Seminar on geometry analysis: Huber's theorem for manifolds with $L^\frac{n}{2}$ integrable Ricci curvatures
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:陈波(华南理工大学)
:2023-12-22 15:00
:海韵园实验楼105报告厅
报告人:陈波(华南理工大学)
时 间:2023年12月22日15:00
地 点:海韵园实验楼105报告厅
内容摘要:
Huber's finite points conformal compactification theorem states that a complete open surface, whose negative part of the Gauss curvature is integrable, is conformally equivalent to a closed surface with a finite number of points removed. In this talk, we will generalize this theorem to higher dimensional manifolds, which are conformally compact with $L^\frac{n}{2}$ integrable Ricci curvatures. This is a joint work with Prof. Yuxiang Li.
个人简介:
陈波,博士毕业于中国科学院数学研究所,现为华南理工大学数学学院副教授,其主要从事具有物理背景的Yang-Mills-Higgs场和薛定谔流的研究,相关研究成果发表在CMP, IMRN, Transactions of AMS, Pacific J. Math.等期刊上。
联系人:宋翀
