1. Nonconforming virtual element methods for velocity-pressure Stokes eigenvalue problem.
- Author
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Adak, Dibyendu, Manzini, Gianmarco, and Natarajan, Sundararajan
- Subjects
- *
EIGENVALUES , *ELLIPTIC operators , *EIGENFUNCTIONS - Abstract
In this work, we investigate a divergence-free, nonconforming virtual element method for the numerical approximation of the Stokes eigenvalue problems using polygonal unstructured meshes on polygonal domain. By employing an elliptic projection operator, we "enhance" the definition of the virtual element space to make the L 2 -projection operator computable with optimal order. Furthermore, we prove the optimal order of convergence of the eigenfunction approximation and the double order of convergence of the eigenvalue approximation through compactness arguments for the solution operator (Babuška-Osborn Theory). Finally, we present a set of numerical experiments to assess the good approximation behavior of the method and show its computational performance. [ABSTRACT FROM AUTHOR]
- Published
- 2024
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