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arxiv: 1707.08314 · v4 · pith:WUHDYOZP · submitted 2017-07-26 · math.DG

Singularities of Hermitian-Yang-Mills connections and Harder-Narasimhan-Seshadri filtrations

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classification math.DG
keywords sheaftangentalgebraicconeharder-narasimhan-seshadribundleconjectureconnections
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This is the first of a series of papers where we relate tangent cones of Hermitian-Yang-Mills connections at an isolated singularity to the complex algebraic geometry of the underlying reflexive sheaf, when the sheaf is locally modelled on the pull-back of a holomorphic vector bundle from the projective space. In this paper we shall impose an extra assumption that the graded sheaf determined by the Harder-Narasimhan-Seshadri filtrations of the vector bundle is reflexive. In general we conjecture that the tangent cone is uniquely determined by the double dual of the associated graded object of a Harder-Narasimhan-Seshadri filtration of an algebraic tangent cone, which is a certain torsion-free sheaf on the projective space. In this paper we also prove this conjecture when there is an algebraic tangent cone which is locally free and stable.

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