Maksym Radziwill
Published 2011-06-23, updated 2011-06-27Version 2
Conditionally on the Riemann Hypothesis we obtain bounds of the correct order of magnitude for the 2k-th moment of the Riemann zeta-function for all positive real k < 2.181. This provides for the first time an upper bound of the correct order of magnitude for some k > 2; the case of k = 2 corresponds to a classical result of Ingham. We prove our result by establishing a connection between moments with k > 2 and the so-called "twisted fourth moment". This allows us to appeal to a recent result of Hughes and Young. Furthermore we obtain a point-wise bound for |zeta(1/2 + it)|^{2r} (with 0 < r < 1) that can be regarded as a multiplicative analogue of Selberg's bound for S(T). We also establish asymptotic formulae for moments (k < 2.181) slightly off the half-line.
Comments: 10 pages; Fixed errors in Section 3. Proof of Thm 2 (now Corollary 1) shorter; Added a few comments following Proposition 1
On the higher derivatives of Z(t) associated with the Riemann Zeta-Function
Bounding |ΞΆ(1/2 + it)| on the Riemann hypothesis
Moments of the Riemann zeta-function
![QR code for arXiv:1106.4806 [math.NT]](http://oss.arxitics.com/images/favicon.svg)