Compact manifolds with positive 2-curvature

Abstract

The Schouten tensor \ A \ of a Riemannian manifold \ (M,g) provides important scalar curvature invariants σk, that are the symmetric functions on the eigenvalues of A, where, in particular, σ1 \ coincides with the standard scalar curvature \ (g). Our goal here is to study compact manifolds with positive \ 2-curvature, \ i.e., when σ1(g)>0 and σ2(g)>0. In particular, we prove that a 3-connected non-string manifold M admits a positive2-curvature metric if and only if it admits a positive scalar curvature metric. Also we show that any finitely presented group π can always be realised as the fundamental group of a closed manifold of positive 2-curvature and of arbitrary dimension greater than or equal to six.