Stable maps of genus zero in the space of stable vector bundles on a curve

Abstract

Let X be a smooth projective curve with genus g≥3. Let N be the moduli space of stable rank two vector bundles on X with a fixed determinant OX(-x) for x∈ X. In this paper, as a generalization of Kiem and Castravet's works, we study the stable maps in N with genus 0 and degree 3. Let P be a natural closed subvariety of N which parametrizes stable vector bundles with a fixed subbundle L-1(-x) for a line bundle L on X. We describe the stable map space M0(P,3). It turns out that the space M0(P,3) consists of two irreducible components. One of them parameterizes smooth rational cubic curves and the other parameterizes the union of line and smooth conics.