On the stability of the Yamabe invariant of S3

Abstract

Let g be a complete, asymptotically flat metric on R3 with vanishing scalar curvature. Moreover, assume that (R3,g) supports a nearly Euclidean L2 Sobolev inequality. We prove that (R3,g) must be close to Euclidean space with respect to the dp-distance defined by Lee-Naber-Neumayer. We then discuss some consequences for the stability of the Yamabe invariant of S3. More precisely, we show that if such a manifold (R3,g) carries a suitably normalized, positive solution to g w + λ w5 = 0 then w must be close, in a certain sense, to a conformal factor that transforms Euclidean space into a round sphere.