二次代数和幂幂辫集

Tatiana Gateva-Ivanova, Shahn Majid
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摘要

我们研究了与辫子关系的有限集理论解 $(X,r)$ 相关的杨-巴克斯特代数 $A(K,X,r)$。我们引入了一个等价的二次关系集合 $Re\subseteq G$,其中$G$是$(\Re)$的Gr\"obner基。我们证明,如果$(X,r)$是左非enerate和幂等的,那么$\Re= G$和Yang-Baxter代数是PBW。我们用图形方法研究了在 $n$ 生成情况下 PBW 代数的全维,并将其应用于左非enerate idempotent 情况下的 Yang-Baxter 代数。我们研究了一类二次代数的 $d$-Veronese 子代数,并以此证明对于 $(X,r)$ 左非enerate idempotent,$d$-Veronese 子代数 $A(K,X,r)^{(d)}$ 可以与 $A(K,X,r^{(d)})$相鉴别,其中 $(X,r^{(d)})$ 是所有左非enerate idempotent 解。我们确定了左非整立幂等解中的塞格雷积。我们的结果适用于之前研究过的一类 "迭代empotent "解,我们证明了它们在给定的$X$心数下的所有杨-巴克斯特代数都是同构的,并且与它们的$d$-Veronese子代数同构。在线性化设置中,我们构建了杨-巴克斯特代数的科斯祖尔对偶和幂等情况下的尼科尔斯-沃罗诺维奇代数,并证明后者是二次的。我们还在其中一些二次方程组上构建了非交换微分。
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Quadratic algebras and idempotent braided sets
We study the Yang-Baxter algebras $A(K,X,r)$ associated to finite set-theoretic solutions $(X,r)$ of the braid relations. We introduce an equivalent set of quadratic relations $\Re\subseteq G$, where $G$ is the reduced Gr\"obner basis of $(\Re)$. We show that if $(X,r)$ is left-nondegenerate and idempotent then $\Re= G$ and the Yang-Baxter algebra is PBW. We use graphical methods to study the global dimension of PBW algebras in the $n$-generated case and apply this to Yang-Baxter algebras in the left-nondegenerate idempotent case. We study the $d$-Veronese subalgebras for a class of quadratic algebras and use this to show that for $(X,r)$ left-nondegenerate idempotent, the $d$-Veronese subalgebra $A(K,X,r)^{(d)}$ can be identified with $A(K,X,r^{(d)})$, where $(X,r^{(d)})$ are all left-nondegenerate idempotent solutions. We determined the Segre product in the left-nondegenerate idempotent setting. Our results apply to a previously studied class of `permutation idempotent' solutions, where we show that all their Yang-Baxter algebras for a given cardinality of $X$ are isomorphic and are isomorphic to their $d$-Veronese subalgebras. In the linearised setting, we construct the Koszul dual of the Yang-Baxter algebra and the Nichols-Woronowicz algebra in the idempotent case, showing that the latter is quadratic. We also construct noncommutative differentials on some of these quadratic algebras.
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