Nonuniqueness of Calabi-Yau metrics with maximal volume growth
Abstract
We construct a family of inequivalent Calabi-Yau metrics on C3 asymptotic to C × A2 at infinity, in the sense that any two of these metrics cannot be related by a scaling and a biholomorphism. This provides the first example of families of Calabi-Yau metrics asymptotic to a fixed tangent cone at infinity, while keeping the underlying complex structure fixed. We propose a refinement of a conjecture of Sz\'ekelyhidi addressing the classification of such metrics.
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