Past Events
I will discuss joint work with Hutchings which constructs nonequivariant anda family Floer equivariant version of contact homology. Both theories are generatedby two copies of each Reeb orbit over Z and capture interesting torsion information.We will…
Abstract
The AKSZ construction, as implemented by Pantev-To ̈en-Vaqui ́e-Vezzosi inthe context of derived algebraic geometry, gives a symplectic structure on the derived stackof maps from an oriented compact manifold to a symplectic derived stack. I will describe…
The Fourier transform is a fundamental symmetry of functions on the real line,
intertwining additive and multiplicative structures. It turns out that this symmetry
is not at all unique to R, and can be defined in the exact same way for functions
on the p-adic…
When a projective variety is linearly projected onto a projective space of the same dimension, a ramification divisor appears. In joint work with Anand Deopurkar and Eduard Duryev, we study basic questions about the map which sends a projection to its ramification divisor. I will present proven…
We prove that the two-primary subgroups of the class groups of imaginary quadratic fields have the distribution predicted by the Cohen-Lenstra-Gerth heuristic. In this talk, we will detail our method for proving the 8-class rank portion of this theorem and will compare our approach to one that…
We'll ponder a few uncertainty principles, which prevent a function and its Fourier transform from being simultaneously localized. With some complex analytic sorcery, we'll prove a pleasant variant due to Beurling.
A positive integer d is called a congruent number if there exists a right triangle with rational side lengths whose area is d. After giving some…