Views on level curves, K3 surfaces and Fano threefolds

Abstract

An analogue of the Mukai map mg: Pg Mg is studied for the moduli Rg, of genus g curves C with a level structure. Let Pg, be the moduli space of 4-tuples (S, L, E, C) so that (S, L) is a polarized K3 surface of genus g, E is orthogonal to L in PicS and defines a standard degree K3 cyclic cover of S, C ∈ L . We say that (S, L, E) is a level K3 surface. These exist for ≤ 8 and their families are known. We define a level Mukai map rg, : Pg, Rg, , induced by the assignment of (S, L, E, C) to (C, E OC). We investigate a curious possible analogy between mg and rg, , that is, the failure of the maximal rank of rg, for g = g 1, where g is the value of g such that Pg, = Rg,. This is proven here for = 3. As a related open problem we discuss Fano threefolds whose hyperplane sections are level K3 surfaces and their classification.