Holomorphic 1-forms on the moduli space of curves

Abstract

Since the sixties it is well known that there are no non-trivial closed holomorphic 1-forms on the moduli space Mg of smooth projective curves of genus g>2. In this paper, we strengthen such result proving that for g≥ 5 there are no non-trivial holomorphic 1-forms. With this aim, we prove an extension result for sections of locally free sheaves F on a projective variety X. More precisely, we give a characterization for the surjectivity of the restriction map D:H0(F) H0(F|D) for divisors D in the linear system of a sufficiently large multiple of a big and semiample line bundle L. Then, we apply this to the line bundle L given by the Hodge class on the Deligne Mumford compactification of Mg.