Characterizing the mod- local Langlands correspondence by nilpotent gamma factors

Abstract

Let F be a p-adic field and choose k an algebraic closure of F, with different from p. We define ``nilpotent lifts'' of irreducible generic k-representations of GLn(F), which take coefficients in Artin local k-algebras. We show that an irreducible generic -modular representation π of GLn(F) is uniquely determined by its collection of Rankin--Selberg gamma factors γ(π× τ,X,) as τ varies over nilpotent lifts of irreducible generic k-representations τ of GLt(F) for t=1,…, n2. This gives a characterization of the mod- local Langlands correspondence in terms of gamma factors, assuming it can be extended to a surjective local Langlands correspondence on nilpotent lifts.