Rachel Webb

Assistant Research Professor

Research Focus

I study algebro-geometric problems motivated by Gromov-Witten theory, especially questions about moduli of (oribifold) curves and stable (quasi)maps. A major theme of my research is to understand physical linear sigma models; that is, to understand how invariants of X can be read from a GIT presentation of X, invoking representation theory and stability theory. Part of this program is developing new moduli of curves that can more deeply probe the geometry of X.

Publications

MATH Courses - Fall 2024

MATH Courses - Spring 2025

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