铃木代数I上的有限维Nichols代数:的简单yeter - drinfeld模 $A_{N\,2n}^{\mu\lambda}$

Pub Date : 2020-11-29 DOI:10.36045/j.bbms.211101
Yuxing Shi
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引用次数: 2

摘要

Suzuki代数$A_{Nn}^{\mu \lambda}$是由Suzuki Satoshi在1998年提出的,它是一类半简单Hopf代数。它在一般意义上与群代数不是绝对的森田等价。本文给出了Suzuki代数$A_{N\,2n}^{\mu\lambda}$上的一组简单yeter - drinfeld模的完备集,并研究了这些简单yeter - drinfeld模上的Nichols代数。所涉及的对角线型有限维Nichols代数为Cartan型$A_1$、$A_1\times A_1$、$A_2$、$A_2\times A_2$、Super型${\bf A}_{2}(q;I_2)$和Nichols代数ufo(8)。在$A_{N\,2n}^{\mu \lambda}$上有$64$、$4m$和$m^2$维非对角线型尼克尔斯代数。$64$维尼科尔斯代数为二面体齿条型$\Bbb{D}_4$。首先由Andruskiewitsch和Giraldi发现的$4m$和$m^2$维Nichols代数$\mathfrak{B}(V_{abe})$可以在$A_{Nn}^{\mu \lambda}$上的yeter - drinfeld模的范畴中实现。利用Masuoka的结果,证明了$\dim\mathfrak{B}(V_{abe})=\infty$在$b^2=(ae)^{-1}$条件下,$b\in\Bbb{G}_{m}$对于$m\geq 5$。
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Finite-dimensional Nichols algebras over the Suzuki algebras I: simple Yetter-Drinfeld modules of $A_{N\,2n}^{\mu\lambda}$
The Suzuki algebra $A_{Nn}^{\mu \lambda}$ was introduced by Suzuki Satoshi in 1998, which is a class of cosemisimple Hopf algebras. It is not categorically Morita-equivalent to a group algebra in general. In this paper, the author gives a complete set of simple Yetter-Drinfeld modules over the Suzuki algebra $A_{N\,2n}^{\mu\lambda}$ and investigates the Nichols algebras over those simple Yetter-Drinfeld modules. The involved finite dimensional Nichols algebras of diagonal type are of Cartan type $A_1$, $A_1\times A_1$, $A_2$, $A_2\times A_2$, Super type ${\bf A}_{2}(q;I_2)$ and the Nichols algebra ufo(8). There are $64$, $4m$ and $m^2$-dimensional Nichols algebras of non-diagonal type over $A_{N\,2n}^{\mu \lambda}$. The $64$-dimensional Nichols algebras are of dihedral rack type $\Bbb{D}_4$. The $4m$ and $m^2$-dimensional Nichols algebras $\mathfrak{B}(V_{abe})$ discovered first by Andruskiewitsch and Giraldi can be realized in the category of Yetter-Drinfeld modules over $A_{Nn}^{\mu \lambda}$. By using a result of Masuoka, we prove that $\dim\mathfrak{B}(V_{abe})=\infty$ under the condition $b^2=(ae)^{-1}$, $b\in\Bbb{G}_{m}$ for $m\geq 5$.
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