On the Drinfeld double of a finite group scheme and its representation category
Abstract
We classify equivalence classes of Hopf algebra quotient pairs (D,θ) of the Drinfeld double D(G) of a finite group scheme G over an algebraically closed field k of characteristic p 0, in terms of group scheme-theoretical data. We prove that such Hopf algebra quotients D are Hopf algebra extensions O(K)cop\#στ k[G/H], where K and H are normal subgroup schemes of G that centralize each other and B:k[H] O(K) is a G-equivariant Hopf algebra map, and describe the surjective Hopf algebra map θ:D(G) D. Using this classification, we determine the tensor subcategories of the center Z(G):=(D(G)) of G, describe their centralizers, determine when they are symmetric or non-degenerate, and give a description of their simple and projective objects using GS. Our categorical results generalize those found in NNW in characteristic 0.
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