Non-admissibility of some universal supersingular representations
Abstract
Let K/Qp be an unramified extension of degree f with residue field k. Let σ be an irreducible representation of GLn(k) over Fp. For n 3, we prove that the universal supersingular representation of weight σ is non-admissible and of infinite length when σ is sufficiently generic and satisfies certain technical conditions. This generalizes the previous results for n=2 and a non-trivial finite extension K/Qp. Our method employs a weight cycling argument together with recent progress on the Serre weight conjectures.
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