Overview

In Riemannian geometry, measurements are made with both yardsticks and protractors. These tools are represented by a family of inner-products. In Riemann-Finsler geometry (or Finsler geometry for short), one is in principle equipped with only a family of Minkowski norms. So ardsticks are assigned but protractors are not. With such a limited tool kit, it is natural to wonder just how much geometry one can uncover and describe? It now appears that there is a reasonable answer. Finsler geometry encompasses a solid repertoire of rigidity and comparison theorems, most of them founded upon a fruitful analogue of the sectional curvature. There is also a bewildering array of explicit examples, illustrating many phenomena which admit only Finslerian interpretations. This book focuses on the elementary but essential items among these results. Much thought has gone into making the account a teachable one.

Full Product Details

Author:   D. Bao ,  S.-S. Chern ,  Z. Shen
Publisher:   Springer-Verlag New York Inc.
Imprint:   Springer-Verlag New York Inc.
Edition:   Softcover reprint of the original 1st ed. 2000
Volume:   200
Dimensions:   Width: 15.50cm , Height: 2.30cm , Length: 23.50cm
Weight:   0.700kg
ISBN:  

9781461270706

ISBN 10:   1461270707
Pages:   435
Publication Date:   03 October 2012
Audience:   Professional and scholarly ,  Professional & Vocational
Format:   Paperback
Publisher's Status:   Active
Availability:   Manufactured on demand  
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Table of Contents

One Finsler Manifolds and Their Curvature.- 1 Finsler Manifolds and the Fundamentals of Minkowski Norms.- 2 The Chern Connection.- 3 Curvature and Schur’s Lemma.- 4 Finsler Surfaces and a Generalized Gauss—Bonnet Theorem.- Two Calculus of Variations and Comparison Theorems.- 5 Variations of Arc Length, Jacobi Fields, the Effect of Curvature.- 6 The Gauss Lemma and the Hopf-Rinow Theorem.- 7 The Index Form and the Bonnet-Myers Theorem.- 8 The Cut and Conjugate Loci, and Synge’s Theorem.- 9 The Cartan-Hadamard Theorem and Rauch’s First Theorem.- Three Special Finsler Spaces over the Reals.- 10 Berwald Spaces and Szabó’s Theorem for Berwald Surfaces.- 11 Randers Spaces and an Elegant Theorem.- 12 Constant Flag Curvature Spaces and Akbar-Zadeh’s Theorem.- 13 Riemannian Manifolds and Two of Hopf’s Theorems.- 14 Minkowski Spaces, the Theorems of Deicke and Brickell.

Reviews

This book offers the most modern treatment of the topic and will attract both graduate students and a broad community of mathematicians from various related fields. EMS Newsletter, Issue 41, September 2001

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