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On the regular-convexity of Ricci shrinker limit spaces

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arxiv 1809.04386 v2 pith:T4UXNXJB submitted 2018-09-12 math.DG

On the regular-convexity of Ricci shrinker limit spaces

classification math.DG
keywords riccilimitshrinkerboundcheeger-coldingcolding-naberconvexcurvature
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In this paper, we study the structure of the pointed-Gromov-Hausdorff limits of sequences of Ricci shrinkers. We define a regular-singular decomposition following the work of Cheeger-Colding for manifolds with a uniform Ricci curvature lower bound, and prove that the regular part of any Ricci shrinker limit space is convex, inspired by Colding-Naber's original idea of parabolic smoothing of the distance functions.

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