No metrics with Positive Scalar Curvatures on Aspherical 5-Manifolds

Abstract

A metric space X is called uniformly acyclic if there there exists an acyclicty control function R=R(r)=RX(r)≥ r , 0≤ r <∞, such that the homology inclusion homomorphisms between the balls around all points x∈ X, Hi(Bx(r)) Hi(Bx(R)) vanish for all i=1,2,…. We show that if a complete orientable m-dimensional manifold X of dimension m≤ 5 admits a proper (infinity goes to infinity) distance decreasing map to a complete m-dimensional uniformly acyclic manifold, then the scalar curvature of X can't be uniformly positive, ∈f x∈ XSc(X,x) ≤ 0. Since the universal coverings X of compact aspherical manifolds X are uniformly acyclic, (in fact, uniformly contractible), these X, admit no metrics with Sc>0 for dim (X)≤ 5. Our argument, that depends on torical symmetrization of stable μ-bubbles, is inspired by the recent paper by Otis Chodosh and Chao Li on non-existence of metrics with Sc>0 on aspherical 4-manifolds and is also influenced by the ideas of Jintian Zhu and Thomas Richard.