Representations Parameterized by a Pair of Characters
Abstract
Let U and A be algebras over a field k. We study algebra structures H on the underlying tensor product UA of vector spaces which satisfy (ua)(u'a') = uu'aa' if a = 1 or u' = 1. For a pair of characters ∈ (U, k) and ∈ (A, k) we define a left H-module L(, ). Under reasonable hypotheses the correspondence (, ) L(, ) determines a bijection between character pairs and the isomorphism classes of objects in a certain category H M of left H-modules. In many cases the finite-dimensional objects of H M are the finite-dimensional irreducible left H-modules. In math.QA/0603269 we apply the results of this paper and show that the finite-dimensional irreducible representations of a wide class of pointed Hopf algebras are parameterized by pairs of characters.
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