Fefferman-Szegő kernels and finite-type rigidity on egg domains

Abstract

We compute the Fefferman boundary measure and the associated Fefferman--Szegő kernel for the egg domains En,m=\(z,w)∈Cn-1×C:\ |z|2+|w|2m<1\. The kernel is given both by an orthogonal monomial expansion and by a closed form in a natural auxiliary finite-type variable; its diagonal weak-boundary exponent recovers the integer m. For n2, the associated Fefferman--Szegő metric has constant scalar curvature only in the ball case m=1, and the Kähler--Einstein, constant Ricci-spectrum, and Bergman-proportionality statements follow as corollaries of the same calculation.

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