Jordanian Quantum Deformations of D=4 Anti-de-Sitter and Poincare Superalgebras
Abstract
We consider a superextension of the extended Jordanian twist, describing nonstandard quantization of anti-de-Sitter (AdS) superalgebra osp(1|4) in the form of Hopf superalgebra. The super-Jordanian twisting function and corresponding basic coproduct formulae for the generators of osp(1|4) are given in explicit form. The nonlinear transformation of the classical superalgebra basis not modifying the defining algebraic relations but simplifying coproducts and antipodes is proposed. Our physical application is to interpret the new super-Jordanian deformation of osp(1|4) superalgebra as deformed D=4 AdS supersymmetries. Subsequently we perform suitable contraction of quantum Jordanian AdS superalgebra and obtain new -deformation of D=4 Poincare superalgebra, with the bosonic sector describing the light cone -deformation of Poincare symmetries.
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