MATH 622 - Differential Geometry I - Spring 2022
Credits 3. 3 Lecture Hours.
Surfaces in 3-D space and generalizations to submanifolds of Euclidean space; smooth manifolds and mappings; tensors; differential forms; Lie groups and algebras; Stokes' theorem; deRham cohomology; Frobenius theorem; Riemannian manifolds.
Prerequisites: MATHÂ 304 or equivalent; approval of instructor.
Sections
Sec | Instructor | Lecture | |
---|---|---|---|
600 | Igor Zelenko | TR 9:35-10:50am BLOC 110 |