On the infinite fern of Galois representations of unitary type

Abstract

Let E be a CM number field, F its maximal totally real subfield, c the generator of Gal(E/F), p an odd prime totally split in E, and S a finite set of places of E containing the places above p. Let r : GE,S --> GL3(Fpbar) be a modular, absolutely irreducible, Galois representation of type U(3), i.e. such that r* = rc, and let X(r) be the rigid analytic generic fiber of its universal GE,S-deformation of type U(3). We show that each irreducible component of the Zariski-closure of the modular points in X(r) has dimension at least 6[F:Q]. We study an analogue of the infinite fern of Gouvea-Mazur in this context and deal with the Hilbert modular case as well. As important steps, we prove that any first order deformation of a generic enough crystalline representation of Gal(Qpbar/Qp) (of any dimension) is a linear combination of trianguline deformations, and that unitary eigenvarieties (of any rank) are etale over the weight space at the non-critical classical points. As another application, we obtain a general theorem about the image of the localization at p of the p-adic Adjoint' Selmer group of the p-adic Galois representations attached to any cuspidal, cohomological, automorphic representation Pi of GLn(AE) such that Pi* = Pic (for any n).