On the Hilbert scheme of the moduli space of vector bundles over an algebraic curve

Abstract

Let M(n,) be the moduli space of stable vector bundles of rank n≥ 3 and fixed determinant over a smooth projective algebraic curve X over C of genus g≥ 4. We use the gonality of the curve and r-Hecke morphisms to describe a smooth open set and to compute the dimension of a component of the Hilbert scheme HilbM(n,), of the scheme of morphisms Mor(G,M(n,)) and of the moduli space MX × G of stable bundles over X× G, where G is the Grassmannian G(n-r,Cn). In particular, we prove that MorP(P2,M(3,))=8g-7 and we give a sufficient condition for Mor2ns(P1,M(n,)) to be non-empty with s≥ 1.