jurgen Jost

Riemannian geometry and geometric Analysis

第一章 Remannian Manifolds

第二章 Lie groups and Vector Bundles

第三章 The Laplace Operator and Harmonic Differential Forms

第四章 Connections and Curvature

第五章 Geometry of Submanifolds

第六章 Geodesic and Jacobi Fields

第七章 Symmetric Spaces and Kahler Manifolds

第八章 Morse Theory and Floer Homology

第九章 Hamonic Maps between Riemannian Manifolds

第十章 Harmonic Maps from Riemann Surfaces

第11章 Variational problems from Quntum Field Theory