Constructing Quasitriangular Hopf Algebras

“…In this section, we shall introduce the π-unified coproduct as the natural generalization of unified coproduct introduced by the second author in [4]. First, a coextending π-datum is introduced as follows.…”

“…In what follows, we always let A be a Hopf algebra and Ω(A) = (H, ρ, , ω) a crossed semi-Hopf πcoalgebra coextending structure of A with the crossing ϕ. First, we introduce some new definitions which are both the group version of the concepts of [4] and also the dual concepts of Definition 2.1, 2.2 and 2.4 in [2]. Definition 5.1.…”

“…In this paper, we shall introduce a new coproduct named π-unified coproduct as the generalization of unified coproduct introduced by the second author in [4] which is the dual of unified product introduced in [1] as an answer to the restricted extending structures problem for Hopf algebras. Then we discuss the its classification and quasitriangular stuctures.…”

Group unified coprodcuts and related quasitriangular structures

“…In this section, we shall introduce the π-unified coproduct as the natural generalization of unified coproduct introduced by the second author in [4]. First, a coextending π-datum is introduced as follows.…”

“…In what follows, we always let A be a Hopf algebra and Ω(A) = (H, ρ, , ω) a crossed semi-Hopf πcoalgebra coextending structure of A with the crossing ϕ. First, we introduce some new definitions which are both the group version of the concepts of [4] and also the dual concepts of Definition 2.1, 2.2 and 2.4 in [2]. Definition 5.1.…”

“…In this paper, we shall introduce a new coproduct named π-unified coproduct as the generalization of unified coproduct introduced by the second author in [4] which is the dual of unified product introduced in [1] as an answer to the restricted extending structures problem for Hopf algebras. Then we discuss the its classification and quasitriangular stuctures.…”

Group unified coprodcuts and related quasitriangular structures

“…Quasi-triangular Hopf algebras play an important in the theory of Hopf algebras and quantum groups, since they provide solutions to quantum Yang-Baxter equations. People try to construct quasi-triangular Hopf algebras and get a lot of results(see [29,20,6,30,16]). In this section, we shall show that H 4n is quasitriangular and give all universal R-matrices explicitly.…”

“…(5) and (6). Let k ∈ {1, 2}, s ∈ {0, n}, j ∈ {0, 1} and v s be the basis of M [1, s], then X • v s = 0 and G • v s = (−1) s n v s , so we have…”

On $4n$-dimensional neither pointed nor semisimple Hopf algebras and the associated weak Hopf algebras

Ribbon Hopf Superalgebras and Drinfel’d Double