Surface Stokes Without Inf-Sup Condition
Abstract
For a -dimensional hypersurface of class without boundary, we reformulate the surface Stokes equations as a nonsymmetric indefinite elliptic problem governed by two Laplacians. We then use this elliptic reformulation as a basis for a numerical method based on lifted parametric FEM. Assuming no geometric error for simplicity, we prove its well-posedness, quasi-best approximation in a robust mesh-dependent -norm for any polynomial degree, as well as an optimal error estimate for both velocity and pressure. This entails a sufficiently small mesh size that solely depends on the Weingarten map and circumvents the usual discrete inf-sup condition. We present numerical experiments for velocity-pressure pairs with equal and disparate polynomial degrees, demonstrating that the proposed method is both accurate and practical.
Cite
@article{arxiv.2508.13342,
title = {Surface Stokes Without Inf-Sup Condition},
author = {Ricardo H. Nochetto and Mansur Shakipov},
journal= {arXiv preprint arXiv:2508.13342},
year = {2025}
}
Comments
22 pages, 1 figure