Geometry of Pseudo-Finsler Submanifolds - Aurel Bejancu, Hani Reda Farran

Geometry of Pseudo-Finsler Submanifolds

Buch | Softcover
244 Seiten
2010 | Softcover reprint of the original 1st ed. 2000
Springer (Verlag)
978-90-481-5601-6 (ISBN)
53,49 inkl. MwSt
Finsler geometry is the most natural generalization of Riemannian geo- metry. It started in 1918 when P. Finsler [1] wrote his thesis on curves and surfaces in what he called generalized metric spaces. Studying the geometry of those spaces (which where named Finsler spaces or Finsler manifolds) became an area of active research. Many important results on the subject have been brought together in several monographs (cf. , H. Rund [3], G. Asanov [1], M. Matsumoto [6], A. Bejancu [8], P. L. Antonelli, R. S. Ingar- den and M. Matsumoto [1], M. Abate and G. Patrizio [1] and R. Miron [3]) . However, the present book is the first in the literature that is entirely de- voted to studying the geometry of submanifolds of a Finsler manifold. Our exposition is also different in many other respects. For example, we work on pseudo-Finsler manifolds where in general the Finsler metric is only non- degenerate (rather than on the particular case of Finsler manifolds where the metric is positive definite). This is absolutely necessary for physical and biological applications of the subject.
Secondly, we combine in our study both the classical coordinate approach and the modern coordinate-free ap- proach. Thirdly, our pseudo-Finsler manifolds F = (M, M', F*) are such that the geometric objects under study are defined on an open submani- fold M' of the tangent bundle T M, where M' need not be equal to the entire TMo = TM/O(M).

1. Pseudo-Finsler Manifolds.- 2. Pseudo-Finsler Submanifolds.- 3. Special Immersions of Pseudo-Finsler Manifolds.- 4. Geometry of Curves in Finsler Manifolds.- 5. Pseudo-Finsler Hypersurfaces.- 6. Finsler Surfaces.- Basic Notations and Terminology.- References.

Erscheint lt. Verlag 5.12.2010
Reihe/Serie Mathematics and Its Applications ; 527
Zusatzinfo IX, 244 p.
Verlagsort Dordrecht
Sprache englisch
Maße 155 x 235 mm
Themenwelt Mathematik / Informatik Mathematik Analysis
Mathematik / Informatik Mathematik Angewandte Mathematik
Mathematik / Informatik Mathematik Geometrie / Topologie
ISBN-10 90-481-5601-7 / 9048156017
ISBN-13 978-90-481-5601-6 / 9789048156016
Zustand Neuware
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