Nonnegative Ricci curvature, nilpotency, and Hausdorff dimension

Abstract

Let M be an open (complete and non-compact) manifold with Ric 0 and escape rate not 1/2. It is known that under these conditions, the fundamental group π1(M) has a finitely generated torsion-free nilpotent subgroup N of finite index, as long as π1(M) is an infinite group. We show that the nilpotency step of N must be reflected in the asymptotic geometry of the universal cover M, in terms of the Hausdorff dimension of an isometric R-orbit: there exist an asymptotic cone (Y,y) of M and a closed R-subgroup L of the isometry group of Y such that its orbit Ly has Hausdorff dimension at least the nilpotency step of N. This resolves a question raised by Wei and the author.