Local classification of conformally-Einstein K\"ahler metrics in higher dimensions
Abstract
The requirement that a (non-Einstein) K\"ahler metric in any given complex dimension m>2 be almost-everywhere conformally Einstein turns out to be much more restrictive, even locally, than in the case of complex surfaces. The local biholomorphic-isometry types of such metrics depend, for each m>2, on three real parameters along with an arbitrary K\"ahler-Einstein metric h in complex dimension m-1. We provide an explicit description of all these local-isometry types, for any given h. That result is derived from a more general local classification theorem for metrics admitting functions we call special K\"ahler-Ricci potentials.
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