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MATH 652: Differentiable Manifolds (Fall
2007)
Instructor: Jim West
Meeting Time & Room
We shall develop (many of) the basic theorems and apparatus used in
their study. This will include inverse and implicit function theorems
in Euclidean spaces, definition and examples of differrentiable manifolds,
tangent vectors and bundles, functorial passage from vector space constructions
to bundle constructions, vector fields, ordinary differential equations
on manifolds, Lie bracket, Lie derivative and Frobenius' Theorem, Lie
groups and their Lie algebras, Sard's Theorem, Embedding in Euclidean
spaces, tensor algebra, tensor fields, exterior derivative, integration
of differential forms, Stokes' Theorem, De Rham cohomology groups and
applications.
We shall use both Boothby's An Introduction to Differentiable Manifolds
and Differential Geometry, and Conlon's Differentiable Manifolds.
Last modified:April 2, 2007
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