Einstein-type structures, Besse's conjecture and a uniqueness result for a -CPE metric in its conformal class

Abstract

In this paper, we study an extension of the CPE conjecture to manifolds M which support a structure relating curvature to the geometry of a smooth map : M N. The resulting system, denoted by (-CPE), is natural from the variational viewpoint and describes stationary points for the integrated -scalar curvature functional restricted to metrics with unit volume and constant -scalar curvature. We prove both a rigidity statement for solutions to (-CPE) in a conformal class, and a gap theorem characterizing the round sphere among manifolds supporting (-CPE) with a harmonic map.