Further remarks on the higher dimensional Suita conjecture
Abstract
For a domain D ⊂ Cn, n 2, let FkD(z)=KD(z)λ(IkD(z)), where KD(z) is the Bergman kernel of D along the diagonal and λ(IkD(z)) is the Lebesgue measure of the Kobayashi indicatrix at the point z. This biholomorphic invariant was introduced by B and in this note, we study its limiting boundary behaviour on two classes of domains namely, h-extendible and strongly pseudoconvex polyhedral domains.
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