SinGular Monge-Ampère equations

This project is driven by M-theory, String theory in theoretical physics and the Minimal Model Problem in algebraic geometry.

We study singular Khler spaces with a focus on their special structures (of a differential geometry nature) and their interaction with various areas of analysis.To be more specific, we search for special (singular) Khler metrics with nice curvature properties, such as Khler-Einstein (KE) or constant scalar curvature (cscK) metrics.

The problem of the existence of these metrics can be reformulated in terms of a Monge-Ampre equation, which is a non-linear partial differential equation (PDE).

The KE case has been settled by Aubin, Yau (solving the Calabi conjecture), and Chen-Donaldson-Sun (solving the Yau-Tian-Donaldson conjecture); the cscK case has been very recently worked out by Chen-Cheng (solving a conjecture due to Tian).

However, these results only hold on smooth Khler manifolds, and one still needs to deal with singular varieties.This is where Pluripotential Theory comes into the play.

Boucksom-Eyssidieux-Guedj-Zeriahi and the author, along with Darvas and Lu, have demonstrated that pluripotential methods are very flexible and can be adapted to work with (singular) Monge-Ampre equations.

Finding a solution to this type of equations that is smooth outside of the singular locus is equivalent to the existence of singular KE or cscK metrics.At this point a crucial ingredient is missing: the regularity of these (weak) solutions.

The main goal of SiGMA is to address this challenge by using new techniques and ideas, which might also aid in tackling problems in complex analysis and algebraic geometry.The PI will establish a research group at her host institution focused on regularity problems of non-linear PDEs and geometric problems in singular contexts.

The goal is to create a center of research excellence in this topic.