Unirationality of Hurwitz spaces of coverings of degree <= 5

Abstract

Let Y be a smooth, projective curve of genus g≥ 1 over the complex numbers. Let H0d,A(Y) be the Hurwitz space which parametrizes coverings p:X Y of degree d, simply branched in n=2e points, with monodromy group equal to Sd, and det(p*OX/OY) isomorphic to a fixed line bundle A-1 of degree -e. We prove that, when d=3, 4 or 5 and n is sufficiently large (precise bounds are given), these Hurwitz spaces are unirational. If in addition (e,2)=1 (when d=3), (e,6)=1 (when d=4) and (e,10)=1 (when d=5), then these Hurwitz spaces are rational.