Office: 209, Math Tower
I am a sixth-year Mathematics Ph.D. student at the Ohio State University. I am on the job market in this 2021-2022 academic year.
My interest is in algebraic geometry and combinatorial algebraic geometry, especially, singularities of algebraic varieties, the geometry of algebraic curves and their moduli, Brill-Noether type problem. Plus, I am pretty wide open to study arithmetic geometry.
My advisor is David E. Anderson.
Before coming to OSU, I earned a master degree in Mathematics at Seoul National Univ. and a Bachelor’s degree in Mathematics and Physics with the Golden Ring of Honor, Ranked 1st, from College of Natural Sciences at Kookmin Univ.
A curriculum vitae is available on request.
Publications [MathSciNet Profile]
- (Joint with D. Anderson, T. Ikeda, R. Kawago) Multiplicities of Schubert varieties in the symplectic flag variety,
Sém. Lothar. Combin. 82B (2020), Art. 95, 12 pp.
[Journal Version] [PDF]
- Covexillary Schubert varieties and Kazhdan-Lusztig polynomials, available upon request.
- Euler characteristics of Brill-Noether loci on Prym varieties.
Distinctions Talks Conferences Teaching Notes
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