On Gromov's conjecture for totally non-spin manifolds

Abstract

Gromov's Conjecture states that for a closed n-manifold M with positive scalar curvature the macroscopic dimension of its universal covering M satisfies the inequality mc M n-2G2. We prove this inequality for totally non-spin n-manifolds whose fundamental group is a virtual duality group with vcd n. In the case of virtually abelian groups we reduce Gromov's Conjecture for totally non-spin manifolds to the vanishing problem whether Hn(Tn)+= 0 for the n-torus Tn where Hn(Tn)+⊂ Hn(Tn) is the subgroup of homology classes which can be realized by manifolds with positive scalar curvature.