Asymptotic Expansions for the Stationary Moments of a Modified Renewal-Reward Process with Dependent Components

IF 0.6 4区 数学 Q3 MATHEMATICS
Aynura Poladova, Salih Tekin, Tahir Khaniyev
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引用次数: 0

Abstract

In this paper, a modification of a renewal-reward process \(X(t)\) with dependent components is mathematically constructed and the stationary characteristics of this process are studied. Stochastic processes with dependent components have rarely been studied in the literature owing to their complex mathematical structure. We partially fill the gap by studying the effect of the dependence assumption on the stationary properties of the process \(X(t)\). To this end, first, we obtain explicit formulas for the ergodic distribution and the stationary moments of the process. Then we analyze the asymptotic behavior of the stationary moments of the process by using the basic results of the renewal theory and the Laplace transform method. Based on the analysis, we obtain two-term asymptotic expansions of the stationary moments. Moreover, we present two-term asymptotic expansions for the expectation, variance, and standard deviation of the process \(X\left(t\right)\). Finally, the asymptotic results obtained are examined in special cases.

Abstract Image

有依赖成分的修正奖赏过程静态矩的渐近展开
摘要 本文从数学上构建了一个具有依存成分的更新-回报过程(X(t)\)的修正过程,并研究了该过程的静态特征。由于其复杂的数学结构,具有依赖成分的随机过程在文献中很少被研究。我们通过研究依赖假设对过程 \(X(t)\)静止特性的影响,部分地填补了这一空白。为此,我们首先得到了过程的遍历分布和静态矩的明确公式。然后,我们利用更新理论的基本结果和拉普拉斯变换方法分析了过程静止矩的渐近行为。基于分析,我们得到了静止时刻的两期渐近展开。此外,我们还提出了过程 \(X\left(t\right)\) 的期望、方差和标准差的两期渐近展开。最后,在特殊情况下对得到的渐近结果进行了检验。
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来源期刊
Mathematical Notes
Mathematical Notes 数学-数学
CiteScore
0.90
自引率
16.70%
发文量
179
审稿时长
24 months
期刊介绍: Mathematical Notes is a journal that publishes research papers and review articles in modern algebra, geometry and number theory, functional analysis, logic, set and measure theory, topology, probability and stochastics, differential and noncommutative geometry, operator and group theory, asymptotic and approximation methods, mathematical finance, linear and nonlinear equations, ergodic and spectral theory, operator algebras, and other related theoretical fields. It also presents rigorous results in mathematical physics.
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