Research Summary
My current research interests are in the general areas of algebraic geometry and mathematical physics. More specifically I am working on Gromov–Witten theory and its relations with and applications to birational geometry, K-theory, symplectic topology, integrable systems, representation theory, and mirror symmetry.
Education
- PhD, Mathematics, University of California at Berkeley
Biography
After receiving my PhD degree in mathematics from U.C. Berkeley in 1999, I taught in UCLA and Princeton Univesity before moving to University of Utah. My current research interests are in the general areas of algebraic geometry and mathematical physics. More specifically I am working on Gromov–Witten theory and its relations with and applications to birational geometry, Hodge theory, K-theory, symplectic topology, integrable systems, representation theory, and mirror symmetry.