please, take me home!!!!
I am studying number theory under Professor Harold Stark. My
interests range from class number type problems to explicit or
computational class field theory (in the spirit of Hilbert's 12th) to
modular units. For a while I was thinking about class numbers of CM
fields, however now I am thinking about Siegel units.
If you know any beautiful results combining seemingly disparate areas
of mathematics, send 'em my way. I'll buy you a beer.
A few math-related links:
UCSD Math Department homepage
MIT Math Department homepage
I am currently TAing math 109 (introduction to mathematical
thinking). In the past I have taght 10a, 20a, 20b, and 10c (various
calculi), 109 (introduction to mathematical thinking), 104 (number
theory), 102 (upper division linear algebra), and 103 (abstract
algebra).
As an undergrad I worked with REACH on some
combinatorics research.
I also worked at PROMYS , a summer program in
elementary number theory for high school students.
mathscinet.
here's the uc davis front
for arXiv.
jstor.
online
encyclopedia of integer sequences.
mathworld.
To find all of Gauss' publications, search here.
clay math.
modular.
kid's drawings.