On the non-collapsed RCD spaces with local bounded covering geometry

Abstract

We consider a RCD(-(N-1),N) space (X,d,HN) with local bounded covering geometry. The first result is related to Gromov's almost flat manifold theorem. Specifically, if for every point p in the universal cover X, we have HN(B1(p)) v > 0 and the diameter of X is sufficiently small, then X is biH\"older homeomorphic to an infranil-manifold. Moreover, if X is a smooth Riemannian N-manifold with Ric -(N-1), then X is biH\"older diffeomorphic to an infranil-manifold. An application of our argument is to confirm the conjecture that Gromov's almost flat manifold theorem holds in the RCD+CBA setting. The second result concerns a regular fibration theorem. Let (Xi,di,HN) be a sequence of RCD(-(N-1),N) spaces converging to a compact smooth k-dimensional manifold K in the Gromov-Hausdorff sense. Assume that for any pi ∈ Xi, the local universal cover is non-collapsing, i.e., for any pre-image point pi of pi in the universal cover of the ball B3(pi), we have HN(B1(pi)) v for some fixed v>0. Then for sufficiently large i, there exists a fibration map fi:Xi K, where the fiber is an infra-nilmanifold and the structure group is affine.

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