Zeitlin's model for axisymmetric 3-D Euler equations
Differential Geometry
2025-08-12 v2 Numerical Analysis
Mathematical Physics
math.MP
Numerical Analysis
Abstract
Zeitlin's model is a spatial discretization for the 2-D Euler equations on the flat 2-torus or the 2-sphere. Contrary to other discretizations, it preserves the underlying geometric structure, namely that the Euler equations describe Riemannian geodesics on a Lie group. Here we show how to extend Zeitlin's approach to the axisymmetric Euler equations on the 3-sphere. It is the first discretization of the 3-D Euler equations that fully preserves the geometric structure, albeit restricted to axisymmetric solutions. Thus, this finite-dimensional model admits Riemannian curvature and Jacobi equations, which are discussed.
Keywords
Cite
@article{arxiv.2408.11204,
title = {Zeitlin's model for axisymmetric 3-D Euler equations},
author = {Klas Modin and Stephen C. Preston},
journal= {arXiv preprint arXiv:2408.11204},
year = {2025}
}
Comments
24 pages, 4 figures