Extrinsic black hole uniqueness in pure Lovelock gravity

Abstract

We define a notion of extrinsic black hole in pure Lovelock gravity of degree k which captures the essential features of the so-called Lovelock-Schwarzschild solutions, viewed as rotationally invariant hypersurfaces with null 2k-mean curvature in Euclidean space Rn+1, 2≤ 2k≤ n-1. We then combine a regularity argument with a rigidity result by Ara\'ujo-Leite to prove, under a natural ellipticity condition, a global uniqueness theorem for this class of black holes. As a consequence we obtain, in the context of the corresponding Penrose inequality for graphs established by Ge-Wang-Wu, a local rigidity result for the Lovelock-Schwarzschild solutions.