English

A Small Intervals Theorem for Subharmonic Functions

Complex Variables 2019-11-07 v1

Abstract

Let C\mathbb C be the complex plane, EE be a measurable subset in a segment [0,R][0, R] of the positive semiaxis R+\mathbb R^+, u≢u\not\equiv -\infty be a subharmonic function on C\mathbb C. The main result of this article is an upper estimate of the integral of the module u|u| over a subset of EE through the maximum of the function uu on a circle of radius RR centered at zero and a linear Lebesgue measure of subset EE. Our result develops one of the classical theorems of R. Nevanlinna in the case of E=[0,R]E=[0, R] and versions of so-called Small Arcs Lemma by Edrei-Fuchs for small intervals on R+\mathbb R^+ from the works of A.F. Grishin, M.L. Sodin, T.I. Malyutina. Our obtained estimate is uniform in the sense that the constants in the estimates are absolute and do not depend on the subharmonic function under the semi-normalization u(0)0u(0)\geq 0.

Keywords

Cite

@article{arxiv.1911.02370,
  title  = {A Small Intervals Theorem for Subharmonic Functions},
  author = {Liliia Gabdrakhmanova and Bulat Khabibullin},
  journal= {arXiv preprint arXiv:1911.02370},
  year   = {2019}
}

Comments

9 pages, in Russian

R2 v1 2026-06-23T12:07:23.922Z