Convergence of the series of large-deviation probabilities for sums of independent equally distributed random variables

  • O. I. Klesov Nat. Techn. Univ. Ukraine "KPI", Kyiv

Abstract

The series $\sum\nolimits_{n \geqslant 1} {\tau _n P(|S_n | \geqslant \varepsilon n^a )}$ is studied, where $S_n$ are the sums of independent equally distributed random variables, $τ_n$ is a sequence of nonnegative numbers, $α > 0$, and $ɛ > 0$ is an arbitrary positive number. For a broad class of sequences $τ_n$, the necessary and sufficient conditions are established for the convergence of this series for any $ɛ > 0$.
Published
25.06.1993
How to Cite
KlesovO. I. “Convergence of the Series of Large-Deviation Probabilities for Sums of Independent Equally Distributed Random Variables”. Ukrains’kyi Matematychnyi Zhurnal, Vol. 45, no. 6, June 1993, pp. 770–784, https://umj.imath.kiev.ua/index.php/umj/article/view/5866.
Section
Research articles