My research interests lie at the interface between the interconnected fields of algebraic geometry and representation theory. Algebraic geometry is the study of spaces defined by solutions of polynomial equations, while representation theory is the study of symmetry in all its many forms. My work in these areas ranges from geometric problems inspired by representation theory (such as my thesis work on the elliptic Grothendieck-Springer resolution), to geometry with serious representation-theoretic consequences (proper geometric representation theory, such as my work on mixed Hodge modules and real reductive groups), to algebraic constructions in geometric contexts (such as my work in progress on elliptic quantum groups).

A list of papers I have written (or am in the process of writing) can be found below.

Preprints:

Published papers:

In preparation:

Other: