Seminarreihe "structure preserving numerical methods for hyperbolic equations" im Oberseminar Mathematische Strömungsmechanik: Matthias Maier
Efficient parallel 3D computation of the compressible Euler equations with an invariant-domain preserving second-order finite-element scheme
|Datum:||28.05.2021, 15:00 - 16:00 Uhr|
This talk is part of the seminar series "structure preserving numerical methods for hyperbolic equations", click here for more details
A high-performance second-order collocation-type finite-element scheme for solving the compressible NavierStokes equations on unstructured meshes is presented. The method uses Strang splitting, is second-order accurate in time and space, and is based on a convex limiting technique introduced by Guermond et al. (SIAM J. Sci. Comput. 40, A3211-A3239, 2018). As such it is invariant-domain preserving, meaning, the solver maintains important physical invariants and is guaranteed to be stable without the use of ad-hoc tuning parameters.
In this talk I will introduce the discretization technique, discuss the convex limiting approach and algorithmic design of the method, and comment on a high-performance implementation utilizing SIMD (single instruction multiple data) vectorization.
via Zoom video conference (request the Zoom link from firstname.lastname@example.org)