Paley Effect for Entire Dirichlet Series

Authors

  • T. Ya. Hlova
  • P. V. Filevych

Abstract

For the entire Dirichlet series $f(z) = ∑_{n = 0}${∞$ a_n e^{zλn}$, we establish necessary and sufficient conditions on the coefficients $a_n$ and exponents $λ_n$ under which the function $f$ has the Paley effect, i.e., the condition $$\underset{r\to +\infty }{ \lim \sup}\frac{ \ln {M}_f(r)}{T_f(r)}=+\infty$$ is satisfied, where $M_f (r)$ and $T_f (r)$ are the maximum modulus and the Nevanlinna characteristic of the function $f$, respectively.

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Published

25.06.2015

Issue

Vol. 67 No. 6 (2015)

Section

Research articles

How to Cite

Hlova, T. Ya., and P. V. Filevych. “Paley Effect for Entire Dirichlet Series”. Ukrains’kyi Matematychnyi Zhurnal, vol. 67, no. 6, June 2015, pp. 739–751, https://umj.imath.kiev.ua/index.php/umj/article/view/2018.