The K(pi,1)-conjecture for Artin groups via combinatorial non-positive curvature-88看球-八八看球

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The K(pi,1)-conjecture for Artin groups via combinatorial non-positive curvature

来源： 06-19

时间：Thursday,10:00-11:00 am June 20, 2024

地点：C546, Shuangqing Complex Building A 清华大学双清综合楼A座C546

组织者：邱宇

主讲人：Jingyin Huang 黄靖尹 The Ohio State University

Abstract：

The K(pi,1)-conjecture for reflection arrangement complements, due to Arnold, Brieskorn, Pham, and Thom, predicts that certain complexified hyperplane complements associated to infinite reflection groups are Eilenberg MacLane spaces. We establish a close connection between a very simple property in metric graph theory about 4-cycles and the K(pi,1)-conjecture, via elements of non-positively curvature geometry. We also propose a new approach for studying the K(pi,1)-conjecture. As a consequence, we deduce a large number of new cases of Artin groups which satisfies the K(pi,1)-conjecture.

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