Toric extremal Kähler-Ricci solitons are Kähler-Einstein

Simone Calamai; David Petrecca

Displaying similar documents to “Toric extremal Kähler-Ricci solitons are Kähler-Einstein”

Holomorphically pseudosymmetric Kähler metrics on ℂℙⁿ

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Colloquium Mathematicae

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The aim of this paper is to present examples of holomorphically pseudosymmetric Kähler metrics on the complex projective spaces ℂℙⁿ, where n ≥ 2.

Deformation of Kähler matrics to Kähler-Eisenstein metrics on compact Kähler manifolds.

Huai-Dong Cao (1985)

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It is proved that there exists a non-semisymmetric pseudosymmetric Kähler manifold of dimension 4.

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G. Tian (1987)

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Le Mau Hai, Nguyen Van Khue, Pham Hoang Hiep (2007)

Annales Polonici Mathematici

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Extremal Kähler Metrics and Complex Deformation Theory.

C. LeBrun, S.R. Simanca (1994)

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Kähler-Einstein metrics: Old and New

Daniele Angella, Cristiano Spotti (2017)

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We present classical and recent results on Kähler-Einstein metrics on compact complex manifolds, focusing on existence, obstructions and relations to algebraic geometric notions of stability (K-stability). These are the notes for the SMI course "Kähler-Einstein metrics" given by C.S. in Cortona (Italy), May 2017. The material is not intended to be original.

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R. Goto (1994)

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An extension theorem for Kähler currents with analytic singularities

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Wei-Yue Ding (1988)

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Jürgen Bingener (1983)

Mathematische Zeitschrift

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Strongly not relatives Kähler manifolds

Michela Zedda (2017)

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In this paper we study Kähler manifolds that are strongly not relative to any projective Kähler manifold, i.e. those Kähler manifolds that do not share a Kähler submanifold with any projective Kähler manifold even when their metric is rescaled by the multiplication by a positive constant. We prove two results which highlight some relations between this property and the existence of a full Kähler immersion into the infinite dimensional complex projective space. As application we get that...

On compact astheno-Kähler manifolds

Koji Matsuo, Takao Takahashi (2001)

Colloquium Mathematicae

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We prove that every compact balanced astheno-Kähler manifold is Kähler, and that there exists an astheno-Kähler structure on the product of certain compact normal almost contact metric manifolds.