On the evolution of the spacetime Bartnik mass

Abstract

It is conjectured that the full (spacetime) Bartnik mass of a surface is realised as the ADM mass of some stationary asymptotically flat manifold with boundary data prescribed by . Assuming this holds true for a 1-parameter family of surfaces t evolving in an initial data set with the dominant energy condition, we compute an expression for the derivative of the Bartnik mass along these surfaces. An immediate consequence of this formula is that the Bartnik mass of t is monotone non-decreasing whenever t flows outward. It is our pleasure to dedicate this paper to Robert Bartnik on the occasion of his 60th birthday.