K\"ahler compactification of Cn and Reeb dynamics
Abstract
Let X be a smooth complex manifold. Assume that Y⊂ X is a K\"ahler submanifold such that X Y is biholomorphic to Cn. We prove that (X, Y) is biholomorphic to the standard example (Pn, Pn-1). We then study certain K\"ahler orbifold compactifications of Cn and, as an application, prove that on C3 the flat metric is the only asymptotically conical Ricci-flat K\"ahler metric whose metric cone at infinity has a smooth link. As a key technical ingredient, we derive a new characterization of minimal discrepancy of isolated Fano cone singularities by using S1-equivariant positive symplectic homology.
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