Variation and rigidity of quasi-local mass

Abstract

Inspired by the work of Chen-Zhang Chen-Zhang, we derive an evolution formula for the Wang-Yau quasi-local energy in reference to a static space, introduced by Chen-Wang-Wang-Yau CWWY. If the reference static space represents a mass minimizing, static extension of the initial surface , we observe that the derivative of the Wang-Yau quasi-local energy is equal to the derivative of the Bartnik quasi-local mass at . Combining the evolution formula for the quasi-local energy with a localized Penrose inequality proved in Lu-Miao, we prove a rigidity theorem for compact 3-manifolds with nonnegative scalar curvature, with boundary. This rigidity theorem in turn gives a characterization of the equality case of the localized Penrose inequality in 3-dimension.