A family of Kahler flying wing steady Ricci solitons-清华大学求真书院

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A family of Kahler flying wing steady Ricci solitons

来源： 11-04

时间：Tues., 21:00-22:00, Nov. 5, 2024

地点：Zoom Meeting ID: 271 534 5558 Passcode: YMSC

组织者：Jialong Deng, Akito Futaki

主讲人：Ronan Conlon

Differential Geometry Seminar

Organizers：

Jialong Deng, Akito Futaki

Speaker：

Ronan Conlon (University of Texas at Dallas)

Time：

Tues., 21:00-22:00, Nov. 5, 2024

Online：

Zoom Meeting ID: 271 534 5558

Passcode: YMSC

Title：

A family of Kahler flying wing steady Ricci solitons

Abstract：

Steady Kahler-Ricci solitons are eternal solutions of the Kahler-Ricci flow. I will present new examples of such solitons with strictly positive sectional curvature that live on C^n and provide an answer to an open question of H.-D. Cao in complex dimension n>2. This is joint work with Pak-Yeung Chan and Yi Lai.

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Ricci flow and Hamilton's flying wing Conjecture
Yi Lai 赖仪Stanford UniversityYi Lai is currently a Szego assistant professor at Stanford University. She obtained her bachelor's degree from Peking University in 2016. She obtained her P.h.D from UC Berkeley in 2021 under the supervision of Richard Bamler. Her research focuses on geometric analysis and Ricci flow.AbstractRicci flow is an important tool in geometric analysis. There have been re...
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Construction of nearly Kahler manifolds by Foscolo and Haskins
AbstractA Riemannian 6-manifold is called nearly Kahler if its Riemannian cone has holonomy contained in G2. Only known examples were some homogeneous spaces for a long time, but Foscolo and Haskins constructed new cohomogeneity one nearly Kahler manifolds in 2017. I will explain an outline of the construction
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书院学术

A family of Kahler flying wing steady Ricci solitons

Ricci flow and Hamilton's flying wing Conjecture

Construction of nearly Kahler manifolds by Foscolo and Haskins

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