On the p-adic Riemann hypothesis for the zeta function of divisors

Let q be a power of a prime p. We prove an assertion of Carlitz which takes q as a parameter. Diaz-Vargas' proof of the Riemann Hypothesis for the Goss zeta function for F p [T] depends on his verification of Carlitz's assertion for the specific case q= p [D-V]. Our proof of the general case allows

The function \(E_{2}(R)\) is used to denote the error term in the asymptotic formula for the fourth power moment of the Riemann zeta-function on the half-line. In this paper we prove several new results concerning this function, which include \(O\) - and \(\Omega\)-results. In the proofs use is made

## 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