Representations of the q-deformed algebra Uq( iso2)
Abstract
An algebra homomorphism from the q-deformed algebra Uq( iso2) with generating elements I, T1, T2 and defining relations [I,T2]q=T1, [T1,I]q=T2, [T2,T1]q=0 (where [A,B]q=q1/2AB-q-1/2BA) to the extension Uq( m2) of the Hopf algebra Uq( m2) is constructed. The algebra Uq( iso2) at q=1 leads to the Lie algebra iso2 m2 of the group ISO(2) of motions of the Euclidean plane. The Hopf algebra Uq( m2) is treated as a Hopf q-deformation of the universal enveloping algebra of iso2 and is well-known in the literature. Not all irreducible representations of Uq( m2) can be extended to representations of the extension Uq( m2). Composing the homomorphism with irreducible representations of Uq( m2) we obtain representations of Uq( iso2). Not all of these representations of Uq( iso2) are irreducible. The reducible representations of Uq( iso2) are decomposed into irreducible components. In this way we obtain all irreducible representations of Uq( iso2) when q is not a root of unity. A part of these representations turns into irreducible representations of the Lie algebra iso2 when q 1. Representations of the other part have no classical analogue.
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