An approximate form of Artin's holomorphy conjecture and non-vanishing of Artin $L$-functions

Robert J. Lemke Oliver, Jesse Thorner, Asif Zaman

Published 2020-12-28Version 1

Let $k$ be a number field and $G$ be a finite group, and let $\mathfrak{F}_{k}^{G}$ be a family of number fields $K$ such that $K/k$ is normal with Galois group isomorphic to $G$. We prove for many families that for almost all $K \in \mathfrak{F}_k^G$, all of the $L$-functions associated to Artin representations whose kernel does not contain a fixed normal subgroup are holomorphic and non-vanishing in a wide region. Using this and related ideas, for example, we prove a strong effective prime number theorem for each faithful, irreducible Artin representation attached to almost all $K \in \mathfrak{F}_k^G$ in several natural cases, including when $G=S_n$ for any $n \geq 2$ and when $G$ is a transitive subgroup of $S_p$ for some prime $p \geq 2$. These results have several arithmetic applications, in particular to an effective variant of the Chebotarev density theorem, to bounds on $\ell$-torsion subgroups of class groups, to the resolution of a problem of Duke on the extremal order of class numbers, to the subconvexity problem for Dedekind zeta functions, and to the equidistribution of periodic torus orbits associated to ideal classes in prime degree fields.