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On the Classification of Stein spaces with Bergman-Einstein metrics
arXiv Math
CC BY
이 매체는 공공·자유 라이선스로 본문을 직접 표시합니다.Abstract
For every $N\ge 2$, we prove that the Bergman metric on the regular locus of a finite ball quotient $\mathbb{B}^N/\Gamma$, where $\Gamma\subset \mathrm{U}(N)$ is finite and fixed-point-free, is Kähler-Einstein if and only if $\Gamma$ is trivial.
Consequently, if $\Omega$ is an $N$-dimensional normal Stein space with isolated singularities and compact, smooth, strongly pseudoconvex boundary admitting a real-algebraic CR realization, then the Bergman metric on $\Omega_{\mathrm{reg}}$ is Kähler-Einstein if and only if $\Omega$ is biholomorphic to $\mathbb{B}^N$.
This proves an algebraic version of the Cheng-Huang-Xiao conjecture in every complex dimension $N\ge 2$.
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