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A locally modified second-order finite element method for interface problems | | Stefan Frei
; Gozel Judakova
; Thomas Richter
; | | Date: |
28 Jul 2020 | | Abstract: | The locally modified finite element method, which is introduced in [Frei,
Richter: SINUM 52(2014), p. 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 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 $L^2$-norm and in a modified energy norm, as
well as a reduced convergence order of ${cal O}(h^{3/2})$ in the standard
$H^1$-norm. Finally, we present numerical examples to substantiate the
theoretical findings. | | Source: | arXiv, 2007.13906 | | Services: | Forum | Review | PDF | Favorites | |
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