Scalar curvature and harmonic maps to S1

Abstract

For a harmonic map u:M3 S1 on a closed, oriented 3--manifold, we establish the identity 2π ∫θ∈ S1(θ)≥ 12∫θ∈ S1∫_θ(|du|-2|Hess(u)|2+RM) relating the scalar curvature RM of M to the average Euler characteristic of the level sets θ=u-1\θ\. As our primary application, we extend the Kronheimer--Mrowka characterization of the Thurston norm on H2(M;Z) in terms of \|RM-\|L2 and the harmonic norm to any closed 3--manifold containing no nonseparating spheres. Additional corollaries include the Bray--Brendle--Neves rigidity theorem for the systolic inequality ( RM)sys2(M)≤ 8π, and the well--known result of Schoen and Yau that T3 admits no metric of positive scalar curvature.