Bubbling of rank two bundles over surfaces
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In this paper, motivated by the singularity formation of ASD connections in gauge theory, we study an algebraic analogue of the singularity formation of families of rank two holomorphic vector bundles over surfaces. For this, we define a notion of fertile families bearing bubbles and give a characterization of it using the related discriminant. Then we study families that locally form the singularity of the type $\mathcal{O}\oplus \mathcal{I}$ where $\mathcal{I}$ is an ideal sheaf defining points with multiplicities. We prove the existence of fertile families bearing bubbles by using elementary modifications of the original family. As applications, we study bubble trees for a few families that form singularities of low multiplicities and use examples to give negative answers to some plausible general questions.
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Cited by 2 Pith papers
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Point Singularities and Bubbling in Degenerations of Rank-Two Bundles on Threefolds
Proves algebraic bubbling multiplicity equals half the Ext-length of isolated point singularities in rank-two sheaves on threefolds, yielding smoothability obstructions and explicit HYM connection examples.
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Point Singularities and Local Third Chern Classes for Rank-Two Torsion-free Sheaves on Threefolds
Local third Chern class at isolated singularities of rank-two torsion-free sheaves on threefolds is deformation invariant, equals K-theoretic charge, and matches algebraic multiplicities for reflexive sheaves.
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