Fibr\'e vectoriel de 0-corr\'elation pond\'er\'e sur l'espace P2n+1
Abstract
We study in this paper a new family of stable algebraic symplectic vector bundles of rank 2n on the complex projective space P2n+1 whose classical null correlation bundles belongs. We show that these bundles are invariant under a miniversal deformation. We also study the sufficient cohomological conditions for a symplectic vector bundle on a projective variety to be stable.
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