EQUATIONS
Print ISSN: 2944-9146, E-ISSN: 2732-9976 An Open Access International Journal of Mathematical and Computational Methods in Science and Engineering
Volume 5, 2025
Computer Experimentation with Dirichlet Functions
Authors: ,
Abstract: There is a vast amount of literature about Dirichlet series, starting with the works of Cahen and followed
by the works of Hardy and Riesz, Valiron, Landau, Bohr, Kojima, etc. These series are generalizations of the
famous Euler series. Using his functional equation, Riemann extended the Euler series across the convergence line.
The problem of extending general Dirichlet series using Riemann’s method appeared, and it has been successfully
dealt with in the particular case of Dirichlet L-series, obtaining functions with properties similar to those of the
Riemann Zeta function. However, until recently, no other class of Dirichlet series has been known, that can be
continued as a meromorphic function in the whole complex plane. Moreover, the chance that Dirichlet series
might exist, such that their continuation has several poles, appeared to be very small. Our discovery of Dirichlet
functions generated by Blaschke products by a change of variable completely reversed this point of view. Now,
it is known not only that a whole class of Dirichlet series exists with continuations, series that have infinitely
many poles but also that they can have some essential singular points. In this paper, the behavior of a Dirichlet
function in a neighborhood of an essential singular point is revealed, and the behavior is really surprising. The
Dirichlet functions generated by finite Blaschke products are fit for computer experimentation since they are given
by formulas that can be implemented with ease in computer programs. In this paper, we are dealing with such
Dirichlet functions in a general context and indicate their zeros, poles, and branch points. We are looking for global
mapping properties of these functions, describing in detail their fundamental domains. Computer graphics are
offered, adding a new chapter to the study of Dirichlet functions, as well as in that of Blaschke products. Computer
programs have been created that can deal with infinite Dirichlet series and with the remarkable properties of
Dirichlet functions generated by them.
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Keywords: fundamental domains, Blaschke product, Dirichlet functions, conformal mapping, pre-images of
lines and circles, computer experimentation
Pages: 48-67
DOI: 10.37394/232021.2025.5.6