Reduction mod p of semi-stable representations of some super-Breuil weights

Abstract

We determine the mod p reductions of the semi-stable representations Vk, L of weight k ∈ [p + 5, 2p][2p + 6, 3p + 1] and vp(L) < 1-k/2 for primes p ≥ 5. In particular, this shows that the techniques introduced in [CG24] involving the p-adic and mod p local Langlands correspondences can be used to compute the reduction of Vk, L outside the range k ∈ [3, p + 1]. Moreover, this shows that the bound on vp(L) given by Bergdall-Levin-Liu [BLL23] can be improved, at least for weights k ∈ [2p + 6, 3p + 1].