In this paper, we discuss a new stabilized Lagrange multiplier method for finite element solution of multi-domain elliptic and parabolic initial-boundary value problems with non-matching grid across the subdomain interfaces. The proposed method is consistent with the original problem and its stability is established without using the inf-sup (well known as LBB) condition. In the first part of this article, optimal error estimates are derived for second order elliptic interface problems. Then, the analysis is extended to parabolic initial and boundary value problems with interface and optimal error estimates are established for both semi-discrete and completely discrete schemes. The results of numerical experiments support the theoretical results obtained in this article.
%0 Journal Article
%1 patel2017stabilized
%A Patel, Ajit
%A Acharya, Sanjib Kumar
%A Pani, Amiya Kumar
%D 2017
%J Applied Numerical Mathematics
%K 35j25-bvps-2nd-order-elliptic-equations 65m12-pdes-ivps-stability-and-convergence-of-numerical-methods 65m15-pdes-ivps-error-bounds 65m20-pdes-ivps-method-of-lines 65m60-pdes-ibvps-finite-elements 65n12-pdes-bvps-stability-and-convergence-of-numerical-methods 65n15-pdes-bvps-error-bounds 65n30-pdes-bvps-finite-elements
%P 287-304
%R 10.1016/j.apnum.2017.05.011
%T Stabilized Lagrange multiplier method for elliptic and parabolic interface problems
%U https://www.sciencedirect.com/science/article/pii/S0168927417301356
%V 120
%X In this paper, we discuss a new stabilized Lagrange multiplier method for finite element solution of multi-domain elliptic and parabolic initial-boundary value problems with non-matching grid across the subdomain interfaces. The proposed method is consistent with the original problem and its stability is established without using the inf-sup (well known as LBB) condition. In the first part of this article, optimal error estimates are derived for second order elliptic interface problems. Then, the analysis is extended to parabolic initial and boundary value problems with interface and optimal error estimates are established for both semi-discrete and completely discrete schemes. The results of numerical experiments support the theoretical results obtained in this article.
@article{patel2017stabilized,
abstract = {In this paper, we discuss a new stabilized Lagrange multiplier method for finite element solution of multi-domain elliptic and parabolic initial-boundary value problems with non-matching grid across the subdomain interfaces. The proposed method is consistent with the original problem and its stability is established without using the inf-sup (well known as LBB) condition. In the first part of this article, optimal error estimates are derived for second order elliptic interface problems. Then, the analysis is extended to parabolic initial and boundary value problems with interface and optimal error estimates are established for both semi-discrete and completely discrete schemes. The results of numerical experiments support the theoretical results obtained in this article.},
added-at = {2021-12-28T21:40:56.000+0100},
author = {Patel, Ajit and Acharya, Sanjib Kumar and Pani, Amiya Kumar},
biburl = {https://www.bibsonomy.org/bibtex/2b1777a321893c4eedf47703cb914693d/gdmcbain},
doi = {10.1016/j.apnum.2017.05.011},
interhash = {8c831d08f8f9109068c7432e05316a20},
intrahash = {b1777a321893c4eedf47703cb914693d},
issn = {0168-9274},
journal = {Applied Numerical Mathematics},
keywords = {35j25-bvps-2nd-order-elliptic-equations 65m12-pdes-ivps-stability-and-convergence-of-numerical-methods 65m15-pdes-ivps-error-bounds 65m20-pdes-ivps-method-of-lines 65m60-pdes-ibvps-finite-elements 65n12-pdes-bvps-stability-and-convergence-of-numerical-methods 65n15-pdes-bvps-error-bounds 65n30-pdes-bvps-finite-elements},
pages = {287-304},
timestamp = {2021-12-28T21:40:56.000+0100},
title = {Stabilized Lagrange multiplier method for elliptic and parabolic interface problems},
url = {https://www.sciencedirect.com/science/article/pii/S0168927417301356},
volume = 120,
year = 2017
}