Uniruledness of some moduli spaces of stable pointed curves

Abstract

We prove uniruledness of some moduli spaces Mg,n of stable curves of genus g with n marked points using linear systems on nonsingular projective surfaces containing the general curve of genus g. Precisely we show that Mg,n is uniruled for g=12 and n ≤ 5, g=13 and n ≤ 3, g=15 and n ≤ 2. We then prove that the pointed hyperelliptic locus Hg,n is uniruled for g ≥ 2 and n ≤ 4g+4. In the last part we show that a nonsingular complete intersection surface does not carry a linear system containing the general curve of genus g ≥ 16 and if it carries a linear system containing the general curve of genus 12 ≤ g ≤ 15 then it is canonical.