The Weyl functional on 4-manifolds of positive Yamabe invariant

Abstract

It is shown that on every closed oriented Riemannian 4-manifold (M,g) with positive scalar curvature, ∫M|W+g|2dμg≥ 2π2(2(M)+3τ(M))-8π2|π1(M)|, where W+g, (M) and τ(M) respectively denote the self-dual Weyl tensor of g, the Euler characteristic and the signature of M. This generalizes Gursky's inequality gur for the case of b1(M)>0 in a much simpler way. We also extend all such lower bounds of the Weyl functional to 4-orbifolds including Gursky's inequalities for the case of b2+(M)>0 or δgW+g=0, and obtain topological obstructions to the existence of self-dual orbifold metrics of positive scalar curvature.