Local coefficients and normalization of intertwining operators for <span class="mathjax-formula">$GL(n)$</span>

Let π be an irreducible supercuspidal representation of GL N (F) and (Γ, γ) a maximal simple type in GL N (F ) attached to the inertial class of π.. V (2) ) the subspace of

Finally in Section 6, under an assumption about local L-functions, we prove the global identity in general for a representation induced from a generic cusp form.. The proof is based

The first is elliptic homogenization, and even though the approximating functionals have oscillations, there do not exist local minimizers unrelated to local minimizers of the

For a local field F of characteristic 0, let n an irreducible admissible represen- tation of GL2(F) of infinite dimension, and WTC its central character, ~03C0

The proof of Theorem 1.2 in the case when two of the representations are discrete series, at least one of which is supercuspidal, depends on realizing a

Soit (n, V) une représentation irréductible de G ayant un caractère central, et de dimension infinie.. Les fonctions de Kirillov

section we shall assume that F is a local field and n is an irreducible admissible representation of GL2(F).. We start with the archimedean

In Section 4 we describe the pullbacks of certain derivatives of reduced theta-functions and thus obtain a family of holomorphic (n, 0)-forms on D generalizing Hecke’s