The Obata-V\'etois argument and its applications

Abstract

We simplify V\'etois' Obata-type argument and use it to identify a closed interval In, n ≥ 3, containing zero such that if a ∈ In and (Mn,g) is a closed conformally Einstein manifold with nonnegative scalar curvature and Q4 + aσ2 constant, then it is Einstein. We also relax the scalar curvature assumption to the nonnegativity of the Yamabe constant under a more restrictive assumption on a. Our results allow us to compute many Yamabe-type constants and prove sharp Sobolev inequalities on closed Einstein manifolds with nonnegative scalar curvature. In particular, we show that closed locally symmetric Einstein four-manifolds with nonnegative scalar curvature extremize the functional determinant of the conformal Laplacian, partially answering a question of Branson and rsted.