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黎曼-芬斯勒几何导论txt,chm,pdf,epub,mobi下载作者: [美]David Dai-Wai Bao / [美]Shiing-Shen Chern / [美]Zhongmin Shen 出版社: 世界图书出版公司 原作名: An Introduction to Riemann-Finsler Geometry 出版年: 2009-8 页数: 431 定价: 50.00元 丛书: Graduate Texts in Mathematics ISBN: 9787510005053 内容简介 · · · · · ·This book project began as an attempt to sort through the literature on Finsler geometry. It was our intention to write a systematic account about that part of the material which is both elementary and indispensable. We want to thank many fellow geometers for their encouragement, for answering our email calls for help, and for steering us towards the pertinent references. Some ... 目录 · · · · · ·preface.acknowledgments part one finsler manifolds and their curvature chapter 1 finsler manifolds and the fundamentals of minkowski norms 1.0 physical motivations 1.1 finsler structures: definitions and conventions · · · · · · () preface. acknowledgments part one finsler manifolds and their curvature chapter 1 finsler manifolds and the fundamentals of minkowski norms 1.0 physical motivations 1.1 finsler structures: definitions and conventions 1.2 two basic properties of minkowski norms 1.3 explicit examples of finsler manifolds 1.4 the fundamental tensor and the cartan tensor references for chapter 1 chapter 2 the chern connection 2.0 prologue 2.1 the vector bundle tm and related objects 2.2 coordinate bases versus special orthonormal bases 2.3 the nonlinear connection on the manifold tm 2.4 the chern connection on tm 2.5 index gymnastics references for chapter 2 chapter 3 curvature and schur's lemma 3.1 conventions and the hh-, hv-, w-curvatures .3.2 first bianchi identities from torsion freeness 3.3 formulas for r and p in natural coordinates 3.4 first bianchi identities from "almost" g-compatibility 3.5 second bianchi identities 3.6 interchange formulas or ricci identities 3.7 lie brackets among the and the 3.8 derivatives of the geodesic spray coefficients gi 3.9 the flag curvature 3.10 schur's lemma references for chapter 3 chapter 4 finsler surfaces and a generalized gauss-bonnet theorem 4.0 prologue 4.1 minkowski planes and a useful basis 4.2 the equivalence problem for minkowski planes 4.3 the berwald frame and our geometrical setup on sm 4.4 the chern connection and the invariants i, j, k 4.5 the riemannian arc length of the indicatrix 4.6 a gauss-bonnet theorem for landsberg surfaces references for chapter 4 part two calculus of variations and comparison theoremschapter 5 variations of arc length, jacobi fields, the effect of curvature 5.1 the first variation of arc length 5.2 the second variation of arc length 5.3 geodesics and the exponential map 5.4 jacobi fields 5.5 how the flag curvature's sign influences geodesic rays references for chapter 5 chapter 6 the gauss lemma and the hopf-rinow theorem 6.1 the gauss lemma 6.2 finsler manifolds and metric spaces 6.3 short geodesics are minimizing 6.4 the smoothness of distance functions 6.5 long minimizing geodesics 6.6 the hopf-rinow theorem chapter 7 the index form and the bonnet-myers theorem 7.1 conjugate points 7.2 the index form 7.3 what happens in the absence of conjugate points? 7.4 what happens if conjugate points are present? 7.5 the cut point versus the first conjugate points 7.6 ricci curvatures 7.7 the bonnet-myers theorem references for chapter 7.. chapter 8 the cut and conjugate loci, and synge's theorem 8.1 definitions 8.2 the cut point and the first conjugate point 8.3 some consequences of the inverse function theorem 8.4 the manner in which cy and iy depend on y 8.5 generic properties of the cut locus cutx 8.6 additional properties of cuts when m is compact 8.7 shortest geodesics within homotopy classes 8.8 synge's theorem references for chapter 8 chapter 9 the cartan-hadamard theorem and rauch's first theorem 9.1 estimating the growth of jacobi fields 9.2 when do local diffeomorphisms become covering maps? 9.3 some consequences of the covering homotopy theorem 9.4 the cartan-hadamard theorem 9.5 prelude to ranch's theorem 9.6 rauch's first comparison theorem 9.7 jacobi fields on space forms 9.8 applications of rauch's theorem references for chapter 9 part three special finsler spaces over the reals chapter 10 berwald spaces and szabo's theorem for berwald surfaces 10.0 prologue 10.1 berwald spaces 10.2 various characterizations of berwald spaces 10.3 examples of berwald spaces 10.4 a fact about flat linear connections 10.5 characterizing locally minkowski spaces by curvature 10.6 szabo's rigidity theorem for berwald surfaces references for chapter 10 chapter 11 randers spaces and an elegant theorem 11.0 the importance of randers spaces 11.1 randers spaces, positivity, and strong convexity 11.2 a matrix result and its consequences 11.3 the geodesic spray coefficients of a randers metric 11.4 the nonlinear connection for randers spaces 11.5 a useful and elegant theorem 11.6 the construction of y-global berwald spaces references for chapter 11 chapter 12 constant flag curvature spaces and akbar-zadeh's theorem 12.0 prologue 12.1 characterizations of constant flag curvature 12.2 useful interpretations of e and e 12.3 growth rates of solutions of e + λe = 0 12.4 akbar-zadeh's rigidity theorem 12.5 formulas for machine computations of k 12.6 a poincare disc that is only forward complete 12.7 non-riemannian projectively flat s2 with k = 1 references for chapter 12 chapter 13 riemannian manifolds and two of hopf's theorems 13.1 the levi-civita (christoffel) connection 13.2 curvature 13.3 warped products and riemannian space forms 13.4 hopf's classification of riemannian space forms 13.5 the divergence lemma and hopf's theorem. 13.6 the weitzenbsck formula and the bochner technique references for chapter 13 chapter 14 minkowski spaces, the theorems of deicke and brickell 14.1 generalities and examples 14.2 the riemannian curvature of each minkowski space 14.3 the riemannian laplacian in spherical coordinates 14.4 deicke's theorem 14.5 the extrinsic curvature of the level spheres of f 14.6 the gauss equations 14.7 the blaschke-santal6 inequality 14.8 the legendre transformation 14.9 a mixed-volume inequality, and brickell's theorem references for chapter 14 bibliography index... · · · · · · () |
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作者: neal0620
还没看
翻译得也很棒
很有趣的一本书
还没有看,不错