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Abstract
The notion of a crossed product with a Hopf algebroid was introduced by Böhm and Brzeziński [Citation12]. It is well-known that weak Hopf algebras (see Böhm et al. [Citation10]) is an example of Hopf algebroids. Then we get the definition and some property of a weak crossed product A#σ H over an algebra A and a weak Hopf algebra H. Next we give a Maschke-type theorem for the weak crossed product over a semisimple weak Hopf algebra H. Furthermore, we obtain an analogue of the Nikshych's duality theorem for weak crossed products. Finally, using this duality theorem, we prove that the global dimension of A equals to the global dimension of A#σ H if H and H* are both semisimple.
2000 Mathematics Subject Classification:
ACKNOWLEDGMENTS
The author sincerely thanks the referee for his or her valuable suggestions and comments. This work was supported by the NSF of China (10725104) and STCSM (09XD1402500).
Notes
Communicated by Q. Wu.