In my PhD thesis, I calculated the RO(G)-graded Bredon
cohomology of the equivariant classsifying space B_{G}SU(2) for certain cyclic groups G.

In my ScB thesis, I used an analog of Minkowski’s “geometry of numbers” to prove Hermite’s theorem for function fields.

In this paper, my coauthors and I computed the Galois group of a tower of function fields produced by iterating a certain rational map.

In this project for my complex analysis class at UChicago, I gave a brief overview of how the Riemann zeta function relates to the distribution of prime numbers.

Here are some of my course notes.