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Math
751 — Fall 2001
Seminar in Topology: Arrangements of Hyperplanes
| Instructor: |
Edward Swartz |
| Time: |
MWF 1:25–2:15 |
| Room: |
Malott 205 |
Text: P. Orlik, Introduction to Arrangements, C.B.M.S.
Lecture Notes, AMS 1989.
Originally motivated by Arnold's beautiful formula for the cohomology
of the pure braid space, a K(G,1) for the pure braid group, the
topology of the complement of a complex hyperplane arrangement is still
an active area of research. How much of the topology of such a space is
determined by the intersection lattice of the arrangement? When is it
a K(G,1)? What can we say about the fundamental group? We will
begin with Orlik's Introduction to Arrangements, and then continue
in whatever direction is of most interest to the class.
As is traditional for this course, after a brief introduction by the
instructor the material will be presented by the students.
Last modified:
April 7, 2003
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