Singularities of Intertwining Operators and Decompositions of Principal Series Representations

Abstract

In this paper, we show that, under certain assumptions, a parabolic induction IndBGλ from the Borel subgroup B of a (real or p-adic) reductive group G decomposes into a direct sum of the form: \[ IndBGλ = (IndPG StM 0) (IndPG 1M 0), \] where P is a parabolic subgroup of G with Levi subgroup M of semi-simple rank 1, 1M is the trivial representation of M, StM is the Steinberg representation of M and 0 is a certain character of M. We construct examples of this phenomenon for all simply-connected simple groups of rank at least 2.