学术动态
当前位置: 首页 > 学术动态 > 正文
以色列耶路撒冷希伯来大学爱因斯坦数学研究所Matania Ben-Artzi教授学术报告
发布时间 : 2016-10-28     点击量:

        应云顶国际4008服务平台的邀请,以色列耶路撒冷希伯来大学爱因斯坦数学研究所Matania Ben-Artzi教授将于近期对我院进行学术访问。来访期间他将为师生做以下学术报告:

        题目:Hermitian derivatives, spline functions and the discrete biharmonic operator
        时间:11月1日上午9:10 - 10:10
        地点:理科楼407

        摘要: The strong connection between cubic spine functions (on an interval) and the biharmonic operator is studied. It is shown in particular that the (scaled) fourth-order distributional derivative of the cubic spline is identical to the compact discrete biharmonic operator. The latter is constructed in terms of the discrete Hermitian derivative. There is no maximum principle for the fourth-order equation. However, a positivity result is derived, both for the continuous and the discrete biharmonic equation. A remarkable fact is that the kernel of the discrete operator is (up to scaling) equal to the grid evaluation of the continuous kernel. Explicit expressions are presented for both kernels. The relation between the (infinite) set of eigenvalues of the fourth-order Sturm-Liouville problem and the finite set of eigenvalues of the discrete biharmonic operator is studied. It is well known that in general eigenvalues of finite-dimensional approximating operators do not converge to the eigenvalues of the full operator. However, we show that here it is true.

        报告人简介:Matania Ben-Artzi is a Professor at the Einstein Institute of Mathematics, Hebrew University of Jerusalem, Israel. He has held visiting positions in various universities and research institutes in Sweden, USA, Brazil, Italy, France, Canada, England, and China. His primal research interests include: Spectral and Scattering Theory of Linear Operators, Navier-Stokes equations, Hamilton-Jacobi equations, Nonlinear Hyperbolic Conservation Laws, and Computational Fluid Dynamics. Professor Ben-Artzi has published 3 books and around 100 research articles. 

        欢迎感兴趣的师生参加! 

 

陕西省西安市碑林区咸宁西路28号     云顶国际4008服务平台 - 云顶国际4008优惠申请 版权所有

邮编:710049     电话 :86-29-82668551     传真:86-29-82668551