Coupled continuity equations for constant scalar curvature K\"ahler metrics

Abstract

Inspired by a parabolic system of Li-Yuan-Zhang and the continuity equation of La Nave-Tian, we study a system of elliptic equations for a K\"ahler metric ω and a closed (1, 1)-form α. Assuming a uniform estimate for ω, we prove higher order estimates and smooth convergence to a cscK metric coupled to a harmonic (1, 1)-form. A simplification of the system is used to recover existence results for K\"ahler-Einstein metrics when c1(X) < 0. On Riemann surfaces with genus at least 2, we show smooth convergence to the unique K\"ahler-Einstein metric from a large class of initial data.