Local parameters of supercuspidal representations

Abstract

For a connected reductive group G over a non-archime\-dean local field F of positive characteristic, Genestier and Lafforgue have attached a semisimple parameter ss(π) to each irreducible representation π. Our first result shows that the Genestier-Lafforgue parameter of a tempered π can be uniquely refined to a tempered L-parameter (π), thus giving the unique local Langlands correspondence which is compatible with the Genestier-Lafforgue construction. Our second result establishes ramification properties of ss(π) for unramfied G and supercuspidal π constructed by induction from an open compact (modulo center) subgroup. If Lss(π) is pure in an appropriate sense, we show that ss(π) is ramified (unless G is a torus). If the inducing subgroup is sufficiently small in a precise sense, we show Lss(π) is wildly ramified. The proofs are via global arguments, involving the construction of Poincar\'e series with strict control on ramification when the base curve is 1 and a simple application of Deligne's Weil II.