Nonpositively curved 4-manifolds with zero Euler characteristic

Abstract

We show that for any closed nonpositively curved Riemannian 4-manifold M with vanishing Euler characteristic, the Ricci curvature must degenerate somewhere. Moreover, for each point p∈ M, either the Ricci tensor degenerates or else there is a foliation by totally geodesic flat 3-manifolds in a neighborhood of p. As a corollary, we show that if in addition the metric is analytic, then the universal cover of M has a nontrivial Euclidean de Rham factor. Finally we discuss how this result creates an implication of conjectures on simplicial volume in dimension four.