Proof of the bounded conformal conjecture

Abstract

Given any asymptotically flat 3-manifold (M,g) with smooth, non-empty, compact boundary , the conformal conjecture states that for every δ>0, there exists a metric g' = u4 g, with u a harmonic function, such that the area of outermost minimal area enclosure g' of with respect to g' is less than δ. Recently, the conjecture was used to prove the Riemannian Penrose inequality for black holes with zero horizon area, and was proven to be true under the assumption of existence of only a finite number of minimal area enclosures of boundary , and boundedness of harmonic function u. We prove the conjecture assuming only the boundedness of u.