A new zero-density estimate for ζ(s) and the error term in the Prime Number Theorem

Abstract

We will provide a new type of zero-density estimate for ζ(s) when σ is sufficiently close to 1. In particular, we will show that N(σ,T) can be bounded by an absolute constant when σ is sufficiently close to the left edge of the Korobov-Vinogradov zero-free region. As a consequence, we provide the optimal error term in the prime number theorem of the form (x)-x x \-(1-) ω(x)\, ω(x):= t ≥ 1\(t) x+ t\, where (t)=A0( t)-2/3( t)-1/3 is a decreasing function such that ζ(σ+it)≠ 0 for σ 1-(t). Precisely, we will show that we can take =0.