Hybridization and postprocessing in finite element exterior calculus
Abstract
We hybridize the methods of finite element exterior calculus for the Hodge-Laplace problem on differential -forms in . In the cases and , we recover well-known primal and mixed hybrid methods for the scalar Poisson equation, while for , we obtain new hybrid finite element methods, including methods for the vector Poisson equation in and dimensions. We also generalize Stenberg postprocessing from to arbitrary , proving new superconvergence estimates. Finally, we discuss how this hybridization framework may be extended to include nonconforming and hybridizable discontinuous Galerkin methods.
Cite
@article{arxiv.2008.00149,
title = {Hybridization and postprocessing in finite element exterior calculus},
author = {Gerard Awanou and Maurice Fabien and Johnny Guzmán and Ari Stern},
journal= {arXiv preprint arXiv:2008.00149},
year = {2025}
}
Comments
30 pages; v2: major revisions to reduce length (cut review material from Section 2, eliminated Sections 3.4-3.5, fewer numerical experiments in Section 7), new results on trace norms (Lemma 2.3) and well-posedness (Theorem 3.4), and minor edits