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MATH 662: Riemannian Geometry (spring
2008)
Instructor: Xiaodong Cao
Meeting Time & Room
This course will be an introduction to Riemannian geometry. We will
cover the following topics: linear connections, Riemannian metric and
parallel translation, covariant derivative and curvature tensors, the
exponential map, the Gauss lemma and completeness of the metric, isometries
and space forms, Jacobi fields and the theorem of Cartan-Hadamard, the
first and second variation formulas, the index form of Morse and the
theorem of Bonnet-Myers, the Rauch, Hessian, and Laplacian comparison
theorems, the Morse index theorem, the conjugate and cut loci, submanifolds
and the second fundamental form.
A topic course of Riemannian geometry will be offered in the future, which will
cover some recent progress in geometric analysis.
Last modified:October 1, 2007
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