学术报告(朱星宇 2026.7.9)

Monotone quantities and positive scalar curvature

发布人:姚璐
主题
Monotone quantities and positive scalar curvature
活动时间
-
活动地址
新数学楼415
主讲人
朱星宇 访问助理教授(密歇根州立大学)
主持人
黄章开

摘要:Inspired by Colding–Minicozzi’s uniqueness theorem for asymptotic cones of Ricci-flat manifolds with Euclidean volume growth, obtained via monotone quantities, we construct analogous monotone quantities in the setting of linear volume growth. Using the average gradient estimate technique of Colding–Minicozzi and the level-set method of Munteanu–Wang, we show that these monotone quantities have applications to the topology of 3-manifolds with nonnegative scalar curvature under mild regularity assumptions. In particular, we prove that any contractible such manifold is diffeomorphic to R^3, and that any handlebody admitting such a metric must have genus at most one. In this talk, I will explain the motivation behind the construction of these monotone quantities and how they constrain the topology. This is joint work with Zetian Yan.