Yakov Varshavsky
Published 1999-09-23Version 1
In this paper we recall the construction and basic properties of complex Shimura varieties and show that these properties actually characterize them. This characterization immediately implies the explicit form of Kazhdan's theorem on the conjugation of Shimura varieties. As a further corollary, we show that each Shimura variety corresponding to an adjoint group has a canonical model over its reflex field. We also indicate how this characterization implies the existence of a p-adic uniformization of certain unitary Shimura varieties. In the appendix we give a complete scheme-theoretic proof of Weil's descent theorem.
On Tate conjecture for the special fibers of some unitary Shimura varieties
Towards a Jacquet-Langlands correspondence for unitary Shimura varieties
The μ-ordinary Hasse invariant of unitary Shimura varieties
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