Nonconforming finite element Stokes complexes in three dimensions
Abstract
Two nonconforming finite element Stokes complexes starting from the conforming Lagrange element and ending with the nonconforming - element for the Stokes equation in three dimensions are constructed. And commutative diagrams are also shown by combining nonconforming finite element Stokes complexes and interpolation operators. The lower order -nonconforming finite element only has degrees of freedom, whose basis functions are explicitly given in terms of the barycentric coordinates. The -nonconforming elements are applied to solve the quad-curl problem, and optimal convergence is derived. By the nonconforming finite element Stokes complexes, the mixed finite element methods of the quad-curl problem are decoupled into two mixed methods of the Maxwell equation and the nonconforming - element method for the Stokes equation, based on which a fast solver is discussed. Numerical results are provided to verify the theoretical convergence rates.
Cite
@article{arxiv.2007.14068,
title = {Nonconforming finite element Stokes complexes in three dimensions},
author = {Xuehai Huang},
journal= {arXiv preprint arXiv:2007.14068},
year = {2022}
}
Comments
26 pages. This paper has been accepted for publication in SCIENCE CHINA Mathematics