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has been cited by the following article:
TITLE: Quantum Logic and Geometric Quantization
AUTHORS: Simone Camosso
KEYWORDS: Geometric Quantization, Quantum Logic, Hilbert Lattice, Poset, Trace
JOURNAL NAME: Journal of Quantum Information Science, Vol.7 No.1, March 31, 2017
ABSTRACT: We assume that M is a phase space and H an Hilbert space yielded by a quantization scheme. In this paper we consider the set of all “experimental propositions” of M and we look for a model of quantum logic in relation to the quantization of the base manifold M. In particular we give a new interpretation about previous results of the author in order to build an “asymptotics quantum probability space” for the Hilbert lattice L(H).