The algebra of physical magnitudes

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Foundations of Physics 10 (5-6):363-373 (1980)
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Abstract

We define a physical magnitude as an equivalence class of measurement procedures and formulate sufficient restrictions on the equivalence relation to guarantee meaningful algebraic operations between magnitudes. These restrictions are not sufficient to let the Kochen and Specker argument go through. They are, however, stronger than mere statistical equivalence of measurement procedures and thus are relevant to the problem of the completeness of quantum mechanics. In fact, they give rise to a strong argument for the incompleteness of quantum mechanics

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10.1007/bf00708739

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Citations of this work

Contextual quantum process theory.Dick J. Hoekzema - 1992 - Foundations of Physics 22 (4):467-486.

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References found in this work

On the completeness of quantum theory.Arthur Fine - 1974 - Synthese 29 (1-4):257 - 289.
Algebraic constraints on hidden variables.Arthur Fine & Paul Teller - 1978 - Foundations of Physics 8 (7-8):629-636.

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