The Breuil--M\'ezard conjecture when l ≠ p

Abstract

Let l and p be primes, let F/Qp be a finite extension with absolute Galois group GF, let F be a finite field of characteristic l, and let : GF → GLn(F) be a continuous representation. Let R() be the universal framed deformation ring for . If l = p, then the Breuil--M\'ezard conjecture (as formulated by Emerton and Gee) relates the mod l reduction of certain cycles in R() to the mod l reduction of certain representations of GLn(OF). We state an analogue of the Breuil--M\'ezard conjecture when l ≠ p, and prove it whenever l > 2 using automorphy lifting theorems. We give a local proof when l is "quasi-banal" for F and is tamely ramified. We also analyse the reduction modulo l of the types σ(τ) defined by Schneider and Zink.