A modified $P_1$ - immersed finite element method
Abstract
In recent years, the immersed finite element methods (IFEM) introduced in \cite{Li2003}, \cite{Li2004} to solve elliptic problems having an interface in the domain due to the discontinuity of coefficients are getting more attentions of researchers because of their simplicity and efficiency. Unlike the conventional finite element methods, the IFEM allows the interface cut through the interior of the element, yet after the basis functions are altered so that they satisfy the flux jump conditions, it seems to show a reasonable order of convergence. In this paper, we propose an improved version of the based IFEM by adding the line integral of flux terms on each element. This technique resembles the discontinuous Galerkin (DG) method, however, our method has much less degrees of freedom than the DG methods since we use the same number of unknowns as the conventional finite element method. We prove and error estimates which are optimal both in order and regularity. Numerical experiments were carried out for several examples, which show the robustness of our scheme.
Cite
@article{arxiv.1408.4214,
title = {A modified $P_1$ - immersed finite element method},
author = {Do Y. Kwak and Juho Lee},
journal= {arXiv preprint arXiv:1408.4214},
year = {2015}
}
Comments
Some Figures were removed from original article due to errors occurred during the processing