Sobolev stability of the PMT and RPI using IMCF

Abstract

We study the Sobolev stability of the Positive Mass Theorem (PMT) and the Riemannian Penrose Inequality (RPI) in the case where a region of a sequence of manifolds M3i can be foliated by a smooth solution of Inverse Mean Curvature Flow (IMCF) which is uniformly controlled for time t ∈ [0,T]. In particular, we consider a sequence of regions of manifolds UTi⊂ Mi3, foliated by a IMCF, t, such that if ∂ UTi = 0i Ti and mH(Ti) → 0 then UTi converges in W1,2 to a flat annulus or in the hyperbolic setting it converges to a annulus portion of hyperbolic space. If instead mH(Ti)-mH(0i) → 0 and mH(Ti) → m >0 then we show that UTi converges in W1,2 to a topological annulus portion of the Schwarzschild metric or in the Hyperbolic case to a topological annulus portion of the Anti-de~Sitter Schwarzschild metric.