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Auteurs principaux:	Jiménez, José Luis Carmona, López, Marco Castrillón, Díaz-Ramos, José Carlos
Format:	Preprint
Publié:	2023
Sujets:	Differential Geometry 53C05, 53C12, 53C40
Accès en ligne:	https://arxiv.org/abs/2312.16934
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We characterize isometric actions whose principal orbits are hypersurfaces through the existence of a linear connection satisfying a set of covariant equations in the same spirit as the Ambrose-Singer Theorem for homogeneous space. These results are then used to describe isometric cohomogeneity one foliations in terms of such connections. Finally, we provide explicit examples of these objects in Euclidean spaces and real hyperbolic spaces.