The construction of ε-splitting map

Abstract

For a geodesic ball with non-negative Ricci curvature and almost maximal volume, without using compactness argument, we construct an ε-splitting map on a concentric geodesic ball with uniformly small radius. There are two new technical points in our proof. The first one is the way of finding n directional points by induction and stratified almost Gou-Gu Theorem. The other one is the error estimates of projections, which guarantee the n directional points we find really determine n different directions.

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