Some remarks on the Kaehler geometry of LeBrun's Ricci flat metrics on C2
Abstract
In this paper we investigate the balanced condition (in the sense of Donaldson) and the existence of an Englis expansion for the LeBrun's metrics on C2. Our first result shows that a LeBrun's metric on C2 is never balanced unless it is the flat metric. The second one shows that an Englis expansion of the Rawnsley's function associated to a LeBrun's metric always exists, while the coefficient a3 of the expansion vanishes if and only if the LeBrun's metric is indeed the flat one.
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