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【陕西国家应用数学中心】“偏微分方程与深度学习及工业应用”系列报告(四)通知
发布时间 : 2021-06-02     点击量:

报告题目:Primal-Dual Weak Galerkin (PDWG) Methods for Partial Differential Equations


报告时间:2021年6月14日,星期一,上午9:00-11:00


腾讯会议ID:551 896 172


报告人:Chunmei Wang,Texas Tech University


报告摘要: 

The essential idea of PDWG is to interpret the numerical solutions as a constrained minimization of some functionals with constraints that mimic the weak formulation of the PDEs by using weak derivatives. The resulting Euler-Lagrange formulation results in a symmetric scheme involving both the primal variable and the dual variable (Lagrangian multiplier). PDWG method is applicable to several challenging problems for which existing methods may have difficulty in applying; these problems include the second order elliptic equations in nondivergence form, Fokker-Planck equation, elliptic Cauchy problems, div-curl systems, etc. An abstract framework for PDWG will be presented and discussed for its potential in other scientific applications.



报告人简介:

Chunmei Wang has been an assistant professor in the Department of Mathematics & Statistics at Texas Tech University since 2018. Prior to that, she was an assistant professor at Texas State University from 2016 to 2018, and a visiting assistant professor at Georgia Tech from 2014 to 2016. She received a B.Sc. at Soochow University in 2004, an M.Sc. at Soochow University in 2007, and a Ph.D. at Nanjing Normal University in 2014. Her research focuses on applied and computational mathematics with a focus on weak Galerkin finite element methods.


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