On moduli spaces of polarized Enriques surfaces

Abstract

We prove that, for any g ≥ 2, the \'etale double cover g:Eg Eg from the moduli space Eg of complex polarized genus g Enriques surfaces to the moduli space Eg of numerically polarized genus g Enriques surfaces is disconnected precisely over irreducible components of Eg parametrizing 2-divisible classes, answering a question of Gritsenko and Hulek. We characterize all irreducible components of Eg in terms of a new invariant of line bundles on Enriques surfaces that generalizes the φ-invariant introduced by Cossec. In particular, we get a one-to-one correspondence between the irreducible components of Eg and 11-tuples of integers satisfying particular conditions. This makes it possible, in principle, to list all irreducible components of Eg for each g ≥ 2.