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Journal of Physics A: Mathematical and General Volume 26 Number 17 Create an alert RSS this journal

D Bonatsos et al 1993 J. Phys. A: Math. Gen. 26 L871 doi:10.1088/0305-4470/26/17/020

Generalized deformed SU(2) algebra

D Bonatsos, C Daskaloyannis and P Kolokotronis

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Abstract References Cited By

A generalized deformed algebra SUPhi (2), characterized by a structure function Phi , is obtained. The usual SU(2) and SUq(2) algebras correspond to specific choices of the structure function Phi . The action of the generators of the algebra on the relevant basis vectors, as well as the eigenvalues of the Casimir operator, are easily obtained. Possible applications in improving phenomenological models are discussed.


PACS

02.10.-v Logic, set theory, and algebra

02.20.Uw Quantum groups

02.30.Tb Operator theory

03.65.Fd Algebraic methods

02.20.Sv Lie algebras of Lie groups

03.65.Db Functional analytical methods

MSC

81R15 Operator algebra methods (See also 46Lxx, 81T05)

20G42 Quantum groups (quantized function algebras) and their representations (See also 16W35, 17B37, 81R50)

17B37 Quantum groups (quantized enveloping algebras) and related deformations (See also 16W35, 20G42, 81R50, 82B23)

81R50 Quantum groups and related algebraic methods (See also 16W35, 17B37)

15A18 Eigenvalues, singular values, and eigenvectors

47A75 Eigenvalue problems (See also 49R50)

Subjects

Mathematical physics

Quantum information and quantum mechanics

Dates

Issue 17 (7 September 1993)



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