用quiver构造拟三角Hopf代数

利用quiver方法确定了一个广义Taft代数具有拟三角Hopf结构当且仅当它是Sweedler 4维Hopf代数.用不同于文[15]的方法,对任意的正整数n,构造出一类拟三角Hopf代数H(n).     

半拟三角弱Hopf代数

作为拟三角弱Hopf代数的推广,我们引入了半拟三角弱Hopf代数的概念.令(H,R,v)是一个半拟三角弱Hopf代数,其中,R是其半拟三角结构.我们指明R保持了拟三角弱Hopf代数中泛R-矩阵的许多基本性质.特别地,讨论了Drinfeld元的性质,证明其是可逆的并且是余作用v的余不变量.另外,证明了半拟三角弱Hopf代数的对极平方是对合的.     

路余代数上的Hopf ε-代数

在q不为单位根时，本文用无限简图A∞∞的double路余代数KA∞∞^—的商代数同时实现了量子代数Uq（sl2）以及量子超代数Uq（ops（2，1））．     

拟三角Hopf代数的Ore -扩张

该文主要考虑了拟三角Hopf代数的某种Ore -扩张问题. 对拟三角Hopf代数的Ore -扩张何时保持相同的拟三角结构给出了充分必要条件. 最后作为应用, 文章讨论了Sweedler Hopf代数和Lusztig小量子群的Ore -扩张结构.     

Hom-$\omega$-smash 积Hopf 代数的拟三角结构

设 $(A,\alpha)$和$(H,\beta)$ 是 Hom-\!\!双代数, $\omega:H\otimes A\rightarrow A\otimes H$ 是线性映射, 定义了 Hom-$\omega$-smash 积$(A\sharp_{\omega} H,\gamma)$,并给出了 $(A\bowtie_{\omega}H,\gamma)$ 是 Hom-bialgebra 的充要条件. 最后,研究了$(A\bowtie_{\omega} H,\gamma)$上的拟三角结构, 并给出了它是拟 三角 Hom-Hopf 代数的充要条件.     

Twist积和Twist余积Hopf代数

设H,A是两个Hopf代数,构造了twist积A#σH和twist余积A#τH,证明了文[1]中的double twist和S.Majid构造的Bicrossproduct结构以及通常的smash积都是A#σH的一种特殊情况;文[2,3]中的twist Hopf代数以及通常的smash余积是A#τH的特殊情况,最后讨论了A#τH上的拟三角结构.     

一类具有规范变换的拟Hopf代数

设H是拟Hopf代数,A是左H-模代数,F∈H■H是规范变换,本文给出了代数同构A#H≌A_F~(-1)#H_F,M是右A#H-模的一个充分必要条件,并且证明了范畴同构_(A,H)M≌A_F~(-1),H_FM和_HM_A≌H_FM_A_F~(-1).     

Twist积和Twist余积Hopf代数

设H,A是两个Hopf代数,构造了twist积A#_σH和twist余积A#~(?)H,证明了文[1]中的double twist和S.Majid构造的Bicrossproduct结构以及通常的smash积都是A#_σH的一种特殊情况;文[2,3]中的twist Hopf代数以及通常的smash余积是A#~(?)H的特殊情况,最后讨论了A#~(?)H上的拟三角结构.     

Hopf箭图与Hopf代数

本文研究了简单无向Hopf箭图的图论性质以及路代数与路余代数的关系.利用简单无向Hopf箭图与简单图的关系.证明了路代数是路余代数的对偶的直和部分.     

