Stephen Kudla, Michael Rapoport
Published 2008-04-03, updated 2011-02-17Version 2
The supersingular locus in the fiber at p of a Shimura variety attached to a unitary similitude group GU(1,n-1) over Q is uniformized by a formal scheme \Cal N. In the case when p is inert, we define special cycles Z(x) in \Cal N, associated to a collection x of m `special homomorphisms' with fundamental matrix T in Herm_m(OK). When m=n and T is nonsingular, we show that the cycle Z(x) is a union of components of the Ekedahl-Oort stratification, and we give a necessary and sufficient conditions, in terms of T, for Z(x) to be irreducible. When Z(x) is zero dimensional -- in which case it reduces to a single point -- we determine the length of the corresponding local ring by using a variant of the theory of quasi-canonical liftings. We show that this length coincides with the derivative of a representation density for hermitian forms.
Comments: In this new version, suggestions by B. Howard, U. Terstiege, and the referee for Inventiones are taken into account. Also a mistake in the statement of the conjecture at the end of the introduction, that was accidentally added in the galleys for the published version, has been removed
On the global structure of special cycles on unitary Shimura varieties
The supersingular locus of the Shimura variety for GU(1,n-1) over a ramified prime
Foliations on unitary Shimura varieties in positive characteristic
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