Rational Curves on Moduli Spaces of Vector Bundles

Abstract

We completely describe the components of expected dimension of the Hilbert Scheme of rational curves of fixed degree k in the moduli space SUC(r,L) of semistable vector bundles of rank r and determinant L on a curve C. We show that for every k ≥ 1 there are gcd(r, L) unobstructed components. In addition, if k is divisible by r1(r-r1)(g-1) for 1 r1 r-1, there is an additional obstructed component of the expected dimension for each such r1. We construct families of obstructed components and show that their generic point is not the generic vector bundle of given rank and determinant. Finally, we also obtain an upper bound on the degree of rational connectedness of SUC(r,L) which is linear in the dimension.