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

TL;DR

This paper introduces a new zero-density estimate for the Riemann zeta function near the line , leading to an optimal error term in the Prime Number Theorem with  .

Contribution

It provides the first zero-density estimate that bounds the number of zeros close to , resulting in the best possible error term in the Prime Number Theorem.

Findings

Bound on $N(\sigma,T)$ near  for the zeta function.

Optimal error term in the Prime Number Theorem with .

Zero-free region extended close to .

Abstract

We will provide a new type of zero-density estimate for $\zeta(s)$ when $\sigma$ is sufficiently close to $1$. In particular, we will show that $N(\sigma,T)$ can be bounded by an absolute constant when $\sigma$ 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 $$ \psi(x)-x \ll x\exp \left\{-(1-\varepsilon) \omega(x)\right\},\qquad \omega(x):=\min _{t \geq 1}\{\nu(t) \log x+\log t\}, $$ where $\nu(t)=A_0(\log t)^{-2/3}(\log\log t)^{-1/3}$ is a decreasing function such that $\zeta(\sigma+it)\neq 0$ for $\sigma\ge 1-\nu(t)$. Precisely, we will show that we can take $\varepsilon=0$.