Geodesic
Local mollification of Riemannian metrics using Ricci flow, and Ricci limit spaces
Simon, Miles1 ; Topping, Peter M2
1 Institut für Analysis und Numerik, Universität Magdeburg, Magdeburg, Germany
2 Mathematics Institute, University of Warwick, Coventry, United Kingdom
Geometry & topology, Tome 25 (2021) no. 2, pp. 913-948.

Voir la notice de l'article provenant de la source Mathematical Sciences Publishers

Given a three-dimensional Riemannian manifold containing a ball with an explicit lower bound on its Ricci curvature and positive lower bound on its volume, we use Ricci flow to perturb the Riemannian metric on the interior to a nearby Riemannian metric still with such lower bounds on its Ricci curvature and volume, but additionally with uniform bounds on its full curvature tensor and all its derivatives. The new manifold is near to the old one not just in the Gromov–Hausdorff sense, but also in the sense that the distance function is uniformly close to what it was before, and additionally we have Hölder/Lipschitz equivalence of the old and new manifolds.

One consequence is that we obtain a local bi-Hölder correspondence between Ricci limit spaces in three dimensions and smooth manifolds. This is more than a complete resolution of the three-dimensional case of the conjecture of Anderson, Cheeger, Colding and Tian, describing how Ricci limit spaces in three dimensions must be homeomorphic to manifolds, and we obtain this in the most general, locally noncollapsed case. The proofs build on results and ideas from recent papers of Hochard and the current authors.

DOI : 10.2140/gt.2021.25.913
Classification : 35K40, 35K55, 53C23, 53C44, 58J35
Keywords: Ricci flow, Ricci limit spaces

Simon, Miles 1 ; Topping, Peter M 2

1 Institut für Analysis und Numerik, Universität Magdeburg, Magdeburg, Germany
2 Mathematics Institute, University of Warwick, Coventry, United Kingdom 
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Simon, Miles; Topping, Peter M. Local mollification of Riemannian metrics using Ricci flow, and Ricci limit spaces. Geometry & topology, Tome 25 (2021) no. 2, pp. 913-948. doi : 10.2140/gt.2021.25.913. http://geodesic.mathdoc.fr/articles/10.2140/gt.2021.25.913/

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