On the Moduli Space of Asymptotically Flat Manifolds with Boundary and the Constraint Equations

Abstract

Let X be a closed 3-manifold, MR>0 the space of metrics on X with positive scalar curvature, and Diff(X) the group of diffeomorphisms of X. Marques proves the fundamental result that MR>0/ Diff(X) is path connected. Using this and the theorem of Cerf in differential topology, Marques shows that the space of asymptotically flat metrics with nonnegative scalar curvature on R3 is path connected. Based on Carlotto-Li's generalization of Marques' result to the case of compact manifold with boundary, we show that the space of asymptotically flat metrics with nonnegative scalar curvature and mean convex boundary on R3 B3 is path connected. The differential topology part of Marques' argument no longer yields the desired result for R3 B3, but we bypass this issue by finding a more elementary proof. We also include a path-connectedness result for the space of black hole initial data sets, which can be thought of as a necessary condition for the Final State Conjecture.