Dae-Hee Ryu scite author profile

Let {Y i ; −∞ < i < ∞} be a doubly infinite sequence of identically distributed and ρ *-mixing random variables with zero means and finite variances and {a i ; −∞ < i < ∞} an absolutely summable sequence of real numbers. In this paper, we prove the complete moment convergence of { P n k=1 P ∞ i=−∞ a i+k Y i /n 1/p ; n ≥ 1} under some suitable conditions. We extend Theorem 1.1 of Li and Zhang [Y. X. Li and L. X. Zhang, Complete moment convergence of moving average processes under dependence assumptions, Statist. Probab. Lett. 70 (2004), 191-197.] to the ρ *-mixing case.

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The Almost Sure Convergence of Aana Sequences in Double Arrays

Ko¹,

Ryu²,

Taesung³

2006

Bulletin of the Korean Mathematical Society

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The strong law of large numbers for arrays of NA random variables

Lee¹,

Seo²,

Kim³

et al. 2006

imf

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Dae-Hee Ryu

Limiting Behaviors of Weighted Sums for Linearly Negative Quadrant Dependent Random Variables

A Central Limit Theorem for General Weighted Sums of LNQD Random Variables and Its Application

ON THE COMPLETE MOMENT CONVERGENCE OF MOVING AVERAGE PROCESSES GENERATED BY ρ^*-MIXING SEQUENCES

The Almost Sure Convergence of Aana Sequences in Double Arrays

The strong law of large numbers for arrays of NA random variables

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Resources

About

Dae-Hee Ryu

Limiting Behaviors of Weighted Sums for Linearly Negative Quadrant Dependent Random Variables

A Central Limit Theorem for General Weighted Sums of LNQD Random Variables and Its Application

ON THE COMPLETE MOMENT CONVERGENCE OF MOVING AVERAGE PROCESSES GENERATED BY ρ*-MIXING SEQUENCES

The Almost Sure Convergence of Aana Sequences in Double Arrays

The strong law of large numbers for arrays of NA random variables

Contact Info

Product

Resources

About

ON THE COMPLETE MOMENT CONVERGENCE OF MOVING AVERAGE PROCESSES GENERATED BY ρ^*-MIXING SEQUENCES