English

The $A$-philosophy for the Hardy $Z$-Function

General Mathematics 2025-03-26 v2

Abstract

In recent works we have introduced the parameter space ZN\mathcal{Z}_N of AA-variations of the Hardy ZZ-function, Z(t)Z(t), whose elements are functions of the form \begin{equation} \label{eq:Z-sections} Z_N(t ; \overline{a} ) = \cos(\theta(t))+ \sum_{k=1}^{N} \frac{a_k}{\sqrt{k+1} } \cos ( \theta (t) - \ln(k+1) t), \end{equation} where a=(a1,...,aN)RN\overline{a} = (a_1,...,a_N) \in \mathbb{R}^N. The A A -philosophy advocates that studying the discriminant hypersurface forming within such parameter spaces, often reveals essential insights about the original mathematical object and its zeros. In this paper we apply the AA-philosophy to our space ZN\mathcal{Z}_N by introducing Δn(a) \Delta_n(\overline{a} ) the nn-th Gram discriminant of Z(t) Z(t) . We show that the Riemann Hypothesis (RH) is equivalent to the corrected Gram's law (1)nΔn(1)>0, (-1)^n \Delta_n(\overline{1}) > 0, for any nZn \in \mathbb{Z}. We further show that the classical Gram's law (1)nZ(gn)>0 (-1)^n Z(g_n) >0 can be considered as a first-order approximation of our corrected law. The second-order approximation of Δn(a)\Delta_n (\overline{a}) is then shown to be related to shifts of Gram points along the t t -axis. This leads to the discovery of a new, previously unobserved, repulsion phenomena Z(gn)>4Z(gn), \left| Z'(g_n) \right| > 4 \left| Z(g_n) \right|, for bad Gram points gng_n whose consecutive neighbours gn±1g_{n \pm 1} are good. Our analysis of the AA-variation space ZN\mathcal{Z}_N introduces a wealth of new results on the zeros of Z(t)Z(t), casting new light on classical questions such as Gram's law, the Montgomery pair-correlation conjecture, and the RH, and also unveils previously unknown fundamental properties.

Cite

@article{arxiv.2406.06548,
  title  = {The $A$-philosophy for the Hardy $Z$-Function},
  author = {Yochay Jerby},
  journal= {arXiv preprint arXiv:2406.06548},
  year   = {2025}
}

Comments

arXiv admin note: text overlap with arXiv:2310.14415

R2 v1 2026-06-28T17:00:05.707Z