Change of coefficients in the p ≠ local Langlands correspondence for GLn

Abstract

Let and p be distinct primes, n a positive integer, F an -adic local field of characteristic 0, and let W(k) denote the ring of Witt vectors over an algebraically closed field of characteristic p. Work of Emerton-Helm, Helm and Helm-Moss defines and constructs a smooth A[GLn(F)]-module π(A) for a continuous Galois representation A : GF GLn(A) over a p-torsionfree reduced complete local W(k)-algebra A interpolating the local Langlands correspondence. However, since π is not a functor, there is no clear way to speak about the local Langlands correspondence over non-reduced or finite characteristic W(k)-algebras. We describe two natural and reasonable variants of the local Langlands correspondence with arbitrary complete local W(k)-algebras as coefficients. They are isomorphic when evaluated on the universal framed deformation of a Galois representation over k, and more generally we find a surjection in one direction. In many cases, including n=2 or 3, they both recover π() when has coefficients in a finite extension of W(k)[p-1]. On the Galois side, this requires finding minimal lifts between Galois deformations.