Convexity of reduced energy and mass angular momentum inequalities

Abstract

In this paper, we extend the work in DChrusLiWeChrusCoCo. We weaken the asymptotic conditions on the second fundamental form, and we also give an L6-norm bound for the difference between general data and Extreme Kerr data or Extreme Kerr-Newman data by proving convexity of the renormalized Dirichlet energy when the target has non-positive curvature. In particular, we give the first proof of the strict mass/angular momentum/charge inequality for axisymmetric Einstein/Maxwell data which is not identical with the extreme Kerr-Newman solution.