On a generalized Calabi-Yau equation

Hongyu Wang; Peng Zhu

Displaying similar documents to “On a generalized Calabi-Yau equation”

New hyper-Käahler structures on tangent bundles

Xuerong Qi, Linfen Cao, Xingxiao Li (2014)

Communications in Mathematics

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Let $(M, g, J)$ be an almost Hermitian manifold, then the tangent bundle $T M$ carries a class of naturally defined almost hyper-Hermitian structures $(G, J_{1}, J_{2}, J_{3})$ . In this paper we give conditions under which these almost hyper-Hermitian structures $(G, J_{1}, J_{2}, J_{3})$ are locally conformal hyper-Kähler. As an application, a family of new hyper-structures is obtained on the tangent bundle of a complex space form. Furthermore, by restricting these almost hyper-Hermitian structures on the unit tangent sphere bundle $T_{1} M$ , we obtain...

Compatible complex structures on twistor space

Guillaume Deschamps (2011)

Annales de l’institut Fourier

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Let $M$ be a Riemannian 4-manifold. The associated twistor space is a bundle whose total space $Z$ admits a natural metric. The aim of this article is to study properties of complex structures on $Z$ which are compatible with the fibration and the metric. The results obtained enable us to translate some metric properties on $M$ (scalar flat, scalar-flat Kähler...) in terms of complex properties of its twistor space $Z$ .

On Solvable Generalized Calabi-Yau Manifolds

Paolo de Bartolomeis, Adriano Tomassini (2006)

Annales de l’institut Fourier

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We give an example of a compact 6-dimensional non-Kähler symplectic manifold $(M, κ)$ that satisfies the Hard Lefschetz Condition. Moreover, it is showed that $(M, κ)$ is a special generalized Calabi-Yau manifold.

Yang-Mills bar connections over compact Kähler manifolds

Hông Vân Lê (2010)

Archivum Mathematicum

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In this note we introduce a Yang-Mills bar equation on complex vector bundles $E$ provided with a Hermitian metric over compact Hermitian manifolds. According to the Koszul-Malgrange criterion any holomorphic structure on $E$ can be seen as a solution to this equation. We show the existence of a non-trivial solution to this equation over compact Kähler manifolds as well as a short time existence of a related negative Yang-Mills bar gradient flow. We also show a rigidity of holomorphic connections...

An example of an asymptotically Chow unstable manifold with constant scalar curvature

Hajime Ono, Yuji Sano, Naoto Yotsutani (2012)

Annales de l’institut Fourier

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Donaldson proved that if a polarized manifold $(V, L)$ has constant scalar curvature Kähler metrics in $c_{1} (L)$ and its automorphism group $Aut (V, L)$ is discrete, $(V, L)$ is asymptotically Chow stable. In this paper, we shall show an example which implies that the above result does not hold in the case where $Aut (V, L)$ is not discrete.