连续时间马尔可夫链极限分布的渐近尾

Pub Date : 2023-10-06 DOI:10.1017/apr.2023.42
Chuang Xu, Mads Christian Hansen, Carsten Wiuf
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引用次数: 4

摘要

摘要研究了非负整数子集上连续时间马尔可夫链的平稳分布和拟平稳分布的尾渐近性。基于所谓的通量平衡方程,我们建立了平稳测度和qsd的恒等式,我们用它来推导尾渐近。特别地,对于具有渐近幂律转移率的连续时间马尔可夫链,平稳分布和qsd的尾部渐近性使用三个易于计算的参数分为三种类型:(i)超指数分布,(ii)指数尾部分布和(iii)次指数分布。我们建立平稳分布的尾部渐近性的方法不同于经典的半鞅方法,并且我们不施加遍历性或矩界条件。特别地,结果也适用于可能存在多个平稳分布的爆炸马尔可夫链。此外,我们关于qsd的尾部渐近性的结果似乎是新的。我们将我们的结果应用于生化反应网络、一般单细胞随机基因表达模型、扩展类分支过程和突发性繁殖的随机种群过程,这些过程都不是生-死过程。我们的方法,连同恒等式,很容易推广到离散时间马尔可夫链。
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The asymptotic tails of limit distributions of continuous-time Markov chains
Abstract This paper investigates tail asymptotics of stationary distributions and quasi-stationary distributions (QSDs) of continuous-time Markov chains on subsets of the non-negative integers. Based on the so-called flux-balance equation, we establish identities for stationary measures and QSDs, which we use to derive tail asymptotics. In particular, for continuous-time Markov chains with asymptotic power law transition rates, tail asymptotics for stationary distributions and QSDs are classified into three types using three easily computable parameters: (i) super-exponential distributions, (ii) exponential-tailed distributions, and (iii) sub-exponential distributions. Our approach to establish tail asymptotics of stationary distributions is different from the classical semimartingale approach, and we do not impose ergodicity or moment bound conditions. In particular, the results also hold for explosive Markov chains, for which multiple stationary distributions may exist. Furthermore, our results on tail asymptotics of QSDs seem new. We apply our results to biochemical reaction networks, a general single-cell stochastic gene expression model, an extended class of branching processes, and stochastic population processes with bursty reproduction, none of which are birth–death processes. Our approach, together with the identities, easily extends to discrete-time Markov chains.
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