K\"ahler geometry of scalar flat metrics on Line bundles over polarized K\"ahler-Einstein manifolds

Abstract

In view of a better understanding of the geometry of scalar flat K\"ahler metrics, this paper studies two families of scalar flat K\"ahler metrics constructed in [10] by A. D. Hwang and M. A. Singer on Cn+1 and on O(-k). For the metrics in both the families, we prove the existence of an asymptotic expansion for their ε-functions and we show that they can be approximated by a sequence of projectively induced K\"ahler metrics. Further, we show that the metrics on Cn+1 are not projectively induced, and that the Burns-Simanca metric is characterized among the scalar flat metrics on O(-k) to be the only projectively induced one as well as the only one whose second coefficient in the asymptotic expansion of the ε-function vanishes.

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