题目:Stability and Morse Index of Capillary Surfaces in 3-Manifolds
报告人:洪寒 博士 (清华大学)
地点:腾讯会议室
时间:2021年10月26日 15:00-16:00
摘要:In this talk, we will discuss stability and index estimates for compact and noncompact capillary surfaces. A classical result in minimal surface theory says that a stable complete minimal surface in R^3 must be a plane. We show that, under certain curvature assumptions, a strongly stable capillary surface in a 3-manifold with boundary has only three possible topological configurations. In particular, we prove that a strongly stable capillary surface in a half-space of R^3 which is minimal or has the contact angle less than or equal to $\pi/2$ must be a half-plane. We also give index estimates for compact capillary surfaces in 3-manifolds by using harmonic one-forms.
This is joint work with Aiex and Saturnino.
腾讯会议://meeting.tencent.com/dm/cVdY0N8Kg21c
会议 ID:390 358 712
All are welcome!