Einstein metrics and stability for flat connections on compact Hermitian manifolds, and a correspondence with Higgs operators in the surface case.

Lübke, M.

Displaying similar documents to “Einstein metrics and stability for flat connections on compact Hermitian manifolds, and a correspondence with Higgs operators in the surface case.”

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Włodzimierz Jelonek (2003)

Annales Polonici Mathematici

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We study 4-dimensional Einstein-Hermitian non-Kähler manifolds admitting a certain anti-Hermitian structure. We also describe Einstein 4-manifolds which are of cohomogeneity 1 with respect to an at least 4-dimensional group of isometries.

Stability of Einstein - Hermitian vector bundles.

Martin Lübke (1983)

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Vestislav Apostolov, Paul Gauduchon (2002)

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We provide a local classification of selfdual Einstein riemannian four-manifolds admitting a positively oriented hermitian structure and characterize those which carry a hyperhermitian, non-hyperkähler structure compatible with the negative orientation. We show that selfdual Einstein 4-manifolds obtained as quaternionic quotients of $ℍ P^{2}$ and $ℍ H^{2}$ are hermitian.

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F. Tricerri, I. Vaisman (1986)

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A note on a hermitian analog of Einstein spaces

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Stable bundles on hypercomplex surfaces

Ruxandra Moraru, Misha Verbitsky (2010)

Open Mathematics

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A hypercomplex manifold is a manifold equipped with three complex structures I, J, K satisfying the quaternionic relations. Let M be a 4-dimensional compact smooth manifold equipped with a hypercomplex structure, and E be a vector bundle on M. We show that the moduli space of anti-self-dual connections on E is also hypercomplex, and admits a strong HKT metric. We also study manifolds with (4,4)-supersymmetry, that is, Riemannian manifolds equipped with a pair of strong HKT-structures...

Weakly-Einstein hermitian surfaces

Vestislav Apostolov, Oleg Muškarov (1999)

Annales de l'institut Fourier

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A consequence of the Riemannian Goldberg-Sachs theorem is the fact that the Kähler form of an Einstein Hermitian surface is an eigenform of the curvature operator. Referring to this property as we obtain a complete classification of the compact locally homogeneous $*$ -Einstein Hermitian surfaces. We also provide large families of non-homogeneous $*$ -Einstein (but non-Einstein) Hermitian metrics on $ℂ ℙ^{2} ♯ {\overline{ℂ ℙ}}^{2}$ , $ℂ ℙ^{1} \times ℂ ℙ^{1}$ , and on the product surface $X \times Y$ of two curves $X$ and $Y$ whose genuses are greater than 1...

Einstein-Hermitian connections on principal bundles and stability.

A. Ramanathan, S. Subramanian (1988)

Journal für die reine und angewandte Mathematik

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An anti-Kählerian Einstein structure on the tangent bundle of a space form

Vasile Oproiu, Neculai Papaghiuc (2005)

Colloquium Mathematicae

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In [11] we have considered a family of almost anti-Hermitian structures (G,J) on the tangent bundle TM of a Riemannian manifold (M,g), where the almost complex structure J is a natural lift of g to TM interchanging the vertical and horizontal distributions VTM and HTM and the metric G is a natural lift of g of Sasaki type, with the property of being anti-Hermitian with respect to J. Next, we have studied the conditions under which (TM,G,J) belongs to one of the eight classes of anti-Hermitian...

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R.E. Greene, Hung-Hsi Wu (1970)

Mathematische Zeitschrift

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Einstein-like and conformally flat contact metric three-manifolds.

Calvaruso, G. (2000)

Balkan Journal of Geometry and its Applications (BJGA)

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