Linearity, crystallographic quotients, and automorphisms of virtual Artin groups

Neeraj Kumar Dhanwani, Pravin Kumar, Tushar Kanta Naik, Mahender Singh
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Abstract

Virtual Artin groups were recently introduced by Bellingeri, Paris, and Thiel as broad generalizations of the well-known virtual braid groups. For each Coxeter graph $\Gamma$, they defined the virtual Artin group $VA[\Gamma]$, which is generated by the corresponding Artin group $A[\Gamma]$ and the Coxeter group $W[\Gamma]$, subject to certain mixed relations inspired by the action of $W[\Gamma]$ on its root system $\Phi[\Gamma]$. There is a natural surjection $ \mathrm{VA}[\Gamma] \rightarrow W[\Gamma]$, with the kernel $PVA[\Gamma]$ representing the pure virtual Artin group. In this paper, we explore linearity, crystallographic quotients, and automorphisms of certain classes of virtual Artin groups. Inspired from the work of Cohen, Wales, and Krammer, we construct a linear representation of the virtual Artin group $VA[\Gamma]$. As a consequence of this representation, we deduce that if $W[\Gamma]$ is a spherical Coxeter group, then $VA[\Gamma]/PVA[\Gamma]'$ is a crystallographic group of dimension $ |\Phi[\Gamma]|$ with the holonomy group $W[\Gamma]$. Further, extending an idea of Davis and Januszkiewicz, we prove that all right-angled virtual Artin groups admit a faithful linear representation. The remainder of the paper focuses on conjugacy classes and automorphisms of a subclass of right-angled virtual Artin groups, $VAT_n$, associated with planar braid groups called twin groups. We determine the automorphism group of $VAT_n$ for each $n\geq 5$, and give a precise description of a generic automorphism. As an application of this description, we prove that $VAT_n$ has the $R_\infty$-property for each $n \ge 2$.
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虚拟阿尔丁群的线性、晶商和自动形态
最近,贝林格里、帕里斯和蒂尔引入了虚拟阿汀群,作为著名虚拟辫子群的广义概括。对于每个柯克赛特图 $\Gamma$,他们定义了虚拟阿尔丁群 $VA[\Gamma]$,它由相应的阿尔丁群 $A[\Gamma]$ 和柯克赛特群 $W[\Gamma]$产生,并受限于由 $W[\Gamma]$ 在其根系统 $\Phi[\Gamma]$ 上的作用所启发的某些混合关系。有一个自然的投射 $\mathrm{VA}[\Gamma] \rightarrow W[\Gamma]$,其核 $PVA[\Gamma]$ 代表纯虚阿尔丁群。在本文中,我们探讨了某些类虚阿尔丁群的线性、晶体学商和自动形态。受科恩、威尔士和克拉默工作的启发,我们构建了虚阿尔丁群 $VA[\Gamma]$的线性表示。作为这个表示的结果,我们推导出如果 $W[\Gamma]$ 是非球面考克斯特群,那么 $VA[\Gamma]/PVA[\Gamma]'$ 是维数为 $ |\Phi[\Gamma]|$ 的晶体群,其全局群为 $W[\Gamma]$。此外,我们扩展了戴维斯和雅努兹凯维奇的一个观点,证明了全直角虚阿廷群允许一个忠实的线性表示。论文的其余部分集中于与被称为孪生群的planarbraid 群相关联的直角虚阿汀群的子类 $VAT_n$ 的共轭类和自形群。我们确定了每个 $n\geq 5$ 的 $VAT_n$ 的自形群,并给出了一般自形的精确描述。作为这一描述的应用,我们证明了 $VAT_n$ 对于每个 $n\ge 2$ 具有 $R_infty$ 性质。
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