Hybridized Summation-By-Parts Finite Difference Methods

We present a hybridization technique for summation-by-parts finite difference methods with weak enforcement of interface and boundary conditions for second order, linear elliptic partial differential equations. The method is based on techniques from the hybridized discontinuous Galerkin literature w...

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Bibliographic Details
Published inarXiv.org
Main Authors Kozdon, Jeremy E, Erickson, Brittany A, Wilcox, Lucas C
Format Paper Journal Article
LanguageEnglish
Published Ithaca Cornell University Library, arXiv.org 01.06.2021
Subjects
Boundary conditions
Computer Science - Numerical Analysis
Elliptic functions
Finite difference method
Galerkin method
Linear systems
Mathematical analysis
Mathematics - Numerical Analysis
Partial differential equations
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Summary:We present a hybridization technique for summation-by-parts finite difference methods with weak enforcement of interface and boundary conditions for second order, linear elliptic partial differential equations. The method is based on techniques from the hybridized discontinuous Galerkin literature where local and global problems are defined for the volume and trace grid points, respectively. By using a Schur complement technique the volume points can be eliminated, which drastically reduces the system size. We derive both the local and global problems, and show that the linear systems that must be solved are symmetric positive definite. The theoretical stability results are confirmed with numerical experiments as is the accuracy of the method.
ISSN:2331-8422
DOI:10.48550/arxiv.2002.00116