Oriented quantum algebras (coalgebras) are generalizations of quasitriangular Hopf algebras (coquasitriangular Hopf algebras) and account for regular isotopy invariants of oriented 1-1 tangles, oriented knots and ...Oriented quantum algebras (coalgebras) are generalizations of quasitriangular Hopf algebras (coquasitriangular Hopf algebras) and account for regular isotopy invariants of oriented 1-1 tangles, oriented knots and links. Let (H, or, D, U) be an oriented quantum coalgebra over the field k. Then (H×H, φ, D×D, U× U) is a trivial oriented quantum coalgebra structure on the tensor product of coalgebra H with itself, where φ (a × b, c × d) = σ-( a, c)σ (b, d). This paper presents the oriented quantum coalgebra structure ( H×H, σ, D×D, U× U) on coalgebra H× H, where σ( a × b, c× d) = σ ^-1 ( d1, a1 ) σ( a2, c1 ) σ^-1 ( d2, b1 ) σ( b2, c2 ). So a nontrivial oriented quantum coalgebra structure is obtained and it is dual to Radford's results in the paper "On the tensor product of an oriented quantum algebra with itself" published in 2007. Theoretically, the results of this paper are important in constructing the invariants of oriented knots and links.展开更多
基金The National Natural Science Foundation of China(No.10871042)
文摘Oriented quantum algebras (coalgebras) are generalizations of quasitriangular Hopf algebras (coquasitriangular Hopf algebras) and account for regular isotopy invariants of oriented 1-1 tangles, oriented knots and links. Let (H, or, D, U) be an oriented quantum coalgebra over the field k. Then (H×H, φ, D×D, U× U) is a trivial oriented quantum coalgebra structure on the tensor product of coalgebra H with itself, where φ (a × b, c × d) = σ-( a, c)σ (b, d). This paper presents the oriented quantum coalgebra structure ( H×H, σ, D×D, U× U) on coalgebra H× H, where σ( a × b, c× d) = σ ^-1 ( d1, a1 ) σ( a2, c1 ) σ^-1 ( d2, b1 ) σ( b2, c2 ). So a nontrivial oriented quantum coalgebra structure is obtained and it is dual to Radford's results in the paper "On the tensor product of an oriented quantum algebra with itself" published in 2007. Theoretically, the results of this paper are important in constructing the invariants of oriented knots and links.
