ACADEMIC RESEARCH & EDUCATION
Algebraic Geometry • Number Theory
My doctoral research focused on algebraic geometry and number theory, where I studied the Galois module structure of sheaves on algebraic curves with group actions (weakly ramified covers).
At Michigan State University, I taught over seven years of core calculus and differential equations courses, reaching hundreds of students across STEM majors. I also collaborated with math educators on curriculum development, including first proof-based mathematics and technology-assisted advanced calculus. My teaching was recognized with the university’s Excellence in Teaching Award.
Before graduate school, I earned additional degrees in Statistics and Business Administration, which continue to shape my approach to applied research and industry problem-solving.
For a detailed list of research papers, teaching history, and curriculum projects, see below to contact me.
Related
- Galois Module Structure of Weakly Ramified Covers of Curves (Michigan State University, 2020)
Degrees
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Ph. D. in Mathematics, Michigan State University
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B.S. in Mathematics, Stony Brook University
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B.S. in Statistics, Sungkyunkwan University
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B.S. in Business Administration, Sungkyunkwan University