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A locally modified second-order finite element method for interface problems and its implementation in 2 dimensions

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2023

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Judakova, Gozel
Richter, Thomas

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Mathematical Modelling and Numerical Analysis (ESAIM-M2AN). EDP Sciences. 2023, 57(3), pp. 1355-1380. ISSN 2822-7840. eISSN 2804-7214. Available under: doi: 10.1051/m2an/2023022

Zusammenfassung

The locally modified finite element method, which is introduced in Frei and Richter [SIAM J. Numer. Anal. 52 (2014) 2315–2334], is a simple fitted finite element method that is able to resolve weak discontinuities in interface problems. The method is based on a fixed structured coarse mesh, which is then refined into sub-elements to resolve an interior interface. In this work, we extend the locally modified finite element method in two space dimensions to second order using an isoparametric approach in the interface elements. Thereby we need to take care that the resulting curved edges do not lead to degenerate sub-elements. We prove optimal a priori error estimates in the L2-norm and in a discrete energy norm. Finally, we present numerical examples to substantiate the theoretical findings.

Zusammenfassung in einer weiteren Sprache

Fachgebiet (DDC)
510 Mathematik

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Fitted finite elements, interface problem, a priori error estimates, weak discontinuities

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ISO 690FREI, Stefan, Gozel JUDAKOVA, Thomas RICHTER, 2023. A locally modified second-order finite element method for interface problems and its implementation in 2 dimensions. In: Mathematical Modelling and Numerical Analysis (ESAIM-M2AN). EDP Sciences. 2023, 57(3), pp. 1355-1380. ISSN 2822-7840. eISSN 2804-7214. Available under: doi: 10.1051/m2an/2023022
BibTex
@article{Frei2023local-67151,
  year={2023},
  doi={10.1051/m2an/2023022},
  title={A locally modified second-order finite element method for interface problems and its implementation in 2 dimensions},
  number={3},
  volume={57},
  issn={2822-7840},
  journal={Mathematical Modelling and Numerical Analysis (ESAIM-M2AN)},
  pages={1355--1380},
  author={Frei, Stefan and Judakova, Gozel and Richter, Thomas}
}
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