Plurisubharmonicity of Bergman Kernels on generalized annuli
Abstract
Let Aζ=-(ζ)· be a family of generalized annuli over a domain U. We show that the logarithm Kζ(z) of the Bergman kernel Kζ(z) of Aζ is plurisubharmonic provided ∈ PSH(U). It is remarkable that Aζ is non-pseudoconvex when the dimension of Aζ is larger than one. For standard annuli in C, we obtain an interesting formula for ∂2 Kζ/∂ ζ∂ζ, as well as its boundary behavior.
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