Critical points of Wang-Yau quasi-local energy

Abstract

In this paper, we prove the following theorem regarding the Wang-Yau quasi-local energy of a spacelike two-surface in a spacetime: Let be a boundary component of some compact, time-symmetric, spacelike hypersurface in a time-oriented spacetime N satisfying the dominant energy condition. Suppose the induced metric on has positive Gaussian curvature and all boundary components of have positive mean curvature. Suppose H H0 where H is the mean curvature of in and H0 is the mean curvature of when isometrically embedded in R3. If is not isometric to a domain in R3, then 1. the Brown-York mass of in is a strict local minimum of the Wang-Yau quasi-local energy of , 2. on a small perturbation of in N, there exists a critical point of the Wang-Yau quasi-local energy of .