The nonuniqueness of the tangent cones at infinity of Ricci-flat manifolds
Copyright policy )The nonuniqueness of the tangent cones at infinity of Ricci-flat manifolds
It is shown by Colding and Minicozzi the uniqueness of the tangent cone at infinity of Ricci-flat manifolds with Euclidean volume growth which has at least one tangent cone at infinity with a smooth cross section. In this article we raise an example of the Ricci-flat manifold implying that the assumption for the volume growth in the above result is essential. More precisely, we construct a complete Ricci-flat manifold of dimension 4 with non-Euclidean volume growth who has at least two distinct tangent cones at infinity and one of them has a smooth cross section.
- Keio University Japan
Mathematics - Differential Geometry, 53C26, Differential Geometry (math.DG), tangent cone at infinity, Ricci flat manifold, FOS: Mathematics, hyper-Kähler, 53C23
Mathematics - Differential Geometry, 53C26, Differential Geometry (math.DG), tangent cone at infinity, Ricci flat manifold, FOS: Mathematics, hyper-Kähler, 53C23
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