Proof of the strong Density Hypothesis

TL;DR

This paper proves the strong Density Hypothesis for the zeros of the Riemann zeta function using a novel auxiliary function called the pseudo-Gamma function, resulting in a bound on the number of zeros.

Contribution

It introduces the pseudo-Gamma function, a symmetric, zero-free, analytic auxiliary function, to establish a stronger form of the Density Hypothesis for the Riemann zeta zeros.

Findings

Proves the strong Density Hypothesis with explicit bounds.

Establishes that $N(\lambda, T) \,\le 8.734 \log T$ for large T.

Uses a novel symmetric auxiliary function to achieve the proof.

Abstract

The Riemann hypothesis, conjectured by Bernhard Riemann in 1859, claims that the non-trivial zeros of $\zeta(s)$ lie on the line $\Re(s) =1/2$. The density hypothesis is a conjectured estimate $N(\lambda, T) =O\bigl(T\sp{2(1-\lambda) +\epsilon} \bigr)$ for any $\epsilon >0$, where $N(\lambda, T)$ is the number of zeros of $\zeta(s)$ when $\Re(s) \ge\lambda$ and $0 <\Im(s) \le T$, with $1/2 \le \lambda \le 1$ and $T >0$. The Riemann-von Mangoldt Theorem confirms this estimate when $\lambda =1/2$, with $T\sp{\epsilon}$ being replaced by $\log T$. In an attempt to transform Backlund's proof of the Riemann-von Mangoldt Theorem to a proof of the density hypothesis by convexity, we discovered a different approach utilizing an auxiliary function. The crucial point is that this function should be devised to be symmetric with respect to $\Re(s) =1/2$ and about the size of the Euler Gamma function on the right hand side of the line $\Re(s) =1/2$. Moreover, it should be analytic and without any zeros in the concerned region. We indeed found such a function, which we call pseudo-Gamma function. With its help, we are able to establish a proof of the density hypothesis. Actually, we give the result explicitly and our result is even stronger than the original density hypothesis, namely it yields $N(\lambda, T) \le 8.734 \log T$ for any $1/2 < \lambda < 1$ and $T\ge 2445999554999$.