Five Trends in the Mathematical Foundation of Computational PDEs
主 题: Five Trends in the Mathematical Foundation of Computational PDEs
报告人: Prof. Carsten Carstensen (Humboldt University of Berlin, Germany)
时 间: 2013-08-29 17:00-18:00
地 点: welcome欢迎光临威尼斯公司理科一号楼 1418
Abstract: This presentation concerns five topics in computational partial differential equations with the overall goals of reliable error control and efficient simulation.
The presentation is also an advertisement for nonstandard discretizations in linear and nonlinear Computational PDEs with surprising advantages over conforming finite element schemes and the combination of the two. The equivalence of various first-order methods is explained for the linear Poisson model problem with conforming (CFEM), nonconforming (NC-FEM), and mixed finite element methods (MFEM) and others discontinuous Galerkin finite element (dGFEM).
The Stokes equations illustrate the NCFEM and the pseudo-stress MFEM and optimal convergence of adaptive mesh-refining as well as for guaranteed error bounds. An optimal adaptive CFEM computation of elliptic eigenvalue problems and the computation of guaranteed upper and lower eigenvalue bounds based on NCFEM. The obstacle problem and its guaranteed error control follows another look due to D. Braess with guaranteed error bounds and their effectivity indices between 1 and 3. Some remarks on computational microstructures with degenerate convex minimization problems conclude the presentation.