On zeros, singular boundary functions, and modules of angular boundary values for one class of functions analytic in a half-plane

Authors

  • B. V. Vynnyts’kyi
  • V.L. Sharan

Abstract

We obtain the description of the zeros, singular boundary functions, and modules of angular boundary values of the functions f0 which are analytic in the half-plane C+={z:z>0} and satisfy the condition ( \forall \varepsilon > 0 ) ( \exists c_1 > 0 ) (\forall z \in \mathbb{Ñ}_{+} ): | f ( z ) | \leq c_1 \exp ( (\sigma + \varepsilon) | z \eta ( | z | ) ), , where 0 \leq \sigma < +\infty is a given number and \eta is a positive function continuously differentiable on [0; +\infty and such that t\eta'(t)/\eta(t) \rightarrow 0 as t \rightarrow + \infty/

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Published

25.06.2004

Issue

Vol. 56 No. 6 (2004)

Section

Short communications

How to Cite

Vynnyts’kyi, B. V., and V.L. Sharan. “On Zeros, Singular Boundary Functions, and Modules of Angular Boundary Values for One Class of Functions Analytic in a Half-Plane”. Ukrains’kyi Matematychnyi Zhurnal, vol. 56, no. 6, June 2004, pp. 851–856, https://umj.imath.kiev.ua/index.php/umj/article/view/3803.