Properties of quantum logic maps as fuzzy relations on a set of all symmetric and idempotent binary matrices

Reinis Isaks

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Displaying similar documents to “Properties of quantum logic maps as fuzzy relations on a set of all symmetric and idempotent binary matrices”

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Sum of observables in fuzzy quantum spaces

Anatolij Dvurečenskij, Anna Tirpáková (1992)

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We introduce the sum of observables in fuzzy quantum spaces which generalize the Kolmogorov probability space using the ideas of fuzzy set theory.

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Anatolij Dvurečenskij (1994)

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A new approach to representation of observables on fuzzy quantum posets

Le Ba Long (1992)

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We give a representation of an observable on a fuzzy quantum poset of type II by a pointwise defined real-valued function. This method is inspired by that of Kolesárová [6] and Mesiar [7], and our results extend representations given by the author and Dvurečenskij [4]. Moreover, we show that in this model, the converse representation fails, in general.