From Calabi's extremal metrics to scalar-flat K\"ahler cones
Abstract
We prove that for any smooth polarized complex n-dimensional manifold (X, LX) which admits an extremal K\"ahler metric in c1(LX), and for any integer k large enough (in terms of a bound depending on (X, LX)), the (n+k+1)-dimensional complex cone Y:= (LX OPk(1))× with section X × Pk admits a scalar-flat K\"ahler cone metric. Equivalently, the unweighted Sasaki join of a smooth compact quasi-regular extremal Sasaki manifold with a regular Sasaki sphere S2k+1 of sufficiently large dimension (2k+1) admits a Sasaki metric of constant (positive) scalar curvature. This gives an affirmative answer to an asymptotic version of a question raised by Boyer--Huang--Legendre--Tnnesen-Friedman in arXiv:1906.04827.
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