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The Hitchin--Kobayashi Correspondence for Quiver Bundles over Generalized K\"ahler Manifolds

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arxiv 1905.10293 v1 pith:QFENTWGH submitted 2019-05-24 math.DG

The Hitchin--Kobayashi Correspondence for Quiver Bundles over Generalized K\"ahler Manifolds

classification math.DG
keywords mathcalalphacorrespondencegeneralizedhitchin--kobayashiquiversigmaadmits
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In this paper, we establish the Hitchin--Kobayashi correspondence for the $I_\pm$-holomorphic quiver bundle $\mathcal{E}=(E,\phi)$ over a compact generalized K\"{a}hler manifold $(X, I_+,I_-,g, b)$ such that $g$ is Gauduchon with respect to both $I_+$ and $I_-$, namely $\mathcal{E}$ is $(\alpha,\sigma,\tau)$-polystable if and only if $\mathcal{E}$ admits an $(\alpha,\sigma,\tau)$-Hermitian--Einstein metric.

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