Foliations and Geometric Structures (Mathematics and Its Applications)

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The book is self-contained. It starts with the basic material on distributions and foliations. Then it proceeds to gradually introduce and build the tools needed for studying the geometry of foliated manifolds. The main theme of the book is to investigate the interrelations between foliations of a manifold on one hand, and the many geometric structures that the manifold may admit on the other hand. Among these structures we mention: affine, Riemannian, semi-Riemannian, Finsler, symplectic, complex and contact structures. Using these structures, the book presents interesting classes of foliations whose geometry is very rich and promising. These include the classes of : Riemannian, totally geodesic, totally umbilical, minimal, parallel non-degenerate, parallel totally - null, parallel partially - null, symmetric, transversally symmetric, Lagrange, totally real and Legendre foliations. Some of these classes appear for the first time in the literature in a book form. Finally, the vertical foliation of a vector bundle is used to develop a gauge theory on the total space of a vector bundle.

The book will be of interest to graduate students who want to be introduced to the geometry of foliations, to researchers working on foliations and geometric structures, and to physicists interested in gauge theories.

Author(s): Aurel Bejancu, Hani Reda Farran
Series: Mathematics and Its Applications
Edition: 1
Publisher: Springer
Year: 2005

Language: English
Pages: 309