ON THE RATE OF CONVERGENCE IN THE STRONG LAW OF LARGE NUMBERS FOR NONNEGATIVE RANDOM VARIABLES

Citation metadata

Author: V.M. Korchevsky
Date: Mar. 9, 2018
From: Journal of Mathematical Sciences(Vol. 229, Issue 6)
Publisher: Springer
Document Type: Article
Length: 2,064 words
Lexile Measure: 1720L

Document controls

Main content

Abstract :

The rate of convergence in the strong law of large numbers for sequences of nonnegative random variables is studied without the independence assumption. Conditions for which an analog of the Baum-Katz theorem holds are obtained. Bibliography: 10 titles

Source Citation

Source Citation   

Gale Document Number: GALE|A539254130