Large value estimates for Dirichlet polynomials, and the density of zeros of Dirichlet's L-functions

Abstract

It is proved that \[ Σ qN(σ , T, ) ε (qT)7(1-σ)/3+ε, \] where N(σ, T, ) denote the number of zeros = β + it of L(s, ) in the rectangle σ ≤ β ≤ 1, |t| ≤ T. The exponent 7/3 improves upon Huxley's earlier exponent of 12/5. The key innovation lies in deriving a sharp upper bound for sums involving affine transformations with GCD twists, which emerges from our application of the Guth-Maynard method. As corollaries, we obtain two new arithmetic consequences from this zero-density estimate: first, a result concerning the least prime in arithmetic progressions when the modulus is a prime power; second, a result on the least Goldbach number in arithmetic progressions when the modulus is prime.