p-adic level raising on the eigenvariety for U(3)

Abstract

We prove level raising results for p-adic automorphic forms on definite unitary groups U(3)/Q and deduce some intersection points on the eigenvariety. Let l be an inert prime where the level subgroups varies, if there is a non-very-Eisenstein point φ on the old component (generically parametrizing forms old at l) satisfying Tl(φ)=l(l3+1), then this point also lies in the new component (generically parametrizing forms new at l). This provides a p-adic analogue of Bella\"iche and Graftieaux's mod p level raising for classical automorphic forms on U(3), and also generalizes James Newton's p-adic level raising results for definite quaternion algebras. Key ingredients include abelian Ihara lemma (proved for any definite unitary group U(n)) and some duality arguments about certain Hecke modules. Finally we also discuss some methods to construct such points explicitly and further development.

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