Metric Foliations and Curvature
(Sprache: Englisch)
Riemannian manifolds, particularly those with positive or nonnegative curvature, are constructed from only a handful by means of metric fibrations or deformations thereof. This text documents some of these constructions, many of which have only appeared in journal form.
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Riemannian manifolds, particularly those with positive or nonnegative curvature, are constructed from only a handful by means of metric fibrations or deformations thereof. This text documents some of these constructions, many of which have only appeared in journal form.
Klappentext zu „Metric Foliations and Curvature “
Riemannian manifolds, particularly those with positive or nonnegative curvature, are constructed from only a handful by means of metric fibrations or deformations thereof. This text documents some of these constructions, many of which have only appeared in journal form. The emphasis is less on the fibration itself and more on how to use it to either construct or understand a metric with curvature of fixed sign on a given space.
Inhaltsverzeichnis zu „Metric Foliations and Curvature “
- Submersions, Foliations, and Metrics- Basic Constructions and Examples
- Open Manifolds of Nonnegative Curvature
- Metric Foliations in Space Forms
Bibliographische Angaben
- Autoren: Detlef Gromoll , Gerard Walschap
- 2009, 176 Seiten, mit Abbildungen, Maße: 16 x 24,1 cm, Gebunden, Englisch
- Verlag: Springer
- ISBN-10: 3764387149
- ISBN-13: 9783764387143
- Erscheinungsdatum: 19.02.2009
Sprache:
Englisch
Rezension zu „Metric Foliations and Curvature “
From the reviews:"The book under review is one of five or six books on foliations that should be in the professional library of every geometer. ... authors define the fundamental tensors of a Riemannian submersion tensors that carry over to a metric foliation on M ... . gives a brief introduction to the geometry of the second tangent bundle and related topics needed for the study of metric foliations on compact space forms of non negative sectional curvature ... ." (Richard H. Escobales, Jr., Mathematical Reviews, Issue 2010 h)
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