Ext-Multiplicity Theorem for Standard Representations of (GLn+1,GLn)

Abstract

Let π1 be a standard representation of GLn+1(F) and let π2 be the smooth dual of a standard representation of GLn(F). When F is non-Archimedean, we prove that ExtiGLn(F)(π1, π2) is C when i=0 and vanishes when i ≥ 1. The main tool of the proof is a notion of left and right Bernstein-Zelevinsky filtrations. An immediate consequence of the result is to give a new proof on the multiplicity at most one theorem. Along the way, we also study an application of an Euler-Poincar\'e pairing formula of D. Prasad on the coefficients of Kazhdan-Lusztig polynomials. When F is an Archimedean field, we use the left-right Bruhat-filtration to prove a multiplicity result for the equal rank Fourier-Jacobi models of standard principal series.