On the limiting behavior of the Brown-York quasi-local mass in asymptotically hyperbolic manifolds

TL;DR

This paper proves that the Brown-York quasi-local mass in asymptotically hyperbolic 3-manifolds converges to a value with the expected causal character at infinity, using spinor techniques and boundary value problems.

Contribution

It establishes the asymptotic causal behavior of the Brown-York mass in hyperbolic manifolds using two different spinor-based methods.

Findings

The Brown-York mass has the conjectured causal character at infinity.

The limit of the quasi-local mass can be expressed as a bulk integral with the correct sign.

Alternative proof using Dirac operators confirms the result under geometric assumptions.

Abstract

We show that the limit at infinity of the vector-valued Brown-York-type quasi-local mass along any coordinate exhaustion of an asymptotically hyperbolic $3$-manifold satisfying the relevant energy condition on the scalar curvature has the conjectured causal character. Our proof uses spinors and relies on a Witten-type formula expressing the asymptotic limit of this quasi-local mass as a bulk integral which manifestly has the right sign under the above assumptions. In the spirit of recent work by Hijazi, Montiel and Raulot, we also provide another proof of this result which uses the theory of boundary value problems for Dirac operators on compact domains to show that a certain quasi-local mass, which converges to the Brown-York mass in the asymptotic limit, has the expected causal character under suitable geometric assumptions.