Special K\"ahler-Ricci potentials on compact K\"ahler manifolds

Abstract

A special K\"ahler-Ricci potential on a K\"ahler manifold is any nonconstant C∞ function τ such that J(∇τ) is a Killing vector field and, at every point with dτ 0, all nonzero tangent vectors orthogonal to ∇τ and J(∇τ) are eigenvectors of both ∇ dτ and the Ricci tensor. For instance, this is always the case if τ is a nonconstant C∞ function on a K\"ahler manifold (M,g) of complex dimension m>2 and the metric g=g/τ2, defined wherever τ 0, is Einstein. (When such τ exists, (M,g) may be called almost-everywhere conformally Einstein.) We provide a complete classification of compact K\"ahler manifolds with special K\"ahler-Ricci potentials and use it to prove a structure theorem for compact K\"ahler manifolds of any complex dimension m>2 which are almost-everywhere conformally Einstein.

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