Uniqueness of Uq(N) as a quantum gauge group and representations of its differential algebra

Abstract

To construct a quantum group gauge theory one needs an algebra which is invariant under gauge transformations. The existence of this invariant algebra is closely related with the existence of a differential algebra δ H Gq compatible with the Hopf algebra structure. It is shown that δ H Gq exists only for the quantum group Uq(N) and that the quantum group SUq(N) as a quantum gauge group is not allowed. The representations of the algebra δ H Gq are con- structed. The operators corresponding to the differentials are realized via derivations on the space of all irreducible *-representations of Uq(2). With the help of this construction infinitesimal gauge transformations in two-dimensional classical space-time are described.

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