An Improvement on the Mean Value Formula for the Approximate Functional Equation of the Square of the Riemann Zeta-Function

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

We slightly improve the lower bound of B! a aez-Duarte, Balazard, Landreau and Saias in the Nyman-Beurling formulation of the Riemann Hypothesis as an approximation problem. We construct Hilbert space vectors which could prove useful in the context of the so-called ''Hilbert-P ! o olya idea''.

A family of integer matrices, which generalize the Demjanenko matrix and the matrix defined by Silverman, is introduced and shown to compute the values at negative integers of the Dedekind zeta function of the pth cyclotomic field for any prime p. 1999 Academic Press where D( p, n) is an integer wh

The arithmetic function r & k (n) counts the number of ways to write a natural number n as the difference of two kth powers (k 2 fixed). The investigation of the asymptotic behaviour of the Dirichlet summatory function of r & k (n) leads in a natural way to a certain error term 2 & k (t). In this ar