English

Conjugate points along spherical harmonics

Differential Geometry 2025-09-22 v1

Abstract

Utilizing structure constants, we present a version of the Misiolek criterion for identifying conjugate points. We propose an approach that enables us to locate these points along solutions of the quasi-geostrophic equations on the sphere \Sph2\Sph^2. We demonstrate that for any spherical harmonics YlmY_{lm} with 1ml1 \leq |m| \leq l, except for Y1±1Y_{1\pm1} and Y2±1Y_{2\pm 1}, conjugate points can be determined along the solution generated by the velocity field elm=Ylme_{lm}=\nabla^\perp Y_{lm}. Subsequently, we investigate the impact of the Coriolis force on the occurrence of conjugate points. Moreover, for any zonal flow generated by the velocity field Yl1 0\nabla^\perp Y_{l_1~0}, we demonstrate that varying the rotation rate can lead to the appearance of conjugate points along the corresponding solution, where l1=2k+1.Nl_1 = 2k+1. \in \mathbb{N} Additionally, we prove the existence of conjugate points along (complex) Rossby-Haurwitz waves and explore the effect of the Coriolis force on their stability.

Keywords

Cite

@article{arxiv.2402.10578,
  title  = {Conjugate points along spherical harmonics},
  author = {Ali Suri},
  journal= {arXiv preprint arXiv:2402.10578},
  year   = {2025}
}
R2 v1 2026-06-28T14:50:33.516Z