English

A stabilized $P_1$ immersed finite element method for the interface elasticity problems

Numerical Analysis 2015-06-23 v2

Abstract

We develop a new finite element method for solving planar elasticity problems involving of heterogeneous materials with a mesh not necessarily aligning with the interface of the materials. This method is based on the `broken' Crouzeix-Raviart P1P_1-nonconforming finite element method for elliptic interface problems \cite{Kwak-We-Ch}. To ensure the coercivity of the bilinear form arising from using the nonconforming finite elements, we add stabilizing terms as in the discontinuous Galerkin (DG) method \cite{Arnold-IP},\cite{Ar-B-Co-Ma},\cite{Wheeler}. The novelty of our method is that we use meshes independent of the interface, so that the interface may cut through the elements. Instead, we modify the basis functions so that they satisfy the Laplace-Young condition along the interface of each element. We prove optimal H1H^1 and divergence norm error estimates. Numerical experiments are carried out to demonstrate that the our method is optimal for various Lam\`e parameters μ\mu and λ\lambda and locking free as λ\lambda\to\infty.

Keywords

Cite

@article{arxiv.1408.4227,
  title  = {A stabilized $P_1$ immersed finite element method for the interface elasticity problems},
  author = {Do Y. Kwak and Sangwon Jin and Dae H. Kyeong},
  journal= {arXiv preprint arXiv:1408.4227},
  year   = {2015}
}

Comments

Submitted to M2an on May 18 2015. Added a new author (Dae H. Kyeong)

R2 v1 2026-06-22T05:32:59.894Z