The invariant Szegő metric on Egg domains

Abstract

We study the Fefferman--Szegő metric on egg domains \[ D2m=\(z,w)∈ C2: |z|2+|w|2m<1\, m∈ Z+. \] Our first main result establishes the existence of the Fefferman--Szegő kernel on D2m by verifying that the Fefferman weight lies in the Muckenhoupt class A2(∂D2m). We then derive an explicit closed-form expression for this kernel, demonstrate that its blowup occurs precisely on the boundary diagonal, and determine its boundary asymptotic behaviour. Using this kernel, we compute the associated Fefferman--Szegő metric and its Ricci curvature. As applications, we prove several rigidity results: the metric is Kähler--Einstein if and only if m=1; proportionality to the Bergman metric or to some complete Kähler metric gm D2m is also equivalent to m=1. Finally, we establish the vanishing of the L2-cohomology outside the middle dimension for the Fefferman--Szegő metric.