Some estimates of Wang-Yau quasilocal energy

Abstract

Given a spacelike 2-surface in a spacetime N and a constant future timelike unit vector T0 in 3,1, we derive upper and lower estimates of Wang-Yau quasilocal energy E(, X, T0) for a given isometric embedding X of into a flat 3-slice in 3,1. The quantity E(, X, T0) itself depends on the choice of X, however the infimum of E(, X, T0) over T0 does not. In particular, when lies in a time symmetric 3-slice in N and has nonnegative Brown-York quasilocal mass (), our estimates show that ∈fT0E(, X, T0) equals (). We also study the spatial limit of ∈fT0E(Sr,Xr,T0), where Sr is a large coordinate sphere in a fixed end of an asymptotically flat initial data set (M, g, p) and Xr is an isometric embeddings of Sr into R3 ⊂ R3,1. We show that if (M, g, p) has future timelike ADM energy-momentum, then r∞∈fT0E(Sr,Xr,T0) equals the ADM mass of (M, g, p).