of space. Successively considering the mathematical models of space that are the incidence geometry and the projective geometry, we will successively establish the language, the semantical basis, the axiomatical presentation, the proof of the decidability and the proof of the completeness of INC, the modal multilogic of incidence geometry, and PRO, the modal multilogic of projective geometry. Logic and Philosophy of Logic Modal and Intensional Logic in Logic and Philosophy of Logic Direct download (4 more) Export citation Bookmark 7 citations

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