Lower Ricci Curvature and Nonexistence of Manifold Structure

Abstract

It is known that a limit (Mnj,gj) (Xk,d) of manifolds Mj with uniform lower bounds on Ricci curvature must be k-rectifiable for some unique X:= k≤ n = Mj. It is also known that if k=n, then Xn is a topological manifold on an open dense subset, and it has been an open question as to whether this holds for k<n. Consider now any smooth complete 4-manifold (X4,h) with Ric>λ and λ∈ R. Then for each ε>0 we construct a complete 4-rectifiable metric space (X4ε,dε) with dGH(X4ε,X4)<ε such that the following hold. First, X4ε is a limit space (M6j,gj) X4ε where M6j are smooth manifolds with Ricj>λ satisfying the same lower Ricci bound. Additionally, X4ε has no open subset which is topologically a manifold. Indeed, for any open U⊂eq X4ε we have that the second homology H2(U) is infinitely generated. Topologically, X4ε is the connect sum of X4 with an infinite number of densely spaced copies of C P2 . In this way we see that every 4-manifold X4 may be approximated arbitrarily closely by 4-dimensional limit spaces X4ε which are nowhere manifolds. We will see there is an, as now imprecise, sense in which generically one should expect manifold structures to not exist on spaces with higher dimensional Ricci curvature lower bounds.