行向和对向 mn-独立随机变量三角形数组的平均换算理论

Vinh University Journal of Science Pub Date : 2023-12-20 DOI:10.56824/vujs.2023a090

LÊ Van Thanh, P. Nhu Y

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引用次数: 0

摘要

本文建立了行向和成对 mn 依赖随机变量三角阵列的均值收敛定理。一些学者研究了 m 固定的成对 m 依赖随机变量序列的极限定理（参见 Quang 和 Nguyen [Applications of Mathematics, 2016] 和 Thanh [Bulletin of the Institute of Mathematics Academia, 2005]）。在本文中，我们建立了行向和对向 mn 依赖随机变量三角阵列的极限定理，其中 mn 可能随着 n → ∞ 而接近无穷大。主定理扩展了文献中的一些结果，包括陈、白和宋在[数学分析与应用期刊，2014]中的定理 3.1。

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A MEAN CONVERGENCE THEOREM FOR TRIANGULAR ARRAYS OF ROWWISE AND PAIRWISE mn-DEPENDENT RANDOM VARIABLES

This paper establishes a mean convergence theorem for triangular arrays of rowwise and pairwise mn-dependent random variables. Some authors studied limit theorems for sequences of pairwise m-dependent random variables where m is fixed (see, e.g., Quang and Nguyen [Applications of Mathematics, 2016] and Thanh [Bulletin of the Institute of Mathematics Academia Sinica, 2005]). In this paper, we establish a limit theorem for triangular arrays of rowwise and pairwise mn-dependent random variables, where mn may approach infinity as n → ∞. The main theorem extends some results in the literature, including Theorem 3.1 of Chen, Bai and Sung in [Journal of Mathematical Analysis and Applications, 2014].

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Vinh University Journal of Science

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