Negative discrete second moments of Dirichlet L-functions

Abstract

Let χ be a primitive Dirichlet character modulo q>1. Assuming the Generalised Riemann Hypothesis for L(s,χ) and that the non-trivial zeros ρ=12+iγ of L(s,χ) are simple, we prove lower bounds for the discrete moments Σ0<γ T|L'(ρ,χ)|-2 and Σ0<γ T|L(2ρ,χ2)/L'(ρ,χ)|2, uniformly in the conductor. The bounds capture the proportion β/(1+β) of the conjectured asymptotics, where β= T/ qT: this is one half whenever q=o( T), recovering for fixed q the Dirichlet analogues of theorems of Milinovich and Ng and of Sinha, and degrades to 1/(2+A) when q=TA. We conjecture the true leading order asymptotics and their analogues when we average over the family of primitive characters modulo q.