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Math
731 — Fall 2001
Enumerative Combinatorics
| Instructor: |
Louis Billera |
| Time: |
TR 11:40–12:55 |
| Room: |
Malott 206 |
A general introduction to algebraic combinatorics with a particular
emphasis on methods of enumeration in ordered and geometric structures
(partially ordered sets, complexes and polytopes). Topics to be included
(as time permits) are:
- General techniques of generating functions,
- Partially ordered sets (posets) and lattices,
- Möbius inversion (inclusion-exclusion over posets),
- Posets as topological objects,
- Generating functions of combinatorial objects as Hilbert functions
of algebraic objects, and the influence of topological properties on
both.
- An introduction to quasisymmetric functions and their relevance to
all of the above.
I will assume only a basic knowledge of linear algebra and ring theory
(say at the level of Math 433-4) and will develop the necessary ideas
from commutative algebra as they are needed. Much (but not all) of what
we do can be found in Stanley's book Enumerative Combinatorics,
Vol. I (Cambridge, 1997), Chapters 1 and 3.
Last modified:
April 7, 2003
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