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The Kaehler-Einstein metric for some Hartogs domains over bounded symmetric domains | | An WANG
; Weiping YIN
; Liyou ZHANG
; Guy ROOS
; | | Date: |
14 Dec 2004 | | Subject: | Complex Variables MSC-class: Primary: 32F45, 32M15; secondary: 32A25 | math.CV | | Affiliation: | Capital Normal University, Beijing), Weiping YIN (Capital Normal University, Beijing), Liyou ZHANG (Capital Normal University, Beijing), Guy ROOS (St Petersburg | | Abstract: | We study the complete Kähler-Einstein metric of a Hartogs domain $widetilde {Omega}$, which is obtained by inflation of an irreducible bounded symmetric domain $Omega $, using a power $N^{mu}$ of the generic norm of $Omega$. The generating function of the Kähler-Einstein metric satisfies a complex Monge-Ampère equation with boundary condition. The domain $widetilde {Omega}$ is in general not homogeneous, but it has a subgroup of automorphisms, the orbits of which are parameterized by $Xinlbrack0,1[$. This allows to reduce the Monge-Ampère equation to an ordinary differential equation with limit condition. This equation can be explicitly solved for a special value $mu_{0}$ of $mu$, called the critical exponent. We work out the details for the two exceptional symmetric domains. The critical exponent seems also to be relevant for the properties of other invariant metrics like the Bergman metric; a conjecture is stated, which is proved for the exceptional domains. | | Source: | arXiv, math.CV/0501223 | | Services: | Forum | Review | PDF | Favorites | |
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