English

Infinitesimally Moebius bendable hypersurfaces

Differential Geometry 2023-08-01 v1

Abstract

Li, Ma and Wang have provided in [\emph{Deformations of hypersurfaces preserving the M\"obius metric and a reduction theorem}, Adv. Math. 256 (2014), 156--205] a partial classification of the so-called Moebius deformable hypersurfaces, that is, the umbilic-free Euclidean hypersurfaces f ⁣:MnRn+1f\colon M^n\to \mathbb{R}^{n+1} that admit non-trivial deformations preserving the Moebius metric. For n5n\geq 5, the classification was completed by the authors in \cite{JT2}. In this article we obtain an infinitesimal version of that classification. Namely, we introduce the notion of an infinitesimal Moebius variation of an umbilic-free immersion f ⁣:MnRmf\colon M^n\to \mathbb{R}^m into Euclidean space as a one-parameter family of immersions ft ⁣:MnRmf_t\colon M^n\to \mathbb{R}^m, with t(ϵ,ϵ)t\in (-\epsilon, \epsilon) and f0=ff_0=f, such that the Moebius metrics determined by ftf_t coincide up to the first order. Then we characterize isometric immersions f ⁣:MnRmf\colon M^n\to \mathbb{R}^m of arbitrary codimension that admit a non-trivial infinitesimal Moebius variation among those that admit a non-trivial conformal infinitesimal variation, and use such characterization to classify the umbilic-free Euclidean hypersurfaces of dimension n5n\geq 5 that admit non-trivial infinitesimal Moebius variations.

Keywords

Cite

@article{arxiv.2307.16341,
  title  = {Infinitesimally Moebius bendable hypersurfaces},
  author = {M. I. Jimenez and R. Tojeiro},
  journal= {arXiv preprint arXiv:2307.16341},
  year   = {2023}
}

Comments

30 pages

R2 v1 2026-06-28T11:43:58.002Z