报告人： Prof. Chi-Wang SHU ( Division of Applied Mathematics, Brown University. Providence, RI 02912, USA)

Title: Bound-preserving high order schemes for hyperbolic equations: survey and recent developments

Abstract: Solutions to many hyperbolic equations have convex invariant regions, for example solutions to scalar conservation laws satisfy maximum principle, solutions to compressible Euler equations satisfy positivity-preserving property for density and internal energy, etc.  It is however a challenge to design schemes whose solutions also honor such invariant regions.  This is especially the case for high order accurate schemes.  In this talk we will

first survey strategies in the literature to design high order bound-preserving schemes, including the general framework in constructing high order bound-preserving finite volume and discontinuous Galerkin schemes for scalar and systems of hyperbolic equations through a simple scaling limiter and a convex combination argument based on first order bound-preserving building blocks, and various flux limiters to design high order bound-preserving finite difference schemes.  We will then discuss a few recent developments, including high order bound-preserving schemes for relativistic hydrodynamics, high order discontinuous Galerkin Lagrangian schemes, and high order discontinuous Galerkin methods for radiative transfer equations.  Numerical tests demonstrating the good performance of these schemes will be reported.

时间：8月22号上午9:30-10:30

地点：知新楼B座1044报告厅