Triple Sums and the Riemann Zeta Function

We evaluate the sums of certain classes of series involving the Riemann zeta function by using the theory of the double gamma function, which has recently been revived in the study of determinants of Laplacians. Relevant connections with various known results are also pointed out.

## Abstract In this paper, we have exhibited, by utilizing value distribution theory, some new properties of the Gamma function Γ(__z__) and the Riemann zeta function ζ(__z__). Specifically, we have proved that both of the two functions are prime and the Riemann zeta function, like Γ(__z__), does n

Let \(s=\sigma+i t\). Then, on the assumption of Riemann Hypothesis, we prove the Mean-Value Theorem for the square of the Riemann zeta-function over shorter intervals for \(1 / 2+A_{1} / \log \log T \leqslant \sigma \leqslant 1-\delta\). Here \(A_{1}\) is a large positive constant, \(\delta\) is a