Currently displaying 1 – 7 of 7

Showing per page

Order by Relevance | Title | Year of publication

Flows of Mellin transforms with periodic integrator

Titus Hilberdink — 2011

Journal de Théorie des Nombres de Bordeaux

We study Mellin transforms N ^ ( s ) = 1 - x - s d N ( x ) for which N ( x ) - x is periodic with period 1 in order to investigate ‘flows’ of such functions to Riemann’s ζ ( s ) and the possibility of proving the Riemann Hypothesis with such an approach. We show that, excepting the trivial case where N ( x ) = x , the supremum of the real parts of the zeros of any such function is at least 1 2 . We investigate a particular flow of such functions { N λ ^ } λ 1 which converges locally uniformly to ζ ( s ) as λ 1 , and show that they exhibit features similar to ζ ( s ) . For...

An example in Beurling's theory of generalised primes

Faez Al-MaamoriTitus Hilberdink — 2015

Acta Arithmetica

We prove some connections between the growth of a function and its Mellin transform and apply these to study an explicit example in the theory of Beurling primes. The example has its generalised Chebyshev function given by [x]-1, and associated zeta function ζ₀(s) given via - ( ζ ' ( s ) ) / ( ζ ( s ) ) = ζ ( s ) - 1 , where ζ is Riemann’s zeta function. We study the behaviour of the corresponding Beurling integer counting function N(x), producing O- and Ω- results for the ’error’ term. These are strongly influenced by the size of ζ(s) near...

Page 1

Download Results (CSV)