An Intrisic Topology for Orthomodular Lattices

A. Wilce; A. Wilce; A. Wilce; B. Chellas; C. Piron; D. Dalen van; D.J. Foulis; G.E. Hughes; M.L. Dalla Chiara; M.P. Solèr; O. Brunet; O. Brunet; Olivier Brunet; R.J. Greechie; S. Pulmannová; T.H. Choe

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An Intrisic Topology for Orthomodular Lattices

Authors: A. Wilce
A. Wilce
A. Wilce
B. Chellas
C. Piron
D. Dalen van
D.J. Foulis
G.E. Hughes
M.L. Dalla Chiara
M.P. Solèr
O. Brunet
O. Brunet
Olivier Brunet
R.J. Greechie
S. Pulmannová
T.H. Choe
Publication date: 1 January 2007
Publisher: 'Springer Science and Business Media LLC'
Doi

Abstract

We present a general way to define a topology on orthomodular lattices. We show that in the case of a Hilbert lattice, this topology is equivalent to that induced by the metrics of the corresponding Hilbert space. Moreover, we show that in the case of a boolean algebra, the obtained topology is the discrete one. Thus, our construction provides a general tool for studying orthomodular lattices but also a way to distinguish classical and quantum logics.Comment: Under submission to the International Journal of Theoretical Physic

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