In this paper,we show that if H is a finite dimensional Hopf algebra then H is quasitri-angular if and only if H is coquasi-triangular. As a consequentility ,we obtain a generalized result of Sauchenburg.
This paper introduces the concepts of cylinder coalgebras and cylinder coproducts for quasitriangular bialgebras, and points out that there exists an anti-coalgebra isomorphism (H,△^-)≌ (H,△^-), where (H, △^-...This paper introduces the concepts of cylinder coalgebras and cylinder coproducts for quasitriangular bialgebras, and points out that there exists an anti-coalgebra isomorphism (H,△^-)≌ (H,△^-), where (H, △^-) is the cylinder coproduct, and (H,△^-) is the braided coproduct given by Kass. For any finite dimensional Hopf algebra H, the Drinfel'd double (D(H),△^-D(H)) is proved to be the cylinder coproduct. Let (H, H, R) be copaired Hopf algebras. If R ∈ Z(H×H) with inverse R-1 and skew inverse R, then the twisted coalgebra (H^R)^R-1 is constructed via twice twists, whose comultiplication is exactly the cylinder coproduct. Moreover, for any generalized Long dimodule, some solutions for Yang-Baxter equations, four braid pairs and Long equations are constructed via cylinder twists.展开更多
Let (H,R) be a triangular Hopf algebra. The monoidal functors on the category of representations of H is studied, and a universal quantum commutative algebra S e R(M) and a dual H° comodule M° for any H modu...Let (H,R) be a triangular Hopf algebra. The monoidal functors on the category of representations of H is studied, and a universal quantum commutative algebra S e R(M) and a dual H° comodule M° for any H module M with an integral e are constructed. Both constructions given here have tensor isomorphism properties.展开更多
基金Partially supported by the National Natural Science Foundation of China.
文摘In this paper,we show that if H is a finite dimensional Hopf algebra then H is quasitri-angular if and only if H is coquasi-triangular. As a consequentility ,we obtain a generalized result of Sauchenburg.
基金the National Natural Science Foundation of China(10571153),and Postdoctoral Science Foundation of China(2005037713)
文摘This paper introduces the concepts of cylinder coalgebras and cylinder coproducts for quasitriangular bialgebras, and points out that there exists an anti-coalgebra isomorphism (H,△^-)≌ (H,△^-), where (H, △^-) is the cylinder coproduct, and (H,△^-) is the braided coproduct given by Kass. For any finite dimensional Hopf algebra H, the Drinfel'd double (D(H),△^-D(H)) is proved to be the cylinder coproduct. Let (H, H, R) be copaired Hopf algebras. If R ∈ Z(H×H) with inverse R-1 and skew inverse R, then the twisted coalgebra (H^R)^R-1 is constructed via twice twists, whose comultiplication is exactly the cylinder coproduct. Moreover, for any generalized Long dimodule, some solutions for Yang-Baxter equations, four braid pairs and Long equations are constructed via cylinder twists.
文摘Let (H,R) be a triangular Hopf algebra. The monoidal functors on the category of representations of H is studied, and a universal quantum commutative algebra S e R(M) and a dual H° comodule M° for any H module M with an integral e are constructed. Both constructions given here have tensor isomorphism properties.
