Autour de l'énumération des représentations automorphes cuspidales algébriques de ${\rm GL}_n$ sur $\mathbb{Q}$ de conducteur $>1$

Abstract: We prove classification results for the cuspidal automorphic algebraic representations of ${\rm GL}n$ over $\mathbb{Q}$ ($n$ 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 ${\rm SO}{2n+1}(\mathbb{Q}_p)$, which we prove as well.