Canonical Reductive Decomposition of Extrinsic Homogeneous Submanifolds
DOI:
https://doi.org/10.1285/i15900932v45s1p117Keywords:
Ambrose-Singer theorem, extrinsic homogeneity, reductive decompositionAbstract
Let $\overline{M}=\overline{G}/\overline{H}$ be a homogeneous Riemannian manifold. Given a Lie subgroup $G\subset \overline{G}$ and a reductive decomposition of the homogeneous structure of $\overline{M}$, we analyze a canonical reductive decomposition for the orbits of the action of $G$. These leaves of the $G$-action are extrinsic homogeneous submanifolds and the analysis of the reductive decomposition of them is related with their extrinsic properties. We connect the study with works in the literature and initiate the relationship with the Ambrose-Singer theorem and homogeneous structures of submanifolds.Downloads
Published
20-01-2026
Issue
Section
Articoli
License
Authors who publish with this publication accept all the terms and conditions of the Creative Commons license at the link below.
Gli autori che pubblicano in questa rivista accettano i termini e le condizioni specificate nella licenza Creative Commons di cui al link sottostante.
http://creativecommons.org/licenses/by-nc-nd/3.0/it/legalcode
