Abstract:
Conformally invariant equations in n\geq3 have played an important role in the study of \sigma_k-Yamabe problem in geometric analysis. In this talk, we will discuss a class of Mobius invariant equations in dimension two and then present a Liouville type theorem for such equations. We will then discuss the \sigma_2-Nirenberg problem on \mathbb{S}^2. This is based on joint works with Yanyan Li and Han Lu.
Speaker:
Siyuan Lu
Dr. Siyuan Lu is currently an Assistant Professor at McMaster University. He obtained his Ph. D degree under the supervison of Prof. Pengfei Guan at McGill University in 2017. His research interests lie in geometric analysis, partial differential equations, general relativity and geometric flows.
Zoom:
https://us02web.zoom.us/j/89000545464?pwd=Mk9lWnJjaGFlcHAzOXYwdjF3TVIvUT09
ID: 890 0054 5464
Passwords: 627492