Band width estimates via the Dirac operator

Abstract

Let M be a closed connected spin manifold such that its spinor Dirac operator has non-vanishing (Rosenberg) index. We prove that for any Riemannian metric on V = M × [-1,1] with scalar curvature bounded below by σ > 0, the distance between the boundary components of V is at most Cn/σ, where Cn = (n-1)/n · C with C < 8(1+2) being a universal constant. This verifies a conjecture of Gromov for such manifolds. In particular, our result applies to all high-dimensional closed simply connected manifolds M which do not admit a metric of positive scalar curvature. We also establish a quadratic decay estimate for the scalar curvature of complete metrics on manifolds, such as M × R2, which contain M as a codimension two submanifold in a suitable way. Furthermore, we introduce the "KO-width" of a closed manifold and deduce that infinite KO-width is an obstruction to positive scalar curvature.