Rigidity of steady incompressible Euler flows with stagnation points and its applications
数学专题报告
报告题目(Title):Rigidity of steady incompressible Euler flows with stagnation points and its applications
报告人(Speaker):谢春景 教授(上海交通大学)
地点(Place):后主楼1124
时间(Time):2023年12月31日14:30-15:20
邀请人(Inviter):许孝精
报告摘要
Stagnation of flows is an interesting phenomenon in fluid mechanics. It induces many challenging problems in analysis. We first derive a Liouville type theorem for Poiseuille flows in the class of incompressible steady inviscid flows in an infinitely long strip, where the flows can have stagnation points. With the aid of this Liouville type theorem, we show the uniqueness of solutions with positive horizontal velocity for steady Euler system in a general nozzle when the flows tend to the horizontal velocity of Poiseuille flows at the upstream. Furthermore, this kind of flows are proved to exist in a large class of nozzles and we also prove the optimal regularity of boundary for the set of stagnation points. Finally, we give a classification of incompressible Euler flows via the set of flow angles.
