Uniqueness of some Calabi-Yau metrics on Cn
Abstract
We consider the Calabi-Yau metrics on Cn constructed recently by Yang Li, Conlon-Rochon, and the author, that have tangent cone C× A1 at infinity for the (n-1)-dimensional Stenzel cone A1. We show that up to scaling and isometry this Calabi-Yau metric on Cn is unique. We also discuss possible generalizations to other manifolds and tangent cones.
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