A Wirtinger Type Inequality and the Spacing of the Zeros of the Riemann Zeta-Function

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''.

## 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

Suppose that m(ξ ) is a trigonometric polynomial with period 1 satisfying m(0) = 1 and |m(ξ , is related to the zeros of m(ξ ). In 1995, A. Cohen and R. D. Ryan, "Wavelets and Multiscale Signal Processing," Chapman & Hall, proved that if m(ξ ) has no zeros in [-1 6 , 1 6 ], then ϕ(x) is an orthogon

We investigate the topological properties of the poset of proper cosets xH in a finite group G. Of particular interest is the reduced Euler characteristic, which is closely related to the value at -1 of the probabilistic zeta function of G. Our main result gives divisibility properties of this reduc