MATH 651: Algebraic
Topology (Spring 2006)
Instructor:
Karen Vogtmann
Meeting
Time & Room
One of the core topology courses in the mathematics graduate program.
An introductory study of certain geometric processes for associating algebraic
objects such as groups to topological spaces. The most important of these
are homology groups and homotopy groups, especially the first homotopy
group or fundamental group, with the related notions of covering spaces
and group actions. The development of homology theory focuses on verification
of the Eilenberg-Steenrod axioms and on effective methods of calculation
such as simplicial and cellular homology and Mayer-Vietoris sequences.
If time permits, the cohomology ring of a space may be introduced.
Last modified:
October 6, 2005
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