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A Simple Logic of Functional Dependence

Alexandru Baltag, Johan van Benthem

2021Journal of Philosophical Logic35 citationsDOIOpen Access PDF

Abstract

Abstract This paper presents a simple decidable logic of functional dependence LFD, based on an extension of classical propositional logic with dependence atoms plus dependence quantifiers treated as modalities, within the setting of generalized assignment semantics for first order logic. The expressive strength, complete proof calculus and meta-properties of LFD are explored. Various language extensions are presented as well, up to undecidable modal-style logics for independence and dynamic logics of changing dependence models. Finally, more concrete settings for dependence are discussed: continuous dependence in topological models, linear dependence in vector spaces, and temporal dependence in dynamical systems and games.

Topics & Concepts

DecidabilityUndecidable problemDynamic logic (digital electronics)Modal logicSimple (philosophy)MathematicsIndependence (probability theory)Zeroth-order logicExtension (predicate logic)Computer scienceCalculus (dental)Algebra over a fieldDiscrete mathematicsModalMultimodal logicTheoretical computer sciencePure mathematicsDescription logicProgramming languagePhysicsVoltageTransistorPolymer chemistryMedicineStatisticsPhilosophyEpistemologyChemistryDentistryQuantum mechanicsLogic, Reasoning, and KnowledgeSemantic Web and OntologiesLogic, programming, and type systems