MATH 6520 - Differentiable Manifolds I
Reyer Sjamaar, fall 2016.
Prerequisites
Undergraduate analysis, linear algebra, and point-set topology.
Reference Text
John Lee, Introduction to Smooth Manifolds (most recently)
Minimum Syllabus
- Manifolds, submanifolds. Immersions, embeddings and submersions.
- Tangent bundles and tangent maps. Vector fields, derivations and the Lie bracket.
- Sard’s theorem, easy Whitney embedding theorem.
- Trajectories and flows of vector fields. Frobenius integrability theorem.
- Connections, curvature and geodesics. Riemannian metrics, Levi-Civita connections.
- Tensors, differential forms. Exterior derivative and Stokes’ theorem.
Optional Topics
- Lie groups, Lie algebras, homogeneous spaces.
- De Rham theory.
- Transversality.
- Morse theory.