Autour de l'\'enum\'eration des repr\'esentations automorphes cuspidales alg\'ebriques de GLn sur Q de conducteur >1

Abstract

We prove classification results for the cuspidal automorphic algebraic representations of GLn over Q (n arbitrary) of small prime conductor and small motivic weight, in the spirit of the works of Chenevier, Lannes and Ta\"ibi in conductor 1. The main result is an explicit list of all such representations with motivic weight up to 17 and conductor 2. For this, we develop the analytical method based on the Riemann-Weil explicit formulas, and use Arthur's work to relate those representations to classical objects. A key ingredient is a special case of Gross' conjecture regarding paramodular invariants of representations of a split SO2n+1(Qp), which we prove as well.