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A Bishop type inequality on metric measure spaces with Ricci curvature bounded below (1603.04162v1)
Published 14 Mar 2016 in math.MG
Abstract: We define a Bishop-type inequality on metric measure spaces with Riemannian curvature-dimension condition. The main result in this short article is that any RCD spaces with the Bishop-type inequalities possess only one regular set in not only the measure theoretical sense but also the set theoretical one. As a corollary, the Hausdorff dimension of such $RCD*(K,N)$ spaces are exactly $N$. We also prove that every tangent cone at any point on such RCD spaces is a metric cone.