Topological rigidity of small RCD(K,N) spaces with maximal rank
Abstract
For a polycyclic group , rank ( ) is defined as the number of Z factors in a polycyclic decomposition of . For a finitely generated group G, rank (G) is defined as the infimum of rank ( ) among finite index polycyclic subgroups ≤ G. For a compact RCD (K,N) space (X,d, m) with diam (X) ≤ (K,N), the rank of π1(X) is at most N. We show that in case of equality, X is homeomorphic to an infranilmanifold, generalizing a result by Kapovitch--Wilking to the non-smooth setting.
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