Residual spectrum of GL2n distinguished by GLn × GLn

Abstract

Following the regularization method presented by Zydor, we study in this paper the regularized linear periods of square-integrable automormphic forms on GL2n(AF), where F is a number field and AF its ring of adeles. We obtain a formula that expresses the regularized period of a noncuspidal, square-integrable automorphic form in terms of degenerate Whittaker functions in an inductive manner. As a consequence we characterize irreducible automorphic representations in the discrete spectrum of GL2n(A) that are distinguished by GLn(A) × GLn(A). We also show the vanishing of the regularized periods of square-integrable automorphic forms on GLn(A) over GLp(A) × GLq(A) when p is not equal to q.