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Crouzeix-Raviart triangular elements are inf-sup stable

Carstensen, Carsten; Sauter, Stefan (2022). Crouzeix-Raviart triangular elements are inf-sup stable. Mathematics of Computation, 91(337):2041-2057.

Abstract

The Crouzeix-Raviart triangular finite elements are inf-sup stable for the Stokes equations for any mesh with at least one interior vertex. This result affirms a conjecture of Crouzeix-Falk from 1989 for p = 3. Our proof applies to any odd degree p >= 3 and concludes the overall stability analysis: Crouzeix-Raviart triangular finite elements of degree p in two dimensions and the piecewise polynomials of degree p - 1 with vanishing integral form a stable Stokes pair for all positive integers p.

Additional indexing

Item Type:Journal Article, refereed, original work
Communities & Collections:07 Faculty of Science > Institute of Mathematics
Dewey Decimal Classification:510 Mathematics
Uncontrolled Keywords:Applied Mathematics, Computational Mathematics, Algebra and Number Theory ; Stokes problem, inf-sup stability, nonconforming, Crouzeix-Raviart, p=3, odd degree, arbitrary p ; FINITE-ELEMENT, DIVERGENCE OPERATOR, RIGHT-INVERSE, SPACES
Language:English
Date:8 June 2022
Deposited On:18 Jul 2022 16:03
Last Modified:27 Dec 2024 02:41
Publisher:American Mathematical Society
ISSN:0025-5718
Additional Information:MSC (2020): Primary 65N30, 65N12, 65N15
OA Status:Closed
Free access at:Publisher DOI. An embargo period may apply.
Publisher DOI:https://doi.org/10.1090/mcom/3742

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