A local Langlands parameterization for generic supercuspidal representations of p-adic G2

Abstract

We construct a Langlands parameterization of supercuspidal representations of G2 over a p-adic field. More precisely, for any finite extension K / p we will construct a bijection \[ g : 0g(G2,K) → 0(G2,K) \] from the set of generic supercuspidal representations of G2(K) to the set of irreducible continuous homomorphisms : WK G2() with WK the Weil group of K. The construction of the map is simply a matter of assembling arguments that are already in the literature, together with a previously unpublished theorem of G. Savin on exceptional theta correspondences, included as an appendix. The proof that the map is a bijection is arithmetic in nature, and specifically uses automorphy lifting theorems. These can be applied thanks to a recent result of Hundley and Liu on automorphic descent from GL(7) to G2.