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

Abstract

Let k be a number field and G be a finite group. Let FkG(Q) be the family of number fields K with absolute discriminant DK at most Q such that K/k is normal with Galois group isomorphic to G. If G is the symmetric group Sn or any transitive group of prime degree, then we unconditionally prove that for all K∈FkG(Q) with at most Oε(Qε) exceptions, the L-functions associated to the faithful Artin representations of Gal(K/k) have a region of holomorphy and non-vanishing commensurate with predictions by the Artin conjecture and the generalized Riemann hypothesis. This result is a special case of a more general theorem. As applications, we prove that: 1) there exist infinitely many degree n Sn-fields over Q whose class group is as large as the Artin conjecture and GRH imply, settling a question of Duke; 2) for a prime p, the periodic torus orbits attached to the ideal classes of almost all totally real degree p fields F over Q equidistribute on PGLp(Z)p(R) with respect to Haar measure; 3) for each ≥ 2, the -torsion subgroups of the ideal class groups of almost all degree p fields over k (resp. almost all degree n Sn-fields over k) are as small as GRH implies; and 4) an effective variant of the Chebotarev density theorem holds for almost all fields in such families.