Observables on hypergraphs

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Foundations of Physics 16 (8):773-790 (1986)
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Abstract

Observables on hypergraphs are described by event-valued measures. We first distinguish between finitely additive observables and countably additive ones. We then study the spectrum, compatibility, and functions of observables. Next a relationship between observables and certain functionals on the set of measures M(H) of a hypergraph H is established. We characterize hypergraphs for which every linear functional on M(H) is determined by an observable. We define the concept of an “effect” and show that observables are related to effect-valued measures. Finally, we define “operational” transformations from M(H) to itself and show that they can be described as a certain combination of effects

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10.1007/bf00735379

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References found in this work

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