Casselman-Shahidi's conjecture on normalized intertwining operators for groups of classical type (2112.03531v1)

Abstract: Intertwining operators play an essential role and appear everywhere in the Langlands program, their analytic properties interact directly, yet deeply with the decomposition of parabolic induction locally and the residues of Eisenstein series globally. Inspired by the profound Langlands-Shahidi theory, Casselman-Shahidi conjectured that a certain normalization factor would govern the singularity of intertwining operators for generic standard modules. Indeed, motivated by the theory of theta correspondence, especially the Siegel-Weil formula globally, and the composition problem of degenerate principal series and the demand of a g.c.d. definition of standard $L$-functions in the framework of the doubling method locally, an optimal normalization factor has been determined for degenerate principal series of classical groups via the theory of integrals on prehomogeneous vector spaces. Such a method seems impossible to be generalized to work even in the setting of degenerate generalized principal series, which are naturally involved in the recent Cai-Friedberg-Ginzburg-Kaplan's generalized doubling method. To circumvent it, we discover a new uniform argument that can answer the singularity problem of intertwining operators for a large class of induced representations. As an illustration, we prove the aforementioned Casselman-Shahidi conjecture for quasi-split groups of classical type in the paper. Along the way, with the help of Shahidi's local coefficient theory, we also prove that those normalized intertwining operators are always non-zero, and provide a new one-sentence proof of the standard module conjecture in the spirit of Casselman-Shahidi.