A new conformal invariant on 3-dimensional manifolds

Abstract

By improving the analysis developed in the study of k-Yamabe problem, we prove in this paper that the De Lellis-Topping inequality is true on 3-dimensional Riemannian manifolds of nonnegative scalar curvature. More precisely, if (M3, g) is a 3-dimensional closed Riemannian manifold with non-negative scalar curvature, then \[∫M |Ric- R 3 g|2 dv (g) 9∫M |Ric-R 3 g|2dv(g), \] where R=vol (g)-1 ∫M R dv(g) is the average of the scalar curvature R of g. Equality holds if and only if (M3,g) is a space form. We in fact study the following new conformal invariant \[ Y([g0]):=g∈ C1([g0]) vol(g)∫M 2(g) dv(g) (∫M 1(g) dv(g))2, \] where C1([g0]):=\g=e-2ug0\,|\, R>0\ and prove that Y([g0]) 1/3, which implies the above inequality.