Research

My PhD thesis and first paper detail the adelic calculations of Fourier coefficients and the descent of a Siegel Eisenstein series with paramodular level.  My second paper explores the rationality of these Fourier coefficients.  I am currently working on a project related to the functional equation of a Klingen Eisenstein series and on another project where we use theta lifting to construct paramodular forms of weights 0, 1, and 2.

Publications

• Siegel Eisenstein Series with Paramodular Level With Ralf Schmidt. arXiv:2509.04395

• On the rationality of a paramodular Siegel Eisenstein series. arXiv:2510.22762

• Thesis: On Siegel Eisenstein series with level

Conference Talks

• Texas-Oklahoma Representation Theory & Automorphic Forms (TORA) XII 2023

  • Stable Klingen Eisenstein Series (speed talk)

• Automorphic Forms Workshop 2025

  • Fourier Coefficients of Siegel Eisenstein Series

• AMS 2025 Fall Southeastern Sectional Meeting: Modular Forms in Combinatorics and Number Theory 2025

  • Fourier Coefficients of Paramodular Siegel Eisenstein Series

• Joint Mathematics Meeting (JMM) 2026

• Texas-Oklahoma Representation Theory & Automorphic Forms (TORA) XV 2026

• Automorphic Forms Workshop 2026