MATH 661 —
Fall 1999
Introduction to Geometric Topology
Instructor: James West
Time: TR 2:55-4:10
Room: Malott 206
This will be an introduction taught at a level consistent
with the background of the students in the course. (For example, any algebraic
techniques will be given a self-contained treatment.)
Contents are negotiable, but regarded as a first course in
topology after the basics (connectedness, compactness, metric spaces)
acquired in an analysis course, one (overfull) outline might be as follows:
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The plane:
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The Jordan Curve Theorem
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The Schönflies Theorem
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Surfaces.
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Knots I (Geometric)
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3-manifolds (Introduction)
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Where the Wild Things Are:
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Knots II (Various geometric and algebraic invariants
associated to knots)
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More about 3-manifolds.
Variations might include:
If the class is interested in Complex Dynamics and Hubbard-Douady
Matings of Julia Sets, we could substitute a proof of R.L. Moore's Theorem
(characterizing those mappings of the 2-sphere whose images are 2-spheres)
and its application for some of the 3-dimensional topology.
On the other hand, if the class wants to jump right into
knot theory, and is willing to tolerate a "quick and dirty" intro to
homology as a geometric tool, we could spend the whole semester following
Lickorish's An Introduction to Knot Theory (Springer GTM v.175)
as far as we can.
Last modified:
April 7, 2003
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