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Infinitesimally Moebius bendable hypersurfaces

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Autor(es):
Jimenez, M. I. ; Tojeiro, R.
Número total de Autores: 2
Tipo de documento: Artigo Científico
Fonte: PROCEEDINGS OF THE EDINBURGH MATHEMATICAL SOCIETY; v. 67, n. 1, p. 25-pg., 2024-01-11.
Resumo

Li, Ma and Wang have provided in [13] a partial classification of the so-called Moebius deformable hypersurfaces, that is, the umbilic-free Euclidean hypersurfaces $f\colon M<^>n\to \mathbb{R}<^>{n+1}$ that admit non-trivial deformations preserving the Moebius metric. For $n\geq 5$, the classification was completed by the authors in [12]. 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 $f\colon M<^>n\to \mathbb{R}<^>m$ into Euclidean space as a one-parameter family of immersions $f_t\colon M<^>n\to \mathbb{R}<^>m$, with $t\in (-\epsilon, \epsilon)$ and $f_0=f$, such that the Moebius metrics determined by ft coincide up to the first order. Then we characterize isometric immersions $f\colon M<^>n\to \mathbb{R}<^>m$ 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 $n\geq 5$ that admit non-trivial infinitesimal Moebius variations. (AU)

Processo FAPESP: 22/16097-2 - Métodos modernos em geometria diferencial e análise geométrica
Beneficiário:Paolo Piccione
Modalidade de apoio: Auxílio à Pesquisa - Temático
Processo FAPESP: 22/05321-9 - Sobre deformação de subvariedades
Beneficiário:Miguel Ibieta Jimenez
Modalidade de apoio: Bolsas no Brasil - Pós-Doutorado