Doubling Constructions: the complete L-function for coverings of the symplectic group

Abstract

We develop the local theory of the generalized doubling method for the m-fold central extension Sp2n(m) of Matsumoto of the symplectic group. We define local γ-, L- and ε-factors for pairs of genuine representations of Sp2n(m)×GLk and prove their fundamental properties, in the sense of Shahidi. Here GLk is the central extension of GLk arising in the context of the Langlands--Shahidi method for covering groups of Sp2n× GLk. We then construct the complete L-function for cuspidal representations and prove its global functional equation. Possible applications include classification results and a Shimura type lift of representations from covering groups to general linear groups (a global lift is sketched here for m=2).