MTHSC 952
Notes And Homework
Notes and Homework will be collected weekly.
You will maintain a accurate set of notes in LaTeX.
Several problems will be posed in the course notes each week.
You will select two per week for which you will
provide solutions. These solutions will be posted in the appropriate place
in the notes.
Class Presentation
Presentations will begin on 7 March 2017.
Here are some possible topics for class presentations
-
Alternative proof of the Prime Number Theorem
Andrew Pangia
- Meromorphic Continuation for \zeta(s).
Haodong Li
- Infinitude of zeroes of \zeta(s) on the critical line
Soumendra Ganguly
-
Dirichlet's Theorem on primes in arithmetic progressions
Patrick Dynes
- Bernouli numbers that special values of Dirichlet L-series
Hugh Geller
-
Rademacher's exact formula for the partition function
Amy Grady
-
Dirichlet's class number formula
Rebecca RAmos
-
Introduction to Sieve Theory (Section 9.1 in Murty)
-
General Dirichlet Series.
Aaron Ramirez Flores