Arithmetic level raising theorem for some unitary Shimura varieties mod p
Abstract
Let F be a real quadratic field in which a fixed prime p is inert, and E0 be an imaginary quadratic field in which p splits; put E=E0 F. Let Sh1,n-1 be the special fiber over Fp2 of the Shimura variety for G(U(1,n-1)× U(n-1,1)) with hyperspecial level structure at p for some integer n≥ 2. Let Sh1,n-1(Kp1) be the special fiber over Fp2 of a Shimura variety for G(U(1,n-1)× U(n-1,1)) with parahoric level structure at p for some integer n≥ 2. We exhibit elements in the higher Chow group of the supersingular locus of Sh1,n-1 and study the stratification of Sh1,n-1. Moreover, we study the geometry of Sh1,n-1(Kp1) and prove a form of Ihara lemma. With Ihara lemma, we prove the the arithmetic level raising map is surjective for n=2,3.
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