A Weighted Universality Theorem for Periodic Zeta-Functions

    Renata Macaitienė Info
    Mindaugas Stoncelis Info
    Darius Šiaučiūnas Info

Abstract

The periodic zeta-function ζ(s; a), s = σ + it is defined for σ > 1 by the Dirichlet series with periodic coefficients and is meromorphically continued to the whole complex plane. It is known that the function ζ(s; a), for some sequences a of coefficients, is universal in the sense that its shifts ζ(s + iτ ; a), τ ∈ R, approximate a wide class of analytic functions. In the paper, a weighted universality theorem for the function ζ(s; a) is obtained.

Keywords:

Hurwitz zeta-function, Mergelyan theorem, periodic zeta-function, universality

How to Cite

Macaitienė, R., Stoncelis, M., & Šiaučiūnas, D. (2017). A Weighted Universality Theorem for Periodic Zeta-Functions. Mathematical Modelling and Analysis, 22(1), 95-105. https://doi.org/10.3846/13926292.2017.1269373

Share

Published in Issue
January 11, 2017
Abstract Views
608
PDF Downloads
441

License

Copyright (c) 2017 The Author(s). Published by Vilnius Gediminas Technical University.

Creative Commons License
This work is licensed under a Creative Commons Attribution 4.0 International License.

View article in other formats

  • PDF

CrossMark check

CrossMark logo

Published

2017-01-11

Issue

Vol 22 No 1 (2017)

Section

Articles

Copyright

Copyright (c) 2017 The Author(s). Published by Vilnius Gediminas Technical University.

License

Creative Commons License
This work is licensed under a Creative Commons Attribution 4.0 International License.

How to Cite

Macaitienė, R., Stoncelis, M., & Šiaučiūnas, D. (2017). A Weighted Universality Theorem for Periodic Zeta-Functions. Mathematical Modelling and Analysis, 22(1), 95-105. https://doi.org/10.3846/13926292.2017.1269373

Share