On a stratification of positive scalar curvature compact manifolds

Abstract

For a compact PSC Riemannian n-manifold (M,g), the metric constant Riem(g)∈ (0, n2] is defined to be the infinimum over M of the spectral scalar curvature Σi=1Nλiλ max of g, where λ1, ...,λN are the eigenvalues of the curvature operator of g and λ max is the maximal eigenvalue. The functional g Riem(g) is continuous, re-scale invariant and defines a stratification of the space of PSC metrics over M. We introduce as well the smooth constant Riem(M)∈ (0, n2], which is the supremum of Riem(g) over the set of all psc Riemannian metrics g on M. \\ In this paper, we show that in the top layer, compact manifolds with Riem=n2 are positive space forms. No manifolds have their Riem in the interval (n2-2, n2). The manifold Sn-1× S1 and arbitrary connected sums of copies of it with connected sums of positive space forms all have Riem=n-12. For 1≤ p≤ n-2≤ 5, we prove that the manifolds Sn-p× Tp take the intermediate values Riem=n-p2. From the bottom, we prove that simply connected (resp. 2-connected, 3-connected and non-string) compact manifolds of dimension ≥ 5 (resp. ≥ 7, ≥ 9) have Riem≥ 1 (resp. ≥ 3, ≥ 6). The proof of these last three results is based on surgery. In fact, we prove that the smooth Riem constant doesn't decrease after a surgery on the manifold with adequate codimension.