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Geometric Theory of Foliations Cesar Camacho

Geometric Theory of Foliations By Cesar Camacho

Geometric Theory of Foliations by Cesar Camacho


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Summary

This question was answered affirmatively by Reeb in his thesis, where he 3 presents an example of a foliation of S with the following characteristics: There exists one compact leaf homeomorphic to the two-dimensional torus, while the other leaves are homeomorphic to two-dimensional planes which accu mulate asymptotically on the compact leaf.

Geometric Theory of Foliations Summary

Geometric Theory of Foliations by Cesar Camacho

Intuitively, a foliation corresponds to a decomposition of a manifold into a union of connected, disjoint submanifolds of the same dimension, called leaves, which pile up locally like pages of a book. The theory of foliations, as it is known, began with the work of C. Ehresmann and G. Reeb, in the 1940's; however, as Reeb has himself observed, already in the last century P. Painleve saw the necessity of creating a geometric theory (of foliations) in order to better understand the problems in the study of solutions of holomorphic differential equations in the complex field. The development of the theory of foliations was however provoked by the following question about the topology of manifolds proposed by H. Hopf in the 3 1930's: Does there exist on the Euclidean sphere S a completely integrable vector field, that is, a field X such that X* curl X * 0? By Frobenius' theorem, this question is equivalent to the following: Does there exist on the 3 sphere S a two-dimensional foliation? This question was answered affirmatively by Reeb in his thesis, where he 3 presents an example of a foliation of S with the following characteristics: There exists one compact leaf homeomorphic to the two-dimensional torus, while the other leaves are homeomorphic to two-dimensional planes which accu mulate asymptotically on the compact leaf. Further, the foliation is C.

Table of Contents

I - Differentiable Manifolds.- II - Foliations.- III - The Topology of the Leaves.- IV - Holonomy and the Stability Theorems.- V - Fiber Bundles and Foliations.- VI - Analytic Foliations of Codimension One.- VII - Novikov's Theorem.- VIII - Topological Aspects of the Theory of Group Actions.- Appendix - Frobenius' Theorem.- 1. Vector fields and the Lie bracket.- 2. Frobenius' theorem.- 3. Plane fields defined by differential forms.- Exercises.

Additional information

NLS9781468471496
9781468471496
146847149X
Geometric Theory of Foliations by Cesar Camacho
New
Paperback
Birkhauser Boston Inc
2013-06-26
206
N/A
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