Extremal weights and a tameness criterion for mod p Galois representations

Abstract

We study the weight part of Serre's conjecture for generic n-dimensional mod p Galois representations. We first generalize Herzig's conjecture to the case where the field is ramified at p and prove the weight elimination direction of our conjecture. We then introduce a new class of weights associated to n-dimensional local mod p representations which we call extremal weights. Using a ``Levi reduction" property of certain potentially crystalline Galois deformation spaces, we prove the modularity of these weights. As a consequence, we deduce the weight part of Serre's conjecture for unit groups of some division algebras in generic situations.