On some series representations of the Hurwitz zeta function

Presented in a continuous extension of a measure used by Sol Golomb to define a probability on the sample space of natural numbers. The extension is a probability measure which holds several characteristic in common with Golomb's measure but on the set \((1, \infty)\). I have proven a theorem which

The functional equation for the Hurwitz Zeta function ((s,a) is used to obtain formulas for derivatives of ((s,a) at negative odd s and rational a. For several of these rational arguments, closed-form expressions are given in terms of simpler transcendental functions, like the logarithm, the polygam

In this note we shall give a complete structural description of the mean square of the Hurwitz zetafunction whose study was started 50 years ago. Instead of appealing to Atkinson's dissection, we incorporate the built-in structure of the Hurwitz zeta-function as the solution of the difference equati

## 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