An automorphic generalization of the Hermite-Minkowski theorem

Abstract

We show that for any integer N, there are only finitely many cuspidal algebraic automorphic representations of GLn over Q, with n varying, whose conductor is N and whose weights are in the interval \0,1,...,23\. More generally, we define a simple sequence (r(w))w ≥ 0 such that for any integer w, any number field E whose root-discriminant is less than r(w), and any ideal N in the ring of integers of E, there are only finitely many cuspidal algebraic automorphic representations of general linear groups over E whose conductor is N and whose weights are in the interval \0,1,...,w\. Assuming a version of GRH, we also show that we may replace r(w) with 8 π eγ-Hw in this statement, where γ is Euler's constant and Hw the w-th harmonic number. The proofs are based on some new positivity properties of certain real quadratic forms which occur in the study of the Weil explicit formula for Rankin-Selberg L-functions. Both the effectiveness and the optimality of the methods are discussed.