M1,n is usually not uniruled in characteristic p

Abstract

Using etale cohomology, we define a birational invariant for varieties in characteristic p that serves as an obstruction to uniruledness - a variant on an obstruction to unirationality due to Ekedahl. We apply this to M1,n and show that M1,n is not uniruled in characteristic p as long as n ≥ p ≥ 11. To do this, we use Deligne's description of the etale cohomology of M1,n and apply the theory of congruences between modular forms.