Estimates of the Bartnik mass

Abstract

Given a metric γ of nonnegative Gauss curvature and a positive function H on a 2-sphere , we estimate the Bartnik quasi-local mass of (, γ, H) in terms of the area, the total mean curvature, and a quantity depending only on γ, measuring the roundness of the metric. If γ has positive Gauss curvature, the roundness of γ in the estimate is controlled by the ratio between the maximum and the minimum of the Gauss curvature. As 1, the estimate approaches a sharp estimate for round spheres with arbitrary, positive mean curvature functions. Enroute we observe an estimate of the supremum of the total mean curvature among nonnegative scalar curvature fill-ins of a closed manifold with positive scalar curvature.