Zeta function zeros, powers of primes, and quantum chaos

Jamal Sakhr, Rajat K. Bhaduri, Brandon P. van Zyl

Type: Article

Publication Date: 2003-08-15

Citations: 17

DOI: https://doi.org/10.1103/physreve.68.026206

Abstract

We present a numerical study of Riemann's formula for the oscillating part of the density of the primes and their integer powers. The formula consists of an infinite series of oscillatory terms, one for each zero of the zeta function on the critical line, and was derived by Riemann in his paper on primes, assuming the Riemann hypothesis. We show that high-resolution spectral lines can be generated by the truncated series at all integer powers of primes and demonstrate explicitly that the relative line intensities are correct. We then derive a Gaussian sum rule for Riemann's formula. This is used to analyze the numerical convergence of the truncated series. The connections to quantum chaos and semiclassical physics are discussed.

Locations

Physical review. E, Statistical physics, plasmas, fluids, and related interdisciplinary topics - View
arXiv (Cornell University) - View - PDF
PubMed - View
DataCite API - View

Similar Works

Action	Title	Year	Authors
+	Quantum Chaos, Random Matrix Theory, and the Riemann ζ-function	2013	Paul Bourgade Jonathan P. Keating
+	Towards a Rigorous Proof of the Riemann Hypothesis	2025	Robert D. Jones
+	Exploring the Connection between Prime Numbers, Trigonometric Functions, and the Riemann Hypothesis through ln(sec(π.nlog(n)))	2024	Budee U Zaman
+	A computational history of prime numbers and Riemann zeros	2018	Pieter Moree Izabela Petrykiewicz Alisa Sedunova
+ PDF Chat	Oscillations of the error term in the prime number theorem	2018	Jan‐Christoph Schlage‐Puchta
+	the Riemann zeta function zeros and the prime number spectrum	2002	Rajat K. Bhaduri Jamal Sakhr Brandon P. van Zyl
+	Zeta regularized products, Riemann zeta zeros and prime number spectra	2013	Gabriel Menezes B. F. Svaiter N. F. Svaiter
+	Statistical and other properties of Riemann zeros based on an explicit equation for the $n$-th zero on the critical line	2013	Guilherme França André LeClair
+	Statistical and other properties of Riemann zeros based on an explicit equation for the $n$-th zero on the critical line	2013	Guilherme França André LeClair
+	The Prime Number Theorem, Riemann Zeta Function Zeros, and Dynamical Zeta Functions	2025	Darrell Cox
+ PDF Chat	If our chaotic operator is derived correctly, then the Riemann hypothesis holds true	2024	Zeraoulia Rafik
+	Prime Numbers and the Riemann Hypothesis	2015	Barry Mazur William Stein
+ PDF Chat	An Approximation of the Prime Counting Function and a New Representation of the Riemann Zeta Function	2024	T. Ganesan
+	Prime numbers and the Riemann hypothesis	2019	Tatenda Kubalalika
+	The Riemann zeta function and Gaussian multiplicative chaos: statistics on the critical line	2016	Eero Saksman Christian A. Webb
+	The Riemann zeta function and Gaussian multiplicative chaos: statistics on the critical line	2016	Eero Saksman Christian Webb
+	Integer Points, Exponential Sums and the Riemann Zeta Function	2024	M. N. Huxley
+	Identifying primes from entanglement dynamics	2023	A. L. M. Southier L. F. Santos P. H. Souto Ribeiro A. D. Ribeiro
+ PDF Chat	A tale of two omegas	2020	Michael J. Mossinghoff Timothy S. Trudgian
+	A tale of two omegas	2019	Michael J. Mossinghoff Timothy S. Trudgian

Works That Cite This (15)

Action	Title	Year	Authors
+ PDF Chat	<i>Colloquium</i>: Physics of the Riemann hypothesis	2011	Dániel Schumayer D. A. W. Hutchinson
+	Pseudo Random test of prime numbers	2006	Liang Wang Huang Yan
+ PDF Chat	Hidden structure in the randomness of the prime number sequence?	2005	Saúl Ares Mario Castro
+ PDF Chat	Stability and dynamics of complex order fractional difference equations	2022	Sachin Bhalekar Prashant M. Gade Divya D. Joshi
+ PDF Chat	Stability and Dynamics of Complex Order Fractional Difference Equations	2021	Sachin Bhalekar Prashant M. Gade Divya D. Joshi
+ PDF Chat	An elementary and real approach to values of the Riemann zeta function	2010	Armen Bagdasaryan
+	A Study of Behavior of Prime Number Sets with an Orderly Distribution in a Coordinate Arrangement	2020	Vinay Veerapur
+ PDF Chat	Jacob’s Ladder: Prime Numbers in 2D	2020	Alberto Fraile Roberto Fernández Martínez D. Fernández
+ PDF Chat	Functional equations for regularized zeta-functions and diffusion processes	2020	A. Saldivar N. F. Svaiter C. A. D. Zarro
+ PDF Chat	HILBERT–PÓLYA CONJECTURE, ZETA FUNCTIONS AND BOSONIC QUANTUM FIELD THEORIES	2013	Julio Andrade

Works Cited by This (10)

Action	Title	Year	Authors
+	The Prime Numbers and Their Distribution	2000	Gérald Tenenbaum Michel Mendès France
+	Riemann's Zeta Function	1974	Harold M. Edwards
+ PDF Chat	Patterns in eigenvalues: the 70th Josiah Willard Gibbs lecture	2003	Persi Diaconis
+	Periodic Orbits and Classical Quantization Conditions	1971	Martin C. Gutzwiller
+	The Riemann Zeros and Eigenvalue Asymptotics	1999	Michael Berry Jonathan P. Keating
+ PDF Chat	Nonperiodic orbit sums in Weyl’s expansion for billiards	1999	Wei‐Mou Zheng
+ PDF Chat	On the distribution of spacings between zeros of the zeta function	1987	Andrew Odlyzko
+	Closed almost-periodic orbits in semiclassical quantization of generic polygons	2000	Debabrata Biswas
+ PDF Chat	Role of Nonperiodic Orbits in the Semiclassical Quantization of the Truncated Hyperbola Billiard	1995	R. Aurich T. Hesse Frank Steiner
+ PDF Chat	Random Matrix Theory and ζ(1/2+ it)	2000	Jonathan P. Keating N. C. Snaith