On the limit of simply connected manifolds with discrete isometric cocompact group actions

Abstract

We study complete, connected and simply connected n-dim Riemannian manifold M satisfying Ricci curvature lower bound. Further more, suppose that M admits discrete isometric group actions G so that the diameter of the quotient space diam(M/G) is bounded. In particular, for any n-manifold N satisfying diam(N) D and Ric -(n-1), the universal cover and fundamental group (N,G) satisfies the above condition. Let \(Mi,pi)\i ∈ N be a sequence of complete, connected and simply connected n-dim Riemmannian manifolds satisfying Ric -(n-1). Let Gi be a discrete subgroup of Iso(Mi) such that diam(Mi/Gi) D where D>0 is fixed. Passing to a subsequence, (Mi, pi,Gi) equivariantly pointed-Gromov-Hausdorff converges to (X,p,G). Then G is a Lie group by Cheeger-Colding and Colding-Naber. We shall show that the identity component G0 is a nilpotent Lie group. Therefore there is a maximal torus Tk in G. Our main result is that X/Tk is simply connected. Moreover, π1(X,p) is generated by loops contained in the Tk-orbits up to conjugation; each of these loops can be represented by α-1 · β · α where α is a curve from y to p for some y ∈ X, and β is a loop at y contained in the Tk-orbit of y.