Finite generation of fundamental groups for manifolds with nonnegative Ricci curvature whose universal cover is almost k-polar at infinity
Abstract
In this article, we prove that the fundamental group π1(M) of a complete open manifold M with nonnegative Ricci curvature is finitely generated, under the condition that the Riemannian universal cover M satisfies an "almost k-polar at infinity" condition. Additionally, such π1(M) is virtually abelian. Furthermore, we demonstrate that the base point of any tangent cone at infinity of such a manifold is nearly a pole. In the case where M exhibits almost maximal Euclidean volume growth, we prove that M deformation retracts to a closed submanifold F which is diffeomorphic to a flat manifold, provided M is not simply connected.
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