Simultaneous nonvanishing of Dirichlet L-functions in Galois orbits

Abstract

Under the Generalized Riemann Hypothesis, we prove that given any two distinct imprimitive Dirichlet characters η1, η2 modulo q=pk, a positive proportion of characters modulo q in a fixed Galois orbit of primitive characters satisfies the nonvanishing property that L(1/2, η1) L(1/2, η2) ≠ 0, as k ∞ (with p fixed). Previously, only a positive proportion of nonvanishing result was available in Galois orbits (as opposed to simultaneously nonvanishing), due to work of Khan, Mili\'cevi\'c and Ngo. The main ingredients are obtaining a sharp upper bound on the mollified fourth moment over the Galois orbit using an Euler product mollifier, and obtaining a lower bound for the mollified second moment, which relies on using results from Diophantine approximation (such as the p-adic Roth theorem). We also unconditionally compute the second moments for L--functions associated to primitive Dirichlet characters in full orbits and thinner orbits.