English

Vector fields with big and small volume on the 2-sphere

Differential Geometry 2023-07-20 v2 Geometric Topology

Abstract

We consider the problem of minimal volume vector fields on a given Riemann surface, specialising on the case of MM^\star, that is, the arbitrary radius 2-sphere with two antipodal points removed. We discuss the homology theory of the unit tangent bundle (T1M,T1M)(T^1M^\star,\partial T^1M^\star) in relation with calibrations and a certain minimal volume equation. A particular family Xm,k,kNX_{\mathrm{m},k},\:k\in\mathbb{N}, of minimal vector fields on MM^\star is found in an original fashion. The family has unbounded volume, limkvol(Xm,kΩ)=+\lim_k\mathrm{vol}({X_{\mathrm{m},k}}_{|\Omega})=+\infty, on any given open subset Ω\Omega of MM^\star and indeed satisfies the necessary differential equation for minimality. Another vector field XX_\ell is discovered on a region Ω1S2\Omega_1\subset\mathbb{S}^2, with volume smaller than any other known \textit{optimal} vector field restricted to Ω1\Omega_1.

Keywords

Cite

@article{arxiv.2110.07759,
  title  = {Vector fields with big and small volume on the 2-sphere},
  author = {Rui Albuquerque},
  journal= {arXiv preprint arXiv:2110.07759},
  year   = {2023}
}

Comments

13 pages; final version, accepted for publication in Hiroshima Mathematical Journal

R2 v1 2026-06-24T06:54:18.862Z