On the bad reduction of certain U(2, 1) Shimura varieties

Abstract

Let E be a quadratic imaginary field and let p be a prime which is inert in E. We study three types of Picard modular surfaces in positive characteristic p and the morphisms between them. The first Picard surface, denoted S, parametrizes triples (A,φ,) comprised of an abelian threefold A with an action of the ring of integers OE, and a principal polarization φ. The second surface, S0(p), parametrizes, in addition, a suitably restricted choice of a subgroup H⊂ A[p] of rank p2. The third Picard surface, S, parametrizes triples (A,,) similar to those parametrized by S, but where is a polarization of degree p2. We study the components, singularities and naturally defined stratifications of these surfaces, and their behaviour under the morphisms. A particular role is played by a foliation we define on the blow-up of S at its superspecial points.