On a Conjecture of Rapoport and Zink

Abstract

In their book Rapoport and Zink constructed rigid analytic period spaces Fwa for Fontaine's filtered isocrystals, and period morphisms from PEL moduli spaces of p-divisible groups to some of these period spaces. They conjectured the existence of an \'etale bijective morphism Fa Fwa of rigid analytic spaces and of a universal local system of Qp-vector spaces on Fa. For Hodge-Tate weights n-1 and n we construct in this article an intrinsic Berkovich open subspace F0 of Fwa and the universal local system on F0. We conjecture that the rigid-analytic space associated with F0 is the maximal possible Fa, and that F0 is connected. We give evidence for these conjectures and we show that for those period spaces possessing PEL period morphisms, F0 equals the image of the period morphism. Then our local system is the rational Tate module of the universal p-divisible group and enjoys additional functoriality properties. We show that only in exceptional cases F0 equals all of Fwa and when the Shimura group is GLn we determine all these cases.

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