Mapping LSE method on a grid: Software architecture and Performance gains

Nov 4, 2020·
Christophe Picard
,
Marc Garbey
,
Venkat Subramaniam
· 0 min read
Abstract
Publisher Summary The chapter explores how least square extrapolation (LSE) can perform on a commercial code, without having any knowledge on the source code. It emphasizes this approach by using a basic network of workstation to compute the weighted solutions and then solves the minimization problem over the produce results. In computational fluid dynamics (CFD), a Posteriori error estimators are widely produced using Richardson extrapolation (RE) and variations of it. All these methods rely on the a priori existence of an asymptotic expansion of the error—such as a Taylor formula—and make no direct use of the PDE formulation. As a consequence, RE methods are extremely simple to implement. But in practice, meshes might not be fine enough to satisfy accurately the a priori convergence estimates that are asymptotic in nature. RE is unreliable or fairly unstable and sensitive to noisy data.
Type
Publication
Parallel Computational Fluid Dynamics 2005