报告人 ：王宇辰

报告时间：12月19日14:30-16:30

报告地点：数学院南研教室

工作单位：华中师范大学

报告摘要：

In this talk, we will consider the existence and uniqueness of steady concentrated vorticities of the 2-D incompressible Euler equation on smooth bounded domains and study their stability. Given steady non degenerate point vortices configurations, we construct such steady piece wisely constant vortex flows and study their linear stability. Steady concentrated Lipschitz continuous vorticities are also been considered. Both of them are highly concentrated near the given steady vortex points. This talk is mainly based on a joint work with Prof. Yiming Long and Prof. Chongchun Zeng.

报告人简介：

王宇辰，2019年毕业于南开大学陈省身数学研究所，获博士学位，现为华中师范大学mk体育官网博士后，主要研究方向为非线性分析与动力系统。