Representations of the small quasi-quantum group
Abstract
In this paper, we study the representation theory of the small quantum group Uq and the small quasi-quantum group Uq, where q is a primitive n-th root of unity and n>2 is odd. All finite dimensional indecomposable Uq-modules are described and classified. Moreover, the decomposition rules for the tensor products of Uq-modules are given. Finally, we describe the structures of the projective class ring rp(Uq) and the Green ring r(Uq). We show that r(Uq) is isomorphic to a subring of r(Uq), and the stable Green rings rst(Uq) and rst(Uq) are isomorphic.
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