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Quantum, classical and intermediate I: A model on the Poincaré sphere

In: Tatra Mountains Mathematical Publications, vol. 10, no. 1
Diederik Aerts - Bob Coecke - Thomas Durt - Frank Valckenborgh
Detaily:
Rok, strany: 1997, 225 - 240
O článku:
Following an approach, that we have called the hidden-measurement approach, where the probability structure of quantum mechanics is explained as being due to the presence of fluctuations on the measurement situations, we introduce explicitly a variation of these fluctuations, with the aim of defining a procedure for the classical limit. We study a concrete physical entity and show that for maximal fluctuations the entity is described by a quantum model, isomorphic to the model of the spin of a spin 1/2 quantum entity. For zero fluctuations we find a classical structure, and for intermediate fluctuations we find a structure that is neither quantum nor classical, to which we shall refer as the ldquo;intermediate“ situation.
Ako citovať:
ISO 690:
Aerts, D., Coecke, B., Durt, T., Valckenborgh, F. 1997. Quantum, classical and intermediate I: A model on the Poincaré sphere. In Tatra Mountains Mathematical Publications, vol. 10, no.1, pp. 225-240. 1210-3195.

APA:
Aerts, D., Coecke, B., Durt, T., Valckenborgh, F. (1997). Quantum, classical and intermediate I: A model on the Poincaré sphere. Tatra Mountains Mathematical Publications, 10(1), 225-240. 1210-3195.