Rigidity theorem of the Bergman kernel by analytic capacity
Abstract
In [7], Dong and I proved that the domains D ⊂ C of finite volume whose on-diagonal Bergman kernels K(·, ·) satisfy K(z0, z0) = Volume(D)-1 are disks minus closed polar sets. We utilized the solution of the Suita conjecture, a deep theorem of several complex variables. In this note, I present a significantly more elementary proof of this theorem that does not use several complex variables. As a corollary, a new lower bound for the on-diagonal Bergman kernel is given. Finally, I show that the only real ellipsoid in Webster normal form which satisfies K(0, 0) = Volume(D)-1 is the unit ball.
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