论文标题
与不是锥形的图形相关的ARTIN组的酰基轴承双曲线
Acylindrical hyperbolicity of Artin groups associated with graphs that are not cones
论文作者
论文摘要
Charney和Morris-Wright通过研究Clique-Cube复合物及其对它们的作用,显示出与不连接的图形相关的无限类型的Artin群体的酰基神经性双波纹性。在本文中,通过制定他们的研究并进行了一些其他讨论,我们证明了酰基辅助双曲线对更一般的Artin组成立。实际上,我们能够处理与不是锥形的图形相关的无限类型的Artin组。
Charney and Morris-Wright showed acylindrical hyperbolicity of Artin groups of infinite type associated with graphs that are not joins, by studying clique-cube complexes and actions on them. In this paper, by developing their study and formulating some additional discussion, we demonstrate that acylindrical hyperbolicity holds for more general Artin groups. Indeed, we are able to treat Artin groups of infinite type associated with graphs that are not cones.
