@Article{CiCP-5-2-4, author = {}, title = {Bilinear Forms for the Recovery-Based Discontinuous Galerkin Method for Diffusion}, journal = {Communications in Computational Physics}, year = {2009}, volume = {5}, number = {2-4}, pages = {683--693}, abstract = {
The present paper introduces bilinear forms that are equivalent to the recovery-based discontinuous Galerkin formulation introduced by Van Leer in 2005. The recovery method approximates the solution of the diffusion equation in a discontinuous function space, while inter-element coupling is achieved by a local L2 projection that recovers a smooth continuous function underlying the discontinuous approximation. Here we introduce the concept of a local “recovery polynomial basis” – smooth polynomials that are in the weak sense indistinguishable from the discontinuous basis polynomials – and show it allows us to eliminate the recovery procedure. The recovery method reproduces the symmetric discontinuous Galerkin formulation with additional penalty-like terms depending on the targeted accuracy of the method. We present the unique link between the recovery method and discontinuous Galerkin bilinear forms.
}, issn = {1991-7120}, doi = {https://doi.org/2009-CiCP-7757}, url = {https://global-sci.com/article/81109/bilinear-forms-for-the-recovery-based-discontinuous-galerkin-method-for-diffusion} }