Weak Hopf Algebras, Smash Products and Applications to Adjoint-Stable Algebras
Abstract
For a semisimple quasi-triangular Hopf algebra ( H,R) over a field k of characteristic zero, and a strongly separable quantum commutative H-module algebra A over which the Drinfeld element of H acts trivially, we show that A\#H is a weak Hopf algebra, and it can be embedded into a weak Hopf algebra EndA H. With these structure, A\#HMod is the monoidal category introduced by Cohen and Westreich, and EndA HM is tensor equivalent to HM. If A is in the M\"uger center of HM, then the embedding is a quasi-triangular weak Hopf algebra morphism. This explains the presence of a subgroup inclusion in the characterization of irreducible Yetter-Drinfeld modules for a finite group algebra.
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