On geometric problems related to Brown-York and Liu-Yau quasilocal mass

Abstract

We discuss some geometric problems related to the definitions of quasilocal mass proposed by Brown-York BYmass1 BYmass2 and Liu-Yau LY1 LY2. Our discussion consists of three parts. In the first part, we propose a new variational problem on compact manifolds with boundary, which is motivated by the study of Brown-York mass. We prove that critical points of this variation problem are exactly static metrics. In the second part, we derive a derivative formula for the Brown-York mass of a smooth family of closed 2 dimensional surfaces evolving in an ambient three dimensional manifold. As an interesting by-product, we are able to write the ADM mass ADM61 of an asymptotically flat 3-manifold as the sum of the Brown-York mass of a coordinate sphere Sr and an integral of the scalar curvature plus a geometrically constructed function (x) in the asymptotic region outside Sr . In the third part, we prove that for any closed, spacelike, 2-surface in the Minkowski space 3,1 for which the Liu-Yau mass is defined, if bounds a compact spacelike hypersurface in 3,1, then the Liu-Yau mass of is strictly positive unless lies on a hyperplane. We also show that the examples given by \'O Murchadha, Szabados and Tod MST are special cases of this result.