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QUANTUM LOGIC ASSOCIATED TO FINITE DIMENSIONAL INTERVALS OF MODULAR ORTHOLATTICES

Published online by Cambridge University Press:  29 June 2016

R. GIUNTINI
Affiliation:
UNIVERSITÁ DI CAGLIARI VIA IS MIRRIONIS 1, 09123 CAGLIARI, ITALIAE-mail:[email protected]
H. FREYTES
Affiliation:
DEPARTAMENTO DE MATEMÁTICA UNR-CONICET AV. PELLEGRINI 250 CP 2000, ROSARIO, ARGENTINAE-mail:[email protected]
G. SERGIOLI
Affiliation:
UNIVERSITÁ DI CAGLIARI VIA IS MIRRIONIS 1, 09123 CAGLIARI, ITALIAE-mail:[email protected]

Abstract

In this work we study an abstract formulation of a problem posed by J.M. Dunn, T.J. Hagge et al. about the inclusion of varieties generated by the modular ortholattice of subspaces of ℂn. We shall prove that, this abstract formulation is equivalent to the direct irreducibility for atomic complete modular ortholattices.

Type
Articles
Copyright
Copyright © The Association for Symbolic Logic 2016 

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References

REFERENCES

Birkhoff, G. and von Neumann, J., The logic of quantum mechanics . Annals of Mathematics, vol. 37 (1936), pp. 823843.Google Scholar
Burris, S., Sankappanavar, H. P., A Course in Universal Algebra, Graduate Text in Mathematics, vol. 78, Springer-Verlag, New York, Heidelberg, Berlin, 1981.Google Scholar
Catlin, D. E., Irreducibility conditions in orthomodular lattices . Journal of Natural Sciences and Mathematics, vol. 8 (1968), pp. 8187.Google Scholar
Dunn, J. M., Hagge, T. J., Moss, L. S. and Wang, Z., Quantum logic as motived by quantum computing, this Journal, vol. 70 (2005), pp. 353359.Google Scholar
Hagge, T. J., QL(ℂ n ) determines n, this Journal, vol. 72 (2007), pp. 11941196.Google Scholar
Kalmbach, G., Orthomodular Lattices, Academic Press, New York, 1983.Google Scholar
Maeda, F. and Maeda, S., Theory of Symmetric Lattices, Springer-Verlag, Berlin, 1970.Google Scholar