Improved error estimates of hybridizable interior penalty methods using a variable penalty for highly anisotropic diffusion problems
Abstract
In this paper, we derive improved a priori error estimates for families of hybridizable interior penalty discontinuous Galerkin (H-IP) methods using a variable penalty for second-order elliptic problems. The strategy is to use a penalization function of the form , where denotes the mesh size and is a user-dependent parameter. We then quantify its direct impact on the convergence analysis, namely, the (strong) consistency, discrete coercivity, and boundedness (with -dependency), and we derive updated error estimates for both discrete energy- and -norms. The originality of the error analysis relies specifically on the use of conforming interpolants of the exact solution. All theoretical results are supported by numerical evidence.
Cite
@article{arxiv.2007.04147,
title = {Improved error estimates of hybridizable interior penalty methods using a variable penalty for highly anisotropic diffusion problems},
author = {Gregory Etangsale and Marwan Fahs and Vincent Fontaine and Nalitiana Rajaonison},
journal= {arXiv preprint arXiv:2007.04147},
year = {2021}
}
Comments
11 pages, 7 figures, 1 table