Induction automorphe: repr\'esentations unitaires et spectre r\'esiduel

Abstract

Let E/F be a finite cyclic extension of local fields of characteristic zero, of degree d, and be a character of F× whose kernel is NE/F(E×). For m∈ N*, we prove that every irreducible unitary representation of GLm(E) has a -lift to GLmd(F), given by a character identity as in Henniart-Herb [HH]. Let E/ F be a finite cyclic extension of number fields, of degree d, and K be a character of A F× whose kernel is F× N E/ F(A E×). We prove that every automorphic discrete representation of GLm(A E) has a (strong) K-lift to GLmd(A F), i.e. compatible with the local lifting maps. We describe the image and the fibres of these local and global lifting maps. Locally, we also treat the elliptic representations.