On modular rigidity for GLn

Abstract

Let k be a global field and Ak be its ring of adeles. Let be a prime number and fix a field isomorphism from C to Q. Let 1 and 2 be cuspidal automorphic representations of GLn(Ak) for some integer n≥1. In this paper, we study the following question: assuming that there is a finite set S of places of k containing all Archimedean places and all finite places above such that, for all v S, the local components 1,v C Q and 2,v C Q are unramified and their Satake parameters are congruent mod , are the local components 1,w C Q and 2,w C Q integral, and do their reductions mod share an irreducible factor for all non-Archimedean places w not dividing ? We show that, under certain conditions on 1 and 2, the answer is yes. We also give a simple proof when k is a function field.