My work is in **Kähler geometry**. I study a GIT-style notion of **stability** relevant in the detection of canonical metrics in the case when the the variety is polarized by a positive line bundle. Compact polarized manifolds are projective varieties that come equipped with a family of metrics, the Bergman metrics. Therefore these manifolds are equally amenable to the tools of geometric analysis and algebraic geometry. My advisor is Sean Paul.

Discriminants and Higher K-Energies on Polarized Kähler Manifolds (2015)[http://arxiv.org/abs/1507.01152]

Princeton University, Differential Geometry and Geometric Analysis Seminar, Dec 11, 2015 [Slides]

University of Wisconsin-Madison, Geometry and Topology Seminar, Dec 4, 2015

Kähler Geometry, Einstein Metrics, and Generalizations, MSRI, March 21-25, 2016

Summer School in Geometric Analysis, Northwestern, July 6-12, 2015

Workshop on Ricci Curvature, Northwestern, May 28-31, 2015

Recent Advances in Kähler Geometry, Vanderbilt, May 18-22, 2015

Graduate Workshop on 4-Manifolds, SCGP, August 18-22, 2014

Graduate Workshop in Kähler Geometry, SCGP, June 24-July 5, 2013

Office: 816 Van Vleck Hall

Department of Mathematics

Van Vleck Hall / 480 Lincoln Dr.

University of Wisconsin - Madison

Madison, WI 53706-1388

(my last name)@math.wisc.edu

608-262-3546