On reduction of Hilbert-Blumenthal varieties

Abstract

Let OF be the ring of integers of a totally real field F of degree g. We study the reduction of the moduli space of separably polarized abelian OF-varieties of dimension g modulo p for a fixed prime p. The invariants and related conditions for the objects in the moduli space are discussed. We construct a scheme-theoretic stratification by a-numbers on the Rapoport locus and study the relation with the slope stratification. In particular, we recover the main results of Goren and Oort [GO, J. Alg. Geom. 2000] on the stratifications when p is unramified in OF. We also prove the strong Grothendieck conjecture for the moduli space in some restricted cases, particularly when p is totally ramified in OF.

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