Bartnik mass via vacuum extensions

Abstract: We construct asymptotically flat, scalar flat extensions of Bartnik data (Σ, γ, H), where γ is a metric of positive Gauss curvature on a two-sphere Σ, and H is a function that is either positive or identically zero on Σ, such that the mass of the extension can be made arbitrarily close to the half area radius of (Σ, γ).In the case of H ≡ 0, the result gives an analogue of a theorem of Mantoulidis and Schoen [13], but with extensions that have vanishing scalar curvature. In the context of initial data sets in g… Show more