Cohomological invariants of M3,n via level structures

Abstract

We show that mod 2 cohomological invariants of the moduli stack M3,n of smooth pointed curves of genus three contain a free module with generators in degree 0, 2, 3, 4 and 6, formed by the invariants of the symplectic group Sp6(2). We achieve this by showing that the torsor of full level two structures M3,n(2) M3,n is versal. Along the way, we prove that the invariants of the stack of del Pezzo surfaces of degree two contain the invariants of the Weyl group W(E7) and that the mod 2 cohomology of M3,n is non-zero in degree three. Our main result holds also for the stack A3 of principally polarized abelian threefolds.