Giovanni Coppola
Published 2009-07-31Version 1
We deeply appreciate the papers of Ivi\'c on the links between the $2k-$th moments of the Riemann zeta function and, say, $d_k$, the $k-$divisor function. More specifically, both the one bounding the $2k-$th moment with a simple average of correlations of the $d_k$ (Palanga 1996 Conference Proceedings) and the more recent (arXiv:0708.1601v2 to appear on JTNB), which bounds the Selberg integral of $d_k$ applying the $2k-$th moment of the zeta. Building on the former paper, we apply an elementary approach (based on arithmetic averages) in order to get information on the reverse link to the second work.
Comments: This is (an expanded version of) my talk at JAXXVI (Plain TeX)
Journal: Publications de l'Institut Math\'ematique (Beograd), 88(102) (2010), 99-110
On the mean square of the divisor function in short intervals
Generations of correlation averages
An elementary and real approach to values of the Riemann zeta function
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