Calendar
Calendar
Posted November 15, 2025
Last modified January 21, 2026
Algebra and Number Theory Seminar Questions or comments?
2:00 pm – 3:00 pm Lockett 233 or click here to attend on Zoom
Olivia Beckwith, Tulane University
Polyharmonic Maass forms and Hecke series for real quadratic fields
We study polyharmonic Maass forms and show that they are related to ray class extensions of real quadratic fields. In particular, we generalize work of Lagarias and Rhoades to give a basis for the space of polyharmonic Maass forms for $\Gamma(N)$. Modifying an argument of Hecke, we show that twisted traces of cycle integrals of certain depth 2 polyharmonic Maass forms are leading coefficients of Hecke $L$-series of real quadratic fields. This is ongoing joint work with Gene Kopp.
Event contact: Gene Kopp
Posted January 16, 2026
Last modified February 2, 2026
Algebra and Number Theory Seminar Questions or comments?
2:00 pm – 3:00 pm Lockett 233 or click here to attend on Zoom
Koustav Mondal, Louisiana State University
Theta series and their applications
Theta series play a central role in many areas of mathematics, especially number theory. In this talk, we begin with a brief overview of two applications of theta series: point counting for congruent quadratic forms, and the evaluation of special values of $L$-functions via Ramanujan's theory of elliptic functions to alternative bases for modular forms. Along the way, we state our main results in each setting. In the second part of the talk, we return to these applications to outline the key ideas and techniques involved in the proofs, as time permits.
Event contact: Gene Kopp
Posted November 15, 2025
Last modified January 21, 2026
Algebra and Number Theory Seminar Questions or comments?
2:00 pm – 3:00 pm Lockett 233 or click here to attend on Zoom
Marco Sangiovanni Vincentelli, Columbia University
An Euler system for the adjoint of a modular form
Euler systems have proven to be versatile tools for understanding Selmer groups and their connections to special values of $L$-functions. However, despite the key role they have played in making progress toward foundational conjectures in number theory, such as the Birch and Swinnerton-Dyer and Bloch–Kato Conjectures, only a handful of provably non-trivial Euler systems have been constructed to date. A significant obstacle to constructing Euler Systems lies in producing candidate Galois cohomology classes. This lecture series presents joint work with Chris Skinner that develops a method to overcome this obstacle. Using this method, we construct an Euler system for the adjoint of a modular form.
Event contact: Gene Kopp
Posted November 15, 2025
Last modified March 22, 2026
Algebra and Number Theory Seminar Questions or comments?
1:20 pm – 2:20 pm Lockett 233 or click here to attend on Zoom
Kiran Kedlaya, University of California San Diego
Implementing the hypergeometric trace formula
Given parameters defining a hypergeometric motive, the trace is given by a rather explicit formula which can be written either in terms of Gauss sums (Beukers–Cohen–Mellit) or, thanks to the Gross–Koblitz formula, the Morita p-adic Gamma function (Cohen–Rodriguez Villegas–Watkins). We explain some of the process of turning this formula into an efficient algorithm "at scale", including an adaptation to compute Frobenius traces in "average polynomial time" in the sense of David Harvey's recent Arizona Winter School lectures; that part is joint with Edgar Costa and David Harvey.
Event contact: Hasan Saad and Gene Kopp
Posted March 17, 2026
Last modified March 22, 2026
Algebra and Number Theory Seminar Questions or comments?
2:30 pm – 3:30 pm Lockett 233 or click here to attend on Zoom
Ian Jorquera, Colorado State University
Switching equivalence of systems of lines over finite fields
In this talk we will discuss important frame theoretic objects such at equiangular tight frames (ETFs) whose existence has important applications in fields as diverse as compressed sensing to quantum state tomography. We will then discuss some new approaches to tackling some open problems, on the existence and structure of these frame theoretic objects, by using tools from geometric algebra, and specially looking at frames over finite field vector spaces with Hermitian forms. We will then show that the switching equivalence classes of systems of lines over finite fields which are frames, often only depend on the double and triple products. This allows us to understand ETFs over finite fields in terms of their double and triple products, with a result similar to saturating the Welch bound over $\mathbb{C}$. We also show that similar to the case over $\mathbb{C}$, collections of vectors are similar to a regular simplex essentially when their triple products satisfy a certain property.
Event contact: Gene Kopp
Posted March 17, 2026
Algebra and Number Theory Seminar Questions or comments?
2:00 pm – 3:00 pm Lockett 233 or click here to attend on Zoom
Shahriyar Roshan-Zamir, Tulane University
TBA
Event contact: Gene Kopp