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A trace-like invariant for representations of Hopf algebras

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 Added by Andrea Jedwab
 Publication date 2009
  fields
and research's language is English
 Authors Andrea Jedwab




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In this paper we introduce a trace-like invariant for the irreducible representations of a finite dimensional complex Hopf algebra H. We do so by considering the trace of the map induced by the antipode S on the endomorphisms End(V) of a self-dual module V. We also compute the values of this trace for the representations of two non-semisimple Hopf algebras: u_q(sl_2) and D(H_n(q)), the Drinfeld double of the Taft algebra.



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141 - Andrea Jedwab , Leonid Krop 2009
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189 - Yi-Lin Cheng , Siu-Hung Ng 2010
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