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Nitsche's Method For Helmholtz Problems with Embedded Interfaces.

Publication ,  Journal Article
Zou, Z; Aquino, W; Harari, I
Published in: International journal for numerical methods in engineering
May 2017

In this work, we use Nitsche's formulation to weakly enforce kinematic constraints at an embedded interface in Helmholtz problems. Allowing embedded interfaces in a mesh provides significant ease for discretization, especially when material interfaces have complex geometries. We provide analytical results that establish the well-posedness of Helmholtz variational problems and convergence of the corresponding finite element discretizations when Nitsche's method is used to enforce kinematic constraints. As in the analysis of conventional Helmholtz problems, we show that the inf-sup constant remains positive provided that the Nitsche's stabilization parameter is judiciously chosen. We then apply our formulation to several 2D plane-wave examples that confirm our analytical findings. Doing so, we demonstrate the asymptotic convergence of the proposed method and show that numerical results are in accordance with the theoretical analysis.

Duke Scholars

Published In

International journal for numerical methods in engineering

DOI

EISSN

1097-0207

ISSN

0029-5981

Publication Date

May 2017

Volume

110

Issue

7

Start / End Page

618 / 636

Related Subject Headings

  • Applied Mathematics
  • 40 Engineering
  • 09 Engineering
 

Citation

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Zou, Z., Aquino, W., & Harari, I. (2017). Nitsche's Method For Helmholtz Problems with Embedded Interfaces. International Journal for Numerical Methods in Engineering, 110(7), 618–636. https://doi.org/10.1002/nme.5369
Zou, Zilong, Wilkins Aquino, and Isaac Harari. “Nitsche's Method For Helmholtz Problems with Embedded Interfaces.International Journal for Numerical Methods in Engineering 110, no. 7 (May 2017): 618–36. https://doi.org/10.1002/nme.5369.
Zou Z, Aquino W, Harari I. Nitsche's Method For Helmholtz Problems with Embedded Interfaces. International journal for numerical methods in engineering. 2017 May;110(7):618–36.
Zou, Zilong, et al. “Nitsche's Method For Helmholtz Problems with Embedded Interfaces.International Journal for Numerical Methods in Engineering, vol. 110, no. 7, May 2017, pp. 618–36. Epmc, doi:10.1002/nme.5369.
Zou Z, Aquino W, Harari I. Nitsche's Method For Helmholtz Problems with Embedded Interfaces. International journal for numerical methods in engineering. 2017 May;110(7):618–636.
Journal cover image

Published In

International journal for numerical methods in engineering

DOI

EISSN

1097-0207

ISSN

0029-5981

Publication Date

May 2017

Volume

110

Issue

7

Start / End Page

618 / 636

Related Subject Headings

  • Applied Mathematics
  • 40 Engineering
  • 09 Engineering