For a field k and two finite groups G and X, when G acts on X from the right by group automorphisms, there is a Hopf algebra structure on k-space (kX°P)* kG (see Theorem 2.1), called a non-balanced quantum ...For a field k and two finite groups G and X, when G acts on X from the right by group automorphisms, there is a Hopf algebra structure on k-space (kX°P)* kG (see Theorem 2.1), called a non-balanced quantum double and denoted by Dx(G). In this paper, some Hopf algebra properties of Dx (G) are given, the representation types of Dx (G) viewed as a k-algebra are discussed, the algebra structure and module category over Dx(G) are studied. Since the Hopf algebra structure of non-balanced quantum double DX (G) generMizes the usual quantum double D(G) for a finite group G, all results about Dx(G) in this paper can also be used to describe D(G) as a special case and the universal R-matrix of Dx (G) provides more solutions of Yang-Baxter equation.展开更多
基金Supported by Doctoral Foundation of Qingdao University of Science and Technology (20080022398)the National Natural Science Foundation of China (11271318, 11171296)the Specialized Research Fund for the Doctoral Program of Higher Education of China (20110101110010)
文摘For a field k and two finite groups G and X, when G acts on X from the right by group automorphisms, there is a Hopf algebra structure on k-space (kX°P)* kG (see Theorem 2.1), called a non-balanced quantum double and denoted by Dx(G). In this paper, some Hopf algebra properties of Dx (G) are given, the representation types of Dx (G) viewed as a k-algebra are discussed, the algebra structure and module category over Dx(G) are studied. Since the Hopf algebra structure of non-balanced quantum double DX (G) generMizes the usual quantum double D(G) for a finite group G, all results about Dx(G) in this paper can also be used to describe D(G) as a special case and the universal R-matrix of Dx (G) provides more solutions of Yang-Baxter equation.
