Multivariate time series models for mixed data

IF 1.5 2区数学 Q2 STATISTICS & PROBABILITY

Bernoulli Pub Date : 2021-04-02 DOI:10.3150/22-bej1474

Zinsou Max Debaly, L. Truquet

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引用次数: 8

Abstract

We introduce a general approach for modeling the dynamic of multivariate time series when the data are of mixed type (binary/count/continuous). Our method is quite flexible and conditionally on past values, each coordinate at time $t$ can have a distribution compatible with a standard univariate time series model such as GARCH, ARMA, INGARCH or logistic models whereas past values of the other coordinates play the role of exogenous covariates in the dynamic. The simultaneous dependence in the multivariate time series can be modeled with a copula. Additional exogenous covariates are also allowed in the dynamic. We first study usual stability properties of these models and then show that autoregressive parameters can be consistently estimated equation-by-equation using a pseudo-maximum likelihood method, leading to a fast implementation even when the number of time series is large. Moreover, we prove consistency results when a parametric copula model is fitted to the time series and in the case of Gaussian copulas, we show that the likelihood estimator of the correlation matrix is strongly consistent. We carefully check all our assumptions for two prototypical examples: a GARCH/INGARCH model and logistic/log-linear INGARCH model. Our results are illustrated with numerical experiments as well as two real data sets.

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混合数据的多元时间序列模型

本文介绍了数据为混合类型(二元/计数/连续)时多元时间序列动态建模的一般方法。我们的方法非常灵活，并且有条件地依赖于过去的值，时间$t$的每个坐标都可以具有与标准单变量时间序列模型(如GARCH, ARMA, INGARCH或logistic模型)兼容的分布，而其他坐标的过去值在动态中扮演外源协变量的角色。多元时间序列的同时依赖关系可以用联结公式来建模。额外的外生协变量也允许在动态。我们首先研究了这些模型通常的稳定性性质，然后证明了使用伪极大似然方法可以一致地估计方程的自回归参数，即使在时间序列数量很大的情况下也可以快速实现。此外，我们还证明了参数copula模型拟合时间序列时的一致性结果，在高斯copula的情况下，我们证明了相关矩阵的似然估计量是强一致性的。我们仔细检查了两个原型示例的所有假设:GARCH/INGARCH模型和逻辑/对数线性INGARCH模型。我们的结果用数值实验和两个实际数据集来说明。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Bernoulli 数学-统计学与概率论

CiteScore

3.40

自引率

0.00%

发文量

116

审稿时长

6-12 weeks

期刊介绍： BERNOULLI is the journal of the Bernoulli Society for Mathematical Statistics and Probability, issued four times per year. The journal provides a comprehensive account of important developments in the fields of statistics and probability, offering an international forum for both theoretical and applied work. BERNOULLI will publish: Papers containing original and significant research contributions: with background, mathematical derivation and discussion of the results in suitable detail and, where appropriate, with discussion of interesting applications in relation to the methodology proposed. Papers of the following two types will also be considered for publication, provided they are judged to enhance the dissemination of research: Review papers which provide an integrated critical survey of some area of probability and statistics and discuss important recent developments. Scholarly written papers on some historical significant aspect of statistics and probability.