Journal of Scientific Computing

, Volume 75, Issue 2, pp 657–686 | Cite as

Conservative and Stable Degree Preserving SBP Operators for Non-conforming Meshes

  • Lucas Friedrich
  • David C. Del Rey Fernández
  • Andrew R. Winters
  • Gregor J. Gassner
  • David W. Zingg
  • Jason Hicken
Article

Abstract

Non-conforming numerical approximations offer increased flexibility for applications that require high resolution in a localized area of the computational domain or near complex geometries. Two key properties for non-conforming methods to be applicable to real world applications are conservation and energy stability. The summation-by-parts (SBP) property, which certain finite-difference and discontinuous Galerkin methods have, finds success for the numerical approximation of hyperbolic conservation laws, because the proofs of energy stability and conservation can discretely mimic the continuous analysis of partial differential equations. In addition, SBP methods can be developed with high-order accuracy, which is useful for simulations that contain multiple spatial and temporal scales. However, existing non-conforming SBP schemes result in a reduction of the overall degree of the scheme, which leads to a reduction in the order of the solution error. This loss of degree is due to the particular interface coupling through a simultaneous-approximation-term (SAT). We present in this work a novel class of SBP–SAT operators that maintain conservation, energy stability, and have no loss of the degree of the scheme for non-conforming approximations. The new degree preserving discretizations require an ansatz that the norm matrix of the SBP operator is of a degree \(\ge 2p\), in contrast to, for example, existing finite difference SBP operators, where the norm matrix is \(2p-1\) accurate. We demonstrate the fundamental properties of the new scheme with rigorous mathematical analysis as well as numerical verification.

Keywords

First derivative Summation-by-parts Simultaneous-approximation-term Conservation Energy stability Finite difference methods Non-conforming methods Intermediate grids 

Notes

Acknowledgements

The work of Lucas Friedrich, Andrew Winters and Gregor Gassner was funded by the Deutsche Forschungsgemeinschaft (DFG) Grant TA 2160/1-1. The work of Jason Hicken was partially funded by the Air Force Office of Scientific Research Award FA9550-15-1-0242 under Dr. Jean-Luc Cambier. This work was partially performed on the Cologne High Efficiency Operating Platform for Sciences (CHEOPS) at the Regionales Rechenzentrum Köln (RRZK).

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Copyright information

© Springer Science+Business Media, LLC 2017

Authors and Affiliations

  • Lucas Friedrich
    • 1
  • David C. Del Rey Fernández
    • 2
  • Andrew R. Winters
    • 1
  • Gregor J. Gassner
    • 1
  • David W. Zingg
    • 2
  • Jason Hicken
    • 3
  1. 1.Mathematical InstituteUniversity of CologneCologneGermany
  2. 2.Institute for Aerospace StudiesUniversity of TorontoTorontoCanada
  3. 3.Department of Mechanical, Aerospace, and Nuclear EngineeringRensselaer Polytechnic InstituteTroyUSA

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