Properties of the connection associated with planar webs and applications

We give various results and applications using the connection \((E,\nabla)\) associated with a \(d\)-web. Precisely, we exhibit fundamental invariants of the web related to the differential equation of first order which presents the web. They cast some new lights on the connection and its constructi...

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Bibliographic Details
Published in:arXiv.org 2007-04
Main Author: Ripoll, Olivier
Format: Article
Language:English
Subjects:
Differential equations
Theorems
Webs
Online Access:Get full text
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Summary:We give various results and applications using the connection \((E,\nabla)\) associated with a \(d\)-web. Precisely, we exhibit fundamental invariants of the web related to the differential equation of first order which presents the web. They cast some new lights on the connection and its construction, both conceptually and effectively. We describe 4 and 5-webs from this point of view and show for instance that the connection gives account for the linearizability conditions of the web. Moreover, we get characterization of maximal rank webs such as exceptional 5-webs, and 4-webs \emph{via} a new proof of the Poincaré theorem in terms of differential systems. We establish the trace formula related to the determinant bundle \((\det E, \det \nabla)\) and the extracted 3-webs. Furthermore, the theorem of determination of the rank is proved to give an explicit criterion for measuring the rank of a web.
ISSN:2331-8422