Preface Acknowledgments 4 Additional Topics in Riemannian Geometry 4.1 Curves and Surfaces in Rn Given by ODEs 4.2 Volume of Geodesic Balls 4.3 Holomorphic Geometry 4.4 Kahler Geometry 5 de Rham Cohomology 5.1 Basic Properties of de Rham Cohomology 5.2 Clifford Algebras 5.3 The Hodge Decomposition Theorem 5.4 Characteristic Classes 6 Lie Groups 6.1 Basic Concepts 6.2 Lie Algebras 6.3 The Exponential Function of a Matrix Group 6.4 The Classical Groups 6.5 Representations of a Compact Lie Group 6.6 Bi-invariant pseudo-Riemannian Metrics 6.7 The Killing Form 6.8 The Classical Groups in Low Dimensions 6.9 The Cohomology of Compact Lie Groups 6.10 The Cohomology of the Unitary Group 7 Homogeneous Spaces and Symmetric Spaces 7.1 Smooth Structures on Coset Spaces 7.2 The Isometry Group 7.3 The Lie Derivative and Killing Vector Fields 7.4 Homogeneous Pseudo-Riemannian Manifolds 7.5 Local Symmetric Spaces 7.6 The Global Geometry of Symmetric Spaces 8 Other Cohomology Theories 8.1 Homological Algebra 8.2 Simplicial Cohomology 8.3 Singular Cohomology 8.4 Sheaf Cohomology Bibliography Authors' Biographies Index 編輯手記
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