Sum logics and tensor products

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Foundations of Physics 23 (7):999-1024 (1993)
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Abstract

A notion of factorizability for vector-valued measures on a quantum logic L enables us to pass from abstract logics to Hilbert space logics and thereby to construct tensor products. A claim by Kruszynski that, in effect, every orthogonally scattered measure is factorizable is shown to be false. Some criteria for factorizability are found

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10.1007/bf00736013

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Graded tensor products of quantum logics.Robin Hudson & Sylvia Pulmannová - 1994 - Foundations of Physics 24 (1):109-116.

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Coupled physical systems.David J. Foulis - 1989 - Foundations of Physics 19 (7):905-922.

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