Packets of Serre weights for generic locally reducible two-dimensional Galois representations

Abstract

Suppose K/Qp is finite and r GK GL2(Fp) is a reducible Galois representation. In this paper we prove that we can use the results by the author in [Ste22] to obtain a decomposition of the set of Serre weights W(r) into a disjoint union of at most (e+1)f 'packets' of weights (where f is the residue degree and e the ramification degree of K) under the assumption that r is weakly generic. Thereby, we improve on results of Diamond--Savitt in [DS15] which give a similar decomposition, by rather different methods, under the assumption that r is strongly generic. We show that our definition of weak genericity is optimal for the results of this paper to hold when e=1. However, we expect that for e=2 one of the main results of this paper still holds under weaker hypotheses than the ones used in this paper.