The logic of Peirce algebras

Journal of Logic, Language and Information 4 (3):227-250 (1995)
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Abstract

Peirce algebras combine sets, relations and various operations linking the two in a unifying setting. This paper offers a modal perspective on Peirce algebras. Using modal logic a characterization of the full Peirce algebras is given, as well as a finite axiomatization of their equational theory that uses so-called unorthodox derivation rules. In addition, the expressive power of Peirce algebras is analyzed through their connection with first-order logic, and the fragment of first-order logic corresponding to Peirce algebras is described in terms of bisimulations.

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10.1007/bf01049414

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Citations of this work

A system of dynamic modal logic.Maarten de Rijke - 1998 - Journal of Philosophical Logic 27 (2):109-142.
The Modal Multilogic of Geometry.Philippe Balbiani - 1998 - Journal of Applied Non-Classical Logics 8 (3):259-281.
Zooming in, zooming out.Patrick Blackburn & Maarten De Rijke - 1997 - Journal of Logic, Language and Information 6 (1):5-31.

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References found in this work

Derivation rules as anti-axioms in modal logic.Yde Venema - 1993 - Journal of Symbolic Logic 58 (3):1003-1034.
Modal model theory.Maarten De Rijke - forthcoming - Annals of Pure and Applied Logic.
Variable-free semantics for anaphora.Michael Böttner - 1992 - Journal of Philosophical Logic 21 (4):375 - 390.

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