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Hyperholomorphic connections on coherent sheaves and stability

100%
Verbitsky M.
Open Mathematics
|
2011
|
tom 9
|
nr 3
535-557
EN
Let M be a hyperkähler manifold, and F a reflexive sheaf on M. Assume that F (away from its singularities) admits a connection ▿ with a curvature Θ which is invariant under the standard SU(2)-action on 2-forms. If Θ is square-integrable, such sheaf is called hyperholomorphic. Hyperholomorphic sheaves were studied at great length in [21]. Such sheaves are stable and their singular sets are hyperkähler subvarieties in M. In the present paper, we study sheaves admitting a connection with SU(2)-invariant curvature which is not necessary L 2-integrable. We show that such sheaves are polystable.
2
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Stable bundles on hypercomplex surfaces

63%
Moraru R., Verbitsky M.
Open Mathematics
|
2010
|
tom 8
|
nr 2
327-337
EN
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 that have opposite torsion. In the language of Hitchin’s and Gualtieri’s generalized complex geometry, (4,4)-manifolds are called “generalized hyperkähler manifolds”. We show that the moduli space of anti-self-dual connections on M is a (4,4)-manifold if M is equipped with a (4,4)-structure.
3
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Editors’ preface for the topical issue “Instantons, coherent sheaves and their moduli spaces”

51%
Markushevich D., Tikhomirov A., Verbitsky M.
Open Mathematics
|
2012
|
tom 10
|
nr 4
1185-1187
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