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(俄罗斯)波斯特尼科夫(M.M.Postnikov)[著]

  2020-07-11 00:00:00  

(俄罗斯)波斯特尼科夫(M.M.Postnikov)[著] 本书特色

This book contains a systematic and comprehensive expositioof Lobachevskiageometry and the theory ofdiscrete groups ofmotions iEuclideaspace and Lobachevsky space. It is divided into two closely related parts: the first treats the geometry ofspaces ofconstant curvature and the second discrete groups of motions of these. The authors give a very clear account of their subject describing it from the viewpoints of elementary geometry, Riemanniageometry and group theory. The result is a book which has no rivalithe literature.Part I contains the classificatioofmotions ispaces ofconstant curvature and non-traditional topics like the theory ofacute-angled polyhedra and methods for computing volumes of non-Euclideapolyhedra. Part II includes the theory of cristallographic, Fuchsian,and Kleiniagroups and aexpositioof Thurston's theory of deformations.The greater part of the book is accessible to first-year students imathematics. At the same time the book includes very recent results which will be ofinterest to researchers ithis field.

(俄罗斯)波斯特尼科夫(M.M.Postnikov)[著] 内容简介

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(俄罗斯)波斯特尼科夫(M.M.Postnikov)[著] 目录

Ⅰ.Geometry of Spaces of Constant Curvature
Preface
Chapter 1 Basic Structures
1 Definitioof Spaces of Constant Curvature
1.1 Lie Groups of Transformations
1.2 Groups of Motions of a RiemanniaManifold
1.3 Invariant RiemanniaMetrics oHomogeneous Spaces
1.4 Spaces of Constant Curvature
1.5 Three Spaces
1.6 Subspaces of the Space R
2 The ClassificatioTheorem
2.1 Statement of the Theorem
2.2 Reductioto Lie Algebras
2.3 The Symmetry
2.4 Structure of the Tangent Algebra of the Group of Motions
2.5 RiemanSpace
3 Subspaces and Convexity
3.1 Involutions
3.2 Planes
3.3 Half-Spaces and Convex Sets
3.4 Orthogonal Planes
4 Metric
4.1 General Properties
4.2 Formulae for Distance ithe Vector Model
4.3 Convexity of Distance
Chapter 2 Models of Lobachevskij Space
1 Projective Models
1.1 Homogeneous Domains
1.2 Projective ModelofLobachevskij Space
1.3 Projective EuclideaModelsThe KleiModel
1.4 "Affine" Subgroup of the Group of Automorphisms of a Quadric
1.5 RiemanniaMetric and Distance BetweePoints ithe Projective Model
2 Conformal Models
2.1ConformaISpace
2.2 Conformal Model of the Lobachevskij Space
2.3 Conformal EuclideaModels
2.4 Complex Structure of the Lobachevskij Plane
……
References (俄罗斯)波斯特尼科夫(M.M.Postnikov)[著]

http://www.00-edu.com/tushu/kj1/202007/2629188.html十二生肖
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