The second moment of Dirichlet twists of a \(\mathrm{GL}_4\) automorphic \(L\)-function (Q6086977)

The aim of this paper is to establish an asymptotic formula for the second moment of Dirichlet twists of a \(\mathrm{GL}_4\) automorphic \(L\)-function \(L(s,\pi \otimes \chi)\). More precisely, let \(\pi=\bigotimes_v \pi_v\) be an irreducible cuspidal tempered automorphic representation of \(\mathrm{GL}_4(\mathbb{A}_\mathbb{Q})\) with unitary central character and conductor \(N_\pi\). Let \(\Psi(x)\) be a smooth function compactly supported in \([1, 2]\). The author gives an asymptotic formula for \[\sum_{\stackrel{q}{(q,N_\pi)=1}}\Psi(q/Q)\mathop{{\sum}^{\flat}}_{\chi(\mathrm{mod}\,q)} \int_{-\infty}^{+\infty}\left |\Lambda(1/2+iy, \pi \otimes \chi)\right|^2 dy\] with an error term \[O \left(Q^2 N_\pi^{47/64 +\epsilon}\kappa_{\pi\otimes \tilde{\pi}} (\log Q )^\epsilon \right),\] uniformely for \(Q\geq 2\), \(N_\pi \ll (\log Q)^N\) for any fixed \(N\) and \(\kappa_{\pi\otimes \tilde{\pi}}\) is the residue of \(L(s,\pi \otimes \tilde{\pi}) \) at \(s=1\).