The Ratios Conjecture and upper bounds for negative moments of L-functions over function fields

Abstract

We prove special cases of the Ratios Conjecture for the family of quadratic Dirichlet L--functions over function fields. More specifically, we study the average of L(1/2+α,D)/L(1/2+β,D), when D varies over monic, square-free polynomials of degree 2g+1 over Fq[x], as g ∞, and we obtain an asymptotic formula when β g-1/2+. We also study averages of products of 2 over 2 and 3 over 3 L--functions, and obtain asymptotic formulas when the shifts in the denominator have real part bigger than g-1/4+ and g-1/6+ respectively. The main ingredient in the proof is obtaining upper bounds for negative moments of L--functions. The upper bounds we obtain are expected to be almost sharp in the ranges described above. As an application, we recover the asymptotic formula for the one-level density of zeros in the family with the support of the Fourier transform in (-2,2).