Riesz means of the Dedekind function II

Abstract

Let denote the Dedekind totient function defined by (n)=Σd|ndμ2(n/d) with μ being the M\"obius function. We shall consider the k-th Riesz mean of the arithmetical function n/(n) for any non-negative integer k on the assumptions that the Riemann Hypothesis is true, and all the zeros on the critical line of the Riemann zeta function ζ are simple. Our result is an explicit representation of the error term in the formula obtained in a previous work of the second author and I. Kiuchi IK. We also give an improvement on the error estimate under the assumption of the Gonek-Hejhal Hypothesis. And, we propose a proposition that is equivalent to the Riemann Hypothesis.