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Analysis of the SBP-SAT stabilization for finite element methods part I: Linear problems

Abgrall, Rémi; Nordström, Jan; Öffner, Philipp; Tokareva, Svetlana (2020). Analysis of the SBP-SAT stabilization for finite element methods part I: Linear problems. Journal of Scientific Computing, 85(2):43.

Abstract

In the hyperbolic community, discontinuous Galerkin (DG) approaches are mainly applied when finite element methods are considered. As the name suggested, the DG framework allows a discontinuity at the element interfaces, which seems for many researchers a favorable property in case of hyperbolic balance laws. On the contrary, continuous Galerkin methods appear to be unsuitable for hyperbolic problems and there exists still the perception that continuous Galerkin methods are notoriously unstable. To remedy this issue, stabilization terms are usually added and various formulations can be found in the literature. However, this perception is not true and the stabilization terms are unnecessary, in general. In this paper, we deal with this problem, but present a different approach. We use the boundary conditions to stabilize the scheme following a procedure that are frequently used in the finite difference community. Here, the main idea is to impose the boundary conditions weakly and specific boundary operators are constructed such that they guarantee stability. This approach has already been used in the discontinuous Galerkin framework, but here we apply it with a continuous Galerkin scheme. No internal dissipation is needed even if unstructured grids are used. Further, we point out that we do not need exact integration, it suffices if the quadrature rule and the norm in the differential operator are the same, such that the summation-by-parts property is fulfilled meaning that a discrete Gauss Theorem is valid. This contradicts the perception in the hyperbolic community that stability issues for pure Galerkin scheme exist. In numerical simulations, we verify our theoretical analysis.

Additional indexing

Item Type:Journal Article, refereed, original work
Communities & Collections:07 Faculty of Science > Institute of Mathematics
Dewey Decimal Classification:340 Law
610 Medicine & health
510 Mathematics
Scopus Subject Areas:Physical Sciences > Software
Physical Sciences > Theoretical Computer Science
Physical Sciences > Numerical Analysis
Physical Sciences > General Engineering
Physical Sciences > Computational Theory and Mathematics
Physical Sciences > Computational Mathematics
Physical Sciences > Applied Mathematics
Uncontrolled Keywords:Theoretical Computer Science, General Engineering, Computational Theory and Mathematics, Software
Language:English
Date:1 November 2020
Deposited On:15 Dec 2020 09:37
Last Modified:24 Dec 2024 02:38
Publisher:Springer
ISSN:0885-7474
OA Status:Hybrid
Publisher DOI:https://doi.org/10.1007/s10915-020-01349-z
Project Information:
  • Funder: SNSF
  • Grant ID: 200021_153604
  • Project Title: High fidelity simulation for compressible material
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  • Content: Published Version
  • Language: English
  • Licence: Creative Commons: Attribution 4.0 International (CC BY 4.0)

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