On the Moduli Space of Asymptotically Flat Manifolds with Boundary and the Constraint Equations (1911.02687v4)

Abstract: Let $X$ be a closed $3$-manifold, $\mathcal{M}{R>0}$ the space of metrics on $X$ with positive scalar curvature, and $\text{Diff}(X)$ the group of diffeomorphisms of $X$. Marques proves the fundamental result that $\mathcal{M}{R>0}/ \text{Diff}(X)$ 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 $\mathbb{R}^3$ 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 $\mathbb{R}^3\backslash B^3$ is path connected. The differential topology part of Marques' argument no longer yields the desired result for $\mathbb{R}^3\setminus B^3$, 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.