J.R. Arteaga, M. Malakhaltsev. Ideas of E. Cartan and S. Lie in modern geometry: G-structures and differential equations. Lecture 2


Natural Sciences / Mathematics / Differential equations

Submitted on: Apr 24, 2012, 20:22:05

Description: This is the lecture 2 of a mini-course of 4 lectures. Our purpose of this mini-curse is to explain some ideas of E. Cartan and S. Lie when we study differential geometry, particularly we will to explain the Cartan reduction method. The Cartan reduction method is a technique in Differential Geometry for determining whether two geometrical structure are the same up to a diffeomorphism. This method use new tools of differential geometry as principal bundles, G-structures and jets theory. We start with an example of a $G$-structure: the 3-webs in R^2. Here we use the Cartan method to classify the differential equations but not to resolve. This is a classification can be a weak classification in the sense of not involving all the structural invariants.

The abstract of this article has been published in the "Intellectual Archive Bulletin" , April 2012, ISSN 1929-1329.

The Library of Congress (USA) reference page : http://lccn.loc.gov/2012210064.
The Library and Archives Canada reference page: collectionscanada.gc.ca/ourl/res.php?url_ver=Z39.88......

To read the article posted on Intellectual Archive web site please click the link below.

Jose_Arteaga__Ideas_of_Cartan_in_modern_geometry_2.pdf



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