Quasilocal energy and surface geometry of Kerr spacetime

Abstract

We study the quasi-local energy (QLE) and the surface geometry for Kerr spacetime in the Boyer-Lindquist coordinates without taking the slow rotation approximation. We also consider in the region r≤2m, which is inside the ergosphere. For a certain region, r>rk(a), the Gaussian curvature of the surface with constant t,r is positive, and for r>3a the critical value of the QLE is positive. We found that the three curves: the outer horizon r=r+(a), r=rk(a) and r=3a intersect at the point a=3m/2, which is the limit for the horizon to be isometrically embedded into R3. The numerical result indicates that the Kerr QLE is monotonically decreasing to the ADM m from the region inside the ergosphere to large r. Based on the second law of black hole dynamics, the QLE is increasing with respect to the irreducible mass Mir. From a results of Chen-Wang-Yau, we conclude that in a certain region, r>rh(a), the critical value of the Kerr QLE is a global minimum.