MATH 735 —
Spring 1999
Topics in Algebra
Instructor: Louis Billera
Time: MW 8:40-9:55
Room: WE B25
An introduction to arrangments of hyperplanes, matroids and
oriented matroids, with an emphasis on enumerative properties of each
and their interrelations. In particular, we will consider the work of
Zaslavsky relating the numbers of region cut out by an arrangment of hyperplanes
in n dimensions to the various polynomials defined over the related intersection
matroid.
As background, we will develop some of the basic methods
of algebraic combinatorics, such as Moebius inversion on posets and lattices,
and use them to relate the basic topological properties of these objects
to their enumerative properties.
Prerequsites: graduate standing or permission of instructor
Last modified:
April 7, 2003
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