High moments of the Riemann zeta-function

J. Brian Conrey, S. M. Gonek

Type: Article

Publication Date: 2001-04-15

Citations: 145

DOI: https://doi.org/10.1215/s0012-7094-01-10737-0

Abstract

In 1918 G. Hardy and J. Littlewood proved an asymptotic estimate for the Second moment of the modulus of the Riemann zeta-function on the segment [1/2,1/2+iT] in the complex plane, as T tends to infinity. In 1926 Ingham proved an asymptotic estimate for the fourth moment. However, since Ingham's result, nobody has proved an asymptotic formula for any higher moment. Recently J. Conrey and A. Ghosh conjectured a formula for the sixth moment. We develop a new heuristic method to conjecture the asymptotic size of both the sixth and eighth moments. Our estimate for the sixth moment agrees with and strongly supports, in a sense made clear in the paper, the one conjectured by Conrey and Ghosh. Moreover, both our sixth and eighth moment estimates agree with those conjectured recently by J. Keating and N. Snaith based on modeling the zeta-function by characteristic polynomials of random matrices from the Gaussian unitary ensemble. Our method uses a conjectural form of the approximate functional equation for the zeta-function, a conjecture on the behavior of additive divisor sums, and D. Goldston and S. Gonek's mean value theorem for long Dirichlet polynomials. We also consider the question of the maximal order of the zeta-function on the critical line.

Locations

Duke Mathematical Journal - View
arXiv (Cornell University) - View - PDF

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Works Cited by This (20)

Action	Title	Year	Authors
+	Fractional Moments of the Riemann Zeta-Function	1981	D. R. Heath‐Brown
+	Extreme values of the Riemann zeta function	1977	Hugh L. Montgomery
+	On the frequency of titchmarsh’s phenomenon for ζ(s)—III	1977	R. Balasubramanian K. Ramachandra
+	A quadratic divisor problem	1994	William Duke John Friedlander Henryk Iwaniec
+	Approximative Funktionalgleichungen und Mittelwertsätze für Dirichletreihen, die Spitzenformen assoziiert sind	1975	Anton Good
+ PDF Chat	Mean‐values of the Riemann zeta‐function	1995	K. Soundararajan
+	The Fourth Power Moment of the Riemann Zeta Function	1979	D. R. Heath‐Brown
+ PDF Chat	The large sieve	1973	Hugh L. Montgomery R. C. Vaughan
+	Mean-Value Theorems in the Theory of the Riemann Zeta-Function	1928	A. E. Ingham
+ PDF Chat	Contributions to the theory of the riemann zeta-function and the theory of the distribution of primes	1916	G. H. Hardy J. E. Littlewood