An equational axiomatization of dynamic negation and relational composition

Journal of Logic, Language and Information 6 (4):381-401 (1997)
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Abstract

We consider algebras on binary relations with two main operators: relational composition and dynamic negation. Relational composition has its standard interpretation, while dynamic negation is an operator familiar to students of Dynamic Predicate Logic (DPL) (Groenendijk and Stokhof, 1991): given a relation R its dynamic negation R is a test that contains precisely those pairs (s,s) for which s is not in the domain of R. These two operators comprise precisely the propositional part of DPL.This paper contains a finite equational axiomatization for these dynamic relation algebras. The completenessresult uses techniques from modal logic. We also lookat the variety generated by the class of dynamic relation algebras and note that there exist nonrepresentable algebras in this variety, ones which cannot be construedas spaces of relations. These results are also proved for an extension to a signature containing atomic tests and union.

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2004

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10.1023/a:1008271805106

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Citations of this work

Incremental dynamics.Jan van Eijck - 2001 - Journal of Logic, Language and Information 10 (3):319-351.
Dynamic relation logic is the logic of DPL-Relations.Albert Visser - 1997 - Journal of Logic, Language and Information 6 (4):441-452.
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Relational validity & dynamic predicate logic.Albert Visser - 1997 - Journal of Logic Language and Information 6:441-452.

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References found in this work

Dynamic predicate logic.Jeroen Groenendijk & Martin Stokhof - 1991 - Linguistics and Philosophy 14 (1):39-100.
Modal logic with names.George Gargov & Valentin Goranko - 1993 - Journal of Philosophical Logic 22 (6):607 - 636.
Logics of Time and Computation.Robert Goldblatt - 1990 - Studia Logica 49 (2):284-286.
On the calculus of relations.Alfred Tarski - 1941 - Journal of Symbolic Logic 6 (3):73-89.
Nominal tense logic.Patrick Blackburn - 1992 - Notre Dame Journal of Formal Logic 34 (1):56-83.

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