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Complete $q$ -order moment convergence of moving average processes under $ϕ$ -mixing assumptions

Xing-Cai Zhou; Jin-Guan Lin — 2014

Applications of Mathematics

Let ${Y_{i}, - \infty < i < \infty}$ be a doubly infinite sequence of identically distributed $ϕ$ -mixing random variables, and ${a_{i}, - \infty < i < \infty}$ an absolutely summable sequence of real numbers. We prove the complete $q$ -order moment convergence for the partial sums of moving average processes $\{X_{n} = \sum_{i = - \infty}^{\infty} a_{i} Y_{i + n}, n \geq 1\}$ based on the sequence ${Y_{i}, - \infty < i < \infty}$ of $ϕ$ -mixing random variables under some suitable conditions. These results generalize and complement earlier results.

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Complete $q$ -order moment convergence of moving average processes under $ϕ$ -mixing assumptions

On complete convergence for arrays of rowwise $ρ$ -mixing random variables and its applications.

Detection of outliers and patches in bilinear time series models.

On the strong laws for weighted sums of $ρ^{*}$ -mixing random variables.

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Formula preview

Currently displaying 1 – 4 of 4

Complete q -order moment convergence of moving average processes under ϕ -mixing assumptions

On complete convergence for arrays of rowwise ρ -mixing random variables and its applications.

Detection of outliers and patches in bilinear time series models.

On the strong laws for weighted sums of ρ * -mixing random variables.

Complete $q$ -order moment convergence of moving average processes under $ϕ$ -mixing assumptions

On complete convergence for arrays of rowwise $ρ$ -mixing random variables and its applications.

On the strong laws for weighted sums of $ρ^{*}$ -mixing random variables.