Divergence-Conforming Velocity and Vorticity Approximations for Incompressible Fluids Obtained with Minimal Facet Coupling

Autor:	J. Gopalakrishnan, L. Kogler, P. L. Lederer, J. Schöberl
Rok vydání:	2023
Předmět:	Computational Mathematics Numerical Analysis Computational Theory and Mathematics Applied Mathematics FOS: Mathematics General Engineering Numerical Analysis (math.NA) Mathematics - Numerical Analysis Software Theoretical Computer Science
Zdroj:	Journal of Scientific Computing. 95
ISSN:	1573-7691 0885-7474
Popis:	We introduce two new lowest order methods, a mixed method, and a hybrid discontinuous Galerkin method, for the approximation of incompressible flows. Both methods use divergence-conforming linear Brezzi–Douglas–Marini space for approximating the velocity and the lowest order Raviart–Thomas space for approximating the vorticity. Our methods are based on the physically correct viscous stress tensor of the fluid, involving the symmetric gradient of velocity (rather than the gradient), provide exactly divergence-free discrete velocity solutions, and optimal error estimates that are also pressure robust. We explain how the methods are constructed using the minimal number of coupling degrees of freedom per facet. The stability analysis of both methods are based on a Korn-like inequality for vector finite elements with continuous normal component. Numerical examples illustrate the theoretical findings and offer comparisons of condition numbers between the two new methods.
Databáze:	OpenAIRE
Externí odkaz:	https://explore.openaire.eu/search/publication?articleId=doi_dedup___::64a012a1401a4b173a098c1a44a45fc7 https://doi.org/10.1007/s10915-023-02203-8 Zobrazit plný text záznamu Full text from SpringerLink