Duality for the Jordanian Matrix Quantum Group GLg,h(2)
Abstract
We find the Hopf algebra Ug,h dual to the Jordanian matrix quantum group GLg,h(2). As an algebra it depends only on the sum of the two parameters and is split in two subalgebras: U'g,h (with three generators) and U(Z) (with one generator). The subalgebra U(Z) is a central Hopf subalgebra of Ug,h. The subalgebra U'g,h is not a Hopf subalgebra and its coalgebra structure depends on both parameters. We discuss also two one-parameter special cases: g =h and g=-h. The subalgebra U'h,h is a Hopf algebra and coincides with the algebra introduced by Ohn as the dual of SLh(2). The subalgebra U'-h,h is isomorphic to U(sl(2)) as an algebra but has a nontrivial coalgebra structure and again is not a Hopf subalgebra of U-h,h.
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