Archive/Group SU(2) Irreducible Representations and Probability Distributions Describing the Density Matrices of Qubit States
Group SU(2) Irreducible Representations and Probability Distributions Describing the Density Matrices of Qubit States
Margarita A. Man’ko, Vladimir I. Man’ko
3 de julio de 2026
en

Abstract

The general problem of describing quantum states not only by wave functions and density operators but also by probability distribution functions is discussed in this paper. The qubit-state density-matrix elements expressed in terms of probability distributions are connected with the irreducible representation of group SU(2). The transform of the probability distributions corresponding to the unitary transform of the qubit state of the spin-1/2 system is obtained and expressed in terms of matrix elements of the group SU(2). The possibility to extend the introduced formalism to other quantum states is suggested. For qubit systems, the notion of density operators algebra and the relation with the probability representation of quantum states are discussed. The Schrödinger equation for qubit states is obtained as an equation for probabilities.

Keywords

groupirreduciblerepresentationsprobabilitydistributionsdescribingdensitymatricesqubitstatesphysicsgeneralproblemquantumonlywavefunctionsoperatorsalsodistributiondiscussedpaperqubit-statedensity-matrix
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