Glued linear connection on surface of the projective space

We consider a surface as a variety of centered planes in a multidi­mensional projective space. A fiber bundle of the linear coframes appears over this manifold. It is important to emphasize the fiber bundle is not the principal bundle. We called it a glued bundle of the linear coframes. A connection...

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Bibliographic Details
Published in:Differential Geometry of Manifolds of Figures
Main Author: K.V. Bashashina
Format: Article in Journal/Newspaper
Language:English
Russian
Published: Immanuel Kant Baltic Federal University 2020
Subjects:
projective space surface
glued bundle
linear connection
glued linear connection
cartan projective connection
curvature tensor
Mathematics
QA1-939
laptev
Online Access:https://doi.org/10.5922/0321-4796-2020-51-3
https://doaj.org/article/abdc193ce7da400b889ec19cf9870328
Description
Summary:We consider a surface as a variety of centered planes in a multidi­mensional projective space. A fiber bundle of the linear coframes appears over this manifold. It is important to emphasize the fiber bundle is not the principal bundle. We called it a glued bundle of the linear coframes. A connection is set by the Laptev — Lumiste method in the fiber bundle. The ifferential equations of the connection object components have been found. This leads to a space of the glued linear connection. The expres­sions for a curvature object of the given connection are found in the pa­per. The theorem is proved that the curvature object is a tensor. A condi­tion is found under which the space of the glued linear connection turns into the space of Cartan projective connection. The study uses the Cartan — Laptev method, which is based on cal­culating external differential forms. Moreover, all considerations in the article have a local manner.

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