Nonnegative Ricci curvature, almost stability at infinity, and structure of fundamental groups

Abstract

We study the fundamental group of an open n-manifold M of nonnegative Ricci curvature with additional stability condition on M, the Riemannian universal cover of M. We prove that if any tangent cone of M at infinity is a metric cone, whose cross-section is sufficiently Gromov-Hausdorff close to a prior fixed metric space, then π1(M) is finitely generated and contains a normal abelian subgroup of finite index; if in addition M has Euclidean volume growth of constant at least L, then we can bound the index of that abelian subgroup in terms of n and L. In particular, our result implies that if M has Euclidean volume growth of constant at least 1-ε(n), then π1(M) is finitely generated and C(n)-abelian.