关于拟三角Hopf代数的Cylinder余代数和Cylinder余积(英)

本文引入两个概念,即,关于拟三角双代数的cylinder余代数和cylinder余积,并指出存在一个反余代数同构：(H,■)≌(H,■),其中(H,■)是cylinder余积,(H,■)是辫余积,对任意有限维Hopf代数H,我们证明Drinfel'd量子偶(D(H),■_(D(H)))是cylinder余积．设(H,H,R)是余配对Hopf代数,如果R∈Z(H■H),则通过两次扭曲,我们可以构造扭曲余代数(H~■)R~(-1),它的余乘法恰是cylinder余积．而且对任意的广义Long重模,通过cylinder扭曲,我们可以构造Yang-Baxter方程,四辫对和Long方程．     

准三角Hopf代数与双积

本文首先给出准三角Ｈｏｐｆ代数与Ｙｅｔｔｅｒ－Ｄｒｉｎｆｅｌｄ模的关系，推广了Ｒａｄｆｏｒｄ关于双积的构造，讨论二重Ｓｍａｓｈ积与双积的关系．     

Self-Dual Hopf Quivers

ABSTRACT

We study self-dual coradically graded pointed Hopf algebras with a help of the dual Gabriel theorem for pointed Hopf algebras (van Oystaeyen and Zhang, 2004 van Oystaeyen , F. , Zhang , P. ( 2004 ). Quiver Hopf algebras . J. Algebra 280 ( 2 ): 577 – 589 . [CSA] [CROSSREF]  [Google Scholar]). The co-Gabriel Quivers of such Hopf algebras are said to be self-dual. An explicit classification of self-dual Hopf quivers is obtained. We also prove that finite dimensional pointed Hopf algebras with self-dual graded versions are generated by group-like and skew-primitive elements as associative algebras. This partially justifies a conjecture of Andruskiewitsch and Schneider (2000 Andruskiewitsch , N. , Schneider , H.-J . ( 2000 ). Finite quantum groups and Cartan matrices . Adv. Math. 154 : 1 – 45 . [CSA] [CROSSREF] [Crossref], [Web of Science ®] , [Google Scholar]) and may help to classify finite dimensional self-dual coradically graded pointed Hopf algebras.     

On Quasitriangular Structures in Hopf Algebras Arising from Exact Group Factorizations

We show that bicrossed product Hopf algebras arising from exact factorizations in almost simple finite groups, so in particular, in simple and symmetric groups, admit no quasitriangular structure.     

On the Antipode of a Co-Frobenius (Co)Quasitriangular Hopf Algebra

For H a quasitriangular Hopf algebra, S ², the square of the antipode is the inner automorphism induced by the Drinfeld element u, and S ⁴ is the inner automorphism induced by the grouplike element g = uS(u)^?1. For H finite dimensional, results of Drinfeld and Radford express g in terms of the modular elements of H. This note supplies another proof which replaces the requirement of finite dimensionality with existence of a nonzero integral for H in H*. Similar results hold for the infinite dimensional coquasitriangular case; here we supply some interesting examples.     

Constructing Quasitriangular Multiplier Hopf Algebras By Twisted Tensor Coproducts

Let A and B be multiplier Hopf algebras, and let R ∈ M(B ? A) be an anti-copairing multiplier, i.e, the inverse of R is a skew-copairing multiplier in the sense of Delvaux [5 Delvaux , L. ( 2004 ). Twisted tensor coproduct of multiplier Hopf (*)-algebras . J. Algebra 274 : 751 – 771 . [Google Scholar]]. Then one can construct a twisted tensor coproduct multiplier Hopf algebra A ? _R  B. Using this, we establish the correspondence between the existence of quasitriangular structures in A ? _R  B and the existence of such structures in the factors A and B. We illustrate our theory with a profusion of examples which cannot be obtained by using classical Hopf algebras. Also, we study the class of minimal quasitriangular multiplier Hopf algebras and show that every minimal quasitriangular Hopf algebra is a quotient of a Drinfel’d double for some algebraic quantum group.     

Constructing New Quasitriangular Turaev Group Coalgebras

In this article, we construct a lot of new examples of Hopf group coalgebras by considering Majid's bicrossproduct Hopf algebra in Turaev category. Furthermore, we find the sufficient and necessary conditions for such Majid's bicrossproduct Hopf algebra to admit quasitriangular structures in the sense of Turaev group coalgebras.     

A Characterization of Quasitriangular Hopf Algebras

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.