Reducibility points and characteristic p local fields I- Simple supercuspidal representations of symplectic groups

Abstract

Let F be a non-Archimedean local field with odd characteristic p. Let N be a positive integer and G=Sp2N(F). By work of Lomel\'i on γ-factors of pairs and converse theorems, a generic supercuspidal representation π of G has a transfer to a smooth irreducible representation π of GL2N+1(F). In turn the Weil-Deligne representation π associated to π by the Langlands correspondence determines a Langlands parameter φπ for π. That process produces a Langlands correspondence for generic cuspidal representations of G. In this paper we take π to be simple in the sense of Gross and Reeder, and from the explicit construction of π we describe π explicitly. The method we use is the same as in our previous paper arXiv:2310.20455, where we treated the case where F is a p-adic field, and π a simple supercuspidal representation of G=Sp2N(F). It relies on a criterion due to Moeglin on the reducibility of representations parabolically induced from GLM(F)× G for varying positive integers M. We extend this criterion to the case when F has any positive characteristic. The main new feature consists in relating reducibility to γ-factors for pairs.