I am a second-year PhD student in mathematics at UC Davis.
My research interests lie in algebraic combinatorics and combinatorial algebraic geometry. Keywords include: Lorentzian polynomials, Toric Varieties, Lie groups/algebras, Ehrhart theory.
In June 2023, I graduated from the mathematics master's program at Stockholm University and KTH Royal Institute of Technology (Sweden) while fully supported by Stockholm University's International Student Scholarship. For my thesis, I worked on Symmetric Lorentzian Polynomials under the guidance of Petter Brändén.
In June 2021, I graduated from Kalamazoo College (MI) with a double bachelor's with honors in (1) mathematics and honors in (2) physics. I also (3) minored in philosophy. I wrote an expository thesis on Mutually Unbiased Bases under the guidance of Michele Intermont.
As a graduate student, I contribute to the mathematics community through research and teaching assistantship. This Spring 2025, I am a supported as a graduate research assistant for Greg Kuperberg.
As an educator, I uphold Federico Ardila's axioms of mathematics (paraphrased below).
Axiom 1. Mathematical potential is equally present in different groups, irrespective of geographic, demographic, and economic boundaries.
Axiom 2. Everyone can have joyful, meaningful, and empowering mathematical experiences.
Axiom 3. Mathematics is a powerful, malleable tool that can be shaped and used differently by various communities to serve their needs.
Axiom 4. Every student deserves to be treated with dignity and respect.
(Masters thesis, 2023). Symmetric Lorentzian Polynomials.
(Publication, 2022). On Konstant's Weight q-multiplicity Formula for sp_6(C).
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