Constant scalar curvature equation and the regularity of its weak solution

Abstract

In this paper we study constant scalar curvature equation (CSCK), a nonlinear fourth order elliptic equation, and its weak solutions on K\"ahler manifolds. We first define a notion of weak solution of CSCK for an L∞ K\"ahler metric. The main result is to show that such a weak solution (with uniform L∞ bound) is smooth. As an application, this answers in part a conjecture of Chen regarding the regularity of K-energy minimizers. The new technical ingredient is a W2, 2 regularity result for the Laplacian equation g u=f on K\"ahler manifolds, where the metric has only L∞ coefficients. It is well-known that such a W2, 2 regularity (W2, p regularity for any p>1) fails in general (except for dimension two) for uniform elliptic equations of the form aij∂2iju=f for aij∈ L∞, without certain smallness assumptions on the local oscillation of aij. We observe that the K\"ahler condition plays an essential role to obtain a W2, 2 regularity for elliptic equations with only L∞ elliptic coefficients on compact manifolds.