弱静止过程的詹森自相关函数及其应用

IF 2.7 3区数学 Q1 MATHEMATICS, APPLIED

Physica D: Nonlinear Phenomena Pub Date : 2024-11-07 DOI:10.1016/j.physd.2024.134424

Javier E. Contreras-Reyes

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引用次数: 0

摘要

以前曾提出过基于詹森不等式和方差的詹森方差（JV）信息来测量两个随机变量之间的距离。根据 JV 距离与两个弱静止过程的自相关函数之间的关系，本文提出了 Jensen-自方差函数和 Jensen-自相关函数。此外，两个不同弱静止过程之间的距离用詹森-交叉相关函数来衡量。此外，还考虑了 ARMA 和 ARFIMA 过程的自相关函数，推导出了仅取决于模型参数空间和滞后期的詹森-自相关函数的明确公式，并通过数值结果对其进行了说明。为了研究拟议函数的实用性，考虑了两个实际应用：树环和南洪堡海流生态系统时间序列。

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Jensen-autocorrelation function for weakly stationary processes and applications

The Jensen-variance (JV) information based on Jensen’s inequality and variance has been previously proposed to measure the distance between two random variables. Based on the relationship between JV distance and autocorrelation function of two weakly stationary process, the Jensen-autocovariance and Jensen-autocorrelation functions are proposed in this paper. Furthermore, the distance between two different weakly stationary processes is measured by the Jensen-cross-correlation function. Moreover, autocorrelation function is also considered for ARMA and ARFIMA processes, deriving explicit formulas for Jensen-autocorrelation function that only depends on model parametric space and lag, whose were also illustrated by numeric results. In order to study the usefulness of proposed functions, two real-life applications were considered: the Tree Ring and Southern Humboldt current ecosystem time series.

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来源期刊

Physica D: Nonlinear Phenomena 物理-物理：数学物理

CiteScore

7.30

自引率

7.50%

发文量

213

审稿时长

65 days

期刊介绍： Physica D (Nonlinear Phenomena) publishes research and review articles reporting on experimental and theoretical works, techniques and ideas that advance the understanding of nonlinear phenomena. Topics encompass wave motion in physical, chemical and biological systems; physical or biological phenomena governed by nonlinear field equations, including hydrodynamics and turbulence; pattern formation and cooperative phenomena; instability, bifurcations, chaos, and space-time disorder; integrable/Hamiltonian systems; asymptotic analysis and, more generally, mathematical methods for nonlinear systems.