Simultaneous non-vanishing of Dirichlet L-functions

Abstract

In this paper, we prove the simultaneous non-vanishing of four Dirichlet L-functions at any point on the critical line. More precisely, let 1,…,4 be even Dirichlet characters modulo D1,…, D4 respectively, where the Dj are pairwise co-prime and square-free integers. Under the Generalized Riemann Hypothesis, we prove that Πj=14 L(1/2+it, j) ≠ 0 for a positive proportion of Dirichlet characters q, with q prime and sufficiently large in terms of the Dj and t (and with an explicit relationship between Dj, t and q). Unconditionally, we also prove a simultaneous non-vanishing result for four Dirichlet L-functions for infinitely many characters q, though in this case the proportion tends to zero as q ∞.