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Algebraic structure of tensor superoperators for the super-rotation algebra. II - MaRDI portal

Algebraic structure of tensor superoperators for the super-rotation algebra. II

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Publication:4019986

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DOI10.1063/1.529684zbMath0774.17006OpenAlexW2008716143MaRDI QIDQ4019986

Marek Mozrzymas, Pierre Minnaert

Publication date: 16 January 1993

Published in: Journal of Mathematical Physics (Search for Journal in Brave)

Full work available at URL: https://doi.org/10.1063/1.529684

zbMATH Keywords

fundamental representations orthosymplectic superalgebras explicit bases Racah-Wigner calculus super-rotation algebra special linear superalgebras spin \(j\) tensor superoperators super-rotation 6- \(j\)symbol

Mathematics Subject Classification ID

Superalgebras (17A70) Graded Lie (super)algebras (17B70)

Related Items (6)

Supersymmetries of the superspace E(3‖2) ⋮ \(\text{sl}(2| 1)^{(2)}\) Gaudin magnet and its associated Knizhnik--Zamolodchikov equation ⋮ Racah–Wigner calculus for the super-rotation algebra. I ⋮ Clebsch–Gordan coefficients for the quantum superalgebra Uq (osp(1‖2)) ⋮ Thesl(2|1)⁽²⁾Gaudin magnet with diagonal boundary terms ⋮ The super-rotation Racah–Wigner calculus revisited

Cites Work

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