Publication: Ramanujan sums and the burgess zeta function
Program
KU-Authors
KU Authors
Co-Authors
Publication Date
Language
Type
Embargo Status
Journal Title
Journal ISSN
Volume Title
Alternative Title
Abstract
The Mellin transform of a summatory function involving weighted averages of Ramanujan sums is obtained in terms of Bernoulli numbers and values of the Burgess zeta function. The possible singularity of the Burgess zeta function at s = 1 is then shown to be equivalent to the evaluation of a certain infinite series involving such weighted averages. Bounds on the size of the tail of these series are given and specific bounds are shown to be equivalent to the Riemann hypothesis.
Source
Publisher
World Scientific Publ Co Pte Ltd
Subject
Mathematics
Citation
Has Part
Source
International Journal of Number Theory
Book Series Title
Edition
DOI
10.1142/S1793042112501187