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Discussiones Mathematicae General Algebra and Applications 21(2) (2001) 239-253
DOI: https://doi.org/10.7151/dmgaa.1041

RING-LIKE STRUCTURES WITH UNIQUE SYMMETRIC DIFFERENCE RELATED TO QUANTUM LOGIC

Dietmar Dorninger, Helmut Länger Technische Universität Wien Institut für Algebra und Computermathematik Wiedner Hauptstraß e 8-10, A-1040 Wien e-mail: h.laenger@tuwien.ac.at   e-mail: d.dorninger@tuwien.ac.at

Maciej Maczyński Warsaw University of Technology Faculty of Mathematics and Information Science Plac Politechniki 1, PL 00-661 Warsaw, Poland e-mail: mamacz@alpha.mini.pw.edu.pl

Abstract

Ring-like quantum structures generalizing Boolean rings and having the property that the terms corresponding to the two normal forms of the symmetric difference in Boolean algebras coincide are investigated. Subclasses of these structures are algebraically characterized and related to quantum logic. In particular, a physical interpretation of the proposed model following Mackey's approach to axiomatic quantum mechanics is given.

Keywords: generalized Boolean quasiring, symmetric difference, quantum logic.

2000 AMS Mathematics Subject Classifications: 81P10, 03G12, 06C15, 06E99.

References

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Received 21 August 2001