题目:Superconvergence analysis of edge Elements with applications to Maxwell's Equations 时间:2019年11月08日(周五)16:00-17:00 地点:立志楼A422 主办:数学与计算科学学院 摘要: Since early 1970s, the superconvergence study of finite element methods has been a very active research topic due to its applications in leading to more efficient numerical methods for solving various differential equations. Many excellent superconvergence results have been obtained for elliptic equations, parabolic equations and linear hyperbolic equations. For Maxwell's equations, the first superconvergence result was derived until 1994. Since then, some results have been obtained. But there are many unsolved problems. In this talk, I'll present our recent breakthrough results obtained for rectangular (and cubic) edge elements from the first order to third order, and lowest order triangular and tetrahedron edge element. Theoretical analysis and numerical results will be presented. I will conclude the talk with some open issues. 报告人简介: 李继春,博士毕业于美国佛洛里达州大学,现为美国内华达拉斯维加斯大学教授、应用数学与统计中心主任,2009年获得美国内华达州拉斯维加斯大学最高科研奖:巴里克学者奖。2011年获得理学院杰出研究员奖。主要研究方向为有限元方法、无网格方法、图像处理、反问题等,在SIAM Journal on Numerical Analysis、SIAM J SCI COMPUT、SIAM Journal on Applied Mathematics, Mathematics of Computation、Numerisch Mathematik等国际权威期刊上发表超过100篇学术论文, 出版4本学术专著,主持(含完成)美国国家自然科学基金在内的各类项目20余项;20多次在国际会议上作邀请报告或特邀报告,包括大会报告。
