Optimal decay constant for complete manifolds of positive scalar curvature with quadratic decay

Abstract

We prove that if an orientable 3-manifold M admits a complete Riemannian metric whose scalar curvature is positive and has at most C-quadratic decay at infinity for some C > 23, then it decomposes as a (possibly infinite) connected sum of spherical manifolds and S2× S1 summands. Consequently, M carries a complete Riemannian metric of uniformly positive scalar curvature. The decay constant 23 is sharp, as demonstrated by metrics on R2 × S1. This improves a result of Balacheff, Gil Moreno de Mora Sard\`a, and Sabourau, and partially answers a conjecture of Gromov. The main tool is a new exhaustion result using μ-bubbles. In dimensions n = 4, 5, we further extend results of Chodosh--Maximo--Mukherjee and Sweeney, and obtain topological obstructions to the existence of a complete Riemannian metric whose scalar curvature is positive and has at most C-quadratic decay at infinity for some C > n-1n on certain noncompact contractible n-manifolds.