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arxiv: alg-geom/9707011 · v1 · submitted 1997-07-10 · alg-geom · math.AG

The tangent space at a special symplectic instanton bundle on P^(2n+1)

classification alg-geom math.AG
keywords instantonspacesymplecticspecialbundlebundlesmodulitangent
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Let $MI_{Simp,P^{2n+1}}(k)$ be the moduli space of stable symplectic instanton bundles on $P^{2n+1}$ with second Chern class $c_2=k$ (it is a closed subscheme of the moduli space $MI_{P^{2n+1}}(k)$), We prove that the dimension of its Zariski tangent space at a special (symplectic) instanton bundle is $2k(5n-1)+4n^2-10n+3, k\geq 2$. It follows that special symplectic instanton bundles are smooth points for $ k \leq 3 $

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