A posteriori error estimation for generalized finite element methods. Strouboulis, T., Zhang, L., Wang, D., & Babuška, I. Computer Methods in Applied Mechanics and Engineering, 195:852--879, 2006. Paper doi abstract bibtex In this paper we address the problem of a posteriori error estimation$\backslash$nfor generalized finite element methods based on the partition of$\backslash$nunity method. The computational results focus on the question of$\backslash$nthe reliability of the error estimators and its assessment
@article{ Strouboulis2006,
abstract = {In this paper we address the problem of a posteriori error estimation$\backslash$nfor generalized finite element methods based on the partition of$\backslash$nunity method. The computational results focus on the question of$\backslash$nthe reliability of the error estimators and its assessment},
author = {Strouboulis, Theofanis and Zhang, Lin and Wang, Delin and Babuška, Ivo},
doi = {10.1016/j.cma.2005.03.004},
issn = {00457825},
journal = {Computer Methods in Applied Mechanics and Engineering},
keywords = {Finite element method,Partition of unity,XFEM},
pages = {852--879},
title = {{A posteriori error estimation for generalized finite element methods}},
url = {http://dx.doi.org/10.1016/j.cma.2005.03.004},
volume = {195},
year = {2006}
}
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