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Math 661 —
Geometric Topology
Topology and
Geometry in Dimensions 1, 2 and 3
(with a Slant towards Geometric Group Theory)
Fall 2002
Instructor:
Kai-Uwe Bux
Time: MWF
12:20-1:10
Room:
Malott 205
Course Web
Page: www.math.cornell.edu/~bux/teaching/2002_F-661/
Low dimensional objects such as graphs, surfaces, and 3-manifolds
have the advantage that we can visualise them. We will study these spaces
and the groups that relate to them, in particular the fundamental group
and their groups of symmetries.
Possible topics include:
- Dynamics of graph and surface automorphisms: Consider a homeomorphism
from a surface to itself. What can we say about the dynamics of iterated
applications of this map? For instance, the homemorphism takes curves
to curves, and with each iteration, they might become more and more
complicated. Do we still obtain something reasonable in the limit?
- JSJ-decompositions of 3-manifolds and finitely presented groups: What
happens in the fundamental group of a manifold, when you chop this space
up into simpler pieces? You would hope that the fundamental group decomposes,
in some sense, into simpler pieces too. Conversely, if you can decompose
the fundamental group, can you realise this splitting geometrically?
- Algorithmic problems in low dimensional topology: Someone gives you
a knot. Can you decide if that gadget is really knotted? Or someone
gives you a surface, can you tell whether it is the torus? Which invariants
of topological spaces can be computed?
Prerequisites: This class will be accessible to first
year graduate students. Some familiarity with topological spaces and groups,
as provided by an undergraduate level topology or algebra class, is welcome.
Last modified:
April 7, 2003
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