Thursday, September 14, 2000
| Title |
Turing's Famous Leopards' Spots Problem |
| Speaker |
Professor Richard Stark |
| Time |
12:00-01:00 p.m. |
| Place |
PHY 108 |
Thursday, September 28, 2000
| Title |
Turing's Famous Leopards' Spots Problem, II |
| Speaker |
Professor Richard Stark |
| Time |
12:00-01:00 p.m. |
| Place |
PHY 108 |
Thursday, October 6, 2000
| Title |
Turing's Famous Leopards' Spots Problem, III |
| Speaker |
Professor Richard Stark |
| Time |
12:00-01:00 p.m. |
| Place |
PHY 108 |
Thursday, October 19, 2000
| Title |
Topological Entropy of Shift Spaces |
| Speaker |
Jamie Oberste-Vorth |
| Time |
12:00-01:00 p.m. |
| Place |
PHY 108 |
Abstract
In this talk I'll present the definition of entropy for compact metrizable
spaces then prove a theorem which enables the entropy to be more easily computed
for shift spaces over the integers. Then I'll expand the theorem to include
shift spaces over Z×Z. Finally, I'll include some
information about the entropy of shift spaces over some other groups.
Thursday, October 26, 2000
| Title |
Topological Entropy of Shift Spaces, II |
| Speaker |
Jamie Oberste-Vorth |
| Time |
12:00-01:00 p.m. |
| Place |
PHY 108 |
Thursday, November 2, 2000
| Title |
The Rigidity Question for Coxeter Groups |
| Speaker |
Dr. Anton Kaul |
| Time |
12:00-01:00 p.m. |
| Place |
PHY 108 |
Abstract
Coxeter groups are often defined as those having a presentation in which generators
have order 2 and all other relations involve only pairs of generators. From
a geometric standpoint it is preferable to define Coxeter groups as those that
act "by reflections" on some topological space. It turns out that these two
definitions are equivalent.
We will discuss the basic definitions and results on Coxeter groups, focusing
on the geometric aspects. In particular we will see that any Coxeter group acts
by isometries on a complete CAT(0) space (i.e., a metric space of non-positive
curvature in the sense of Gromov) called the Davis complex.
The geometry of the Davis complex facilitates a topological approach to the
"rigidity question" for Coxeter groups (a Coxeter group W is rigid
if, given any two generating sets S and S' for W,
there is an automorphism of W which carries S to S').
Thursday, November 9, 2000
| Title |
The Rigidity Question for Coxeter Groups, II |
| Speaker |
Dr. Anton Kaul |
| Time |
12:00-01:00 p.m. |
| Place |
PHY 108 |
Thursday, November 16, 2000
| Title |
The Rigidity Question for Coxeter Groups, III |
| Speaker |
Dr. Anton Kaul |
| Time |
12:00-01:00 p.m. |
| Place |
PHY 108 |
Thursday, November 30, 2000
| Topic |
Discrete Mathematics Program Development |
| Time |
12:00-01:00 p.m. |
| Place |
First Watch Restaurant |
Thursday, December 7, 2000
| Topic |
Discrete Mathematics Program Development, II |
| Time |
12:00-01:00 p.m. |
| Place |
PHY 108 |
Please direct questions to mthmaster@nosferatu.cas.usf.edu.
Last updated: 05-Dec-2000.
Copyright © 2000, USF Department of Mathematics.