Abstract
Let X be an irreducible smooth projective surface over \({{\mathbb{C}}}\) and Hilb d (X) the Hilbert scheme parametrizing the zero-dimensional subschemes of X of length d. Given a vector bundle E on X, there is a naturally associated vector bundle \({{\mathcal{F}}_d(E)}\) over Hilb d (X). If E and V are semistable vector bundles on X such that \({{\mathcal{F}}_d(E)}\) and \({{\mathcal{F}}_d(V)}\) are isomorphic, we prove that E is isomorphic to V. A key input in the proof is provided by Biswas and Nagaraj (see [1]).
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