The infinite fern in higher dimensions

Abstract

If is an automorphic modulo p Galois representation, it is natural to wonder if automorphic points are Zariski dense in the deformation space of . We prove new results in this direction in the case of a unitary group split (and unramified) at p. Namely, if is associated to an automorphic form for a unitary group (which contributes to coherent cohomology), we prove that the "infinite fern" (i.e. the image of an appropriate Eigenvariety) in the polarised deformation space of is Zariski dense in a non-empty union of irreducible components. This generalises in particular results of Gouv\ea-Mazur for GL2/ Q, Chenevier for U(3) and recently Hellmann-Margerin-Schraen. The novelty is that we use the local model of Breuil-Hellmann-Schraen to control tangent spaces in the local deformation rings, and a geometric argument on the Eigenvariety originally due to Bella\"iche-Chenevier and Ta\"ibi to reduce to points with enormous image. At those points, we can use a recent result of Newton-Thorne to control the vanishing of a Selmer group. In particular, we do not need to assume any "Taylor-Wiles" hypothesis on , which can in particular be irreducible. If we moreover add Taylor-Wiles hypothesis on and an extra hypothesis at p, we have by a result of Allen the Zariski density everywhere.