🌙

一种用于协变量依赖时间序列高效谱分析的倒谱模型

A Cepstral Model for Efficient Spectral Analysis of Covariate-Dependent Time Series

Journal of Computational and Graphical Statistics · 2025
被引 0
ABS 3

中文导读

提出一种快速计算模型,通过倒谱系数建立协变量与时间序列功率谱的关联,两阶段估计方法比现有方法更高效,适用于经济学、生物学等领域。

Abstract

This article introduces a novel and computationally fast model to study the association between covariates and power spectra of replicated time series. A random covariate-dependent Cramér spectral representation and a semiparametric log-spectral model are used to quantify the association between the log-spectra and covariates. Each replicate-specific log-spectrum is represented by the cepstral coefficients, inducing a cepstral-based multivariate linear model with the cepstral coefficients as the responses. By using only a small number of cepstral coefficients, the model parsimoniously captures frequency patterns of time series and saves a significant amount of computational time compared to existing methods. A two-stage estimation procedure is proposed. In the first stage, a Whittle likelihood-based approach is used to estimate the truncated replicate-specific cepstral coefficients. In the second stage, parameters of the cepstral-based multivariate linear model, and consequently the effect functions of covariates, are estimated. The model is flexible in the sense that it can accommodate various estimation methods for the multivariate linear model, depending on the application, domain knowledge, or characteristics of the covariates. Numerical studies confirm that the proposed method outperforms some existing methods despite its simplicity and shorter computational time. Supplementary materials for this article are available online.

时间序列分析谱分析计量经济学机器学习统计学