Tobit models for count time series

IF 0.8 4区 数学 Q3 STATISTICS & PROBABILITY
Christian H. Weiß, Fukang Zhu
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引用次数: 0

Abstract

Several models for count time series have been developed during the last decades, often inspired by traditional autoregressive moving average (ARMA) models for real‐valued time series, including integer‐valued ARMA (INARMA) and integer‐valued generalized autoregressive conditional heteroscedasticity (INGARCH) models. Both INARMA and INGARCH models exhibit an ARMA‐like autocorrelation function (ACF). To achieve negative ACF values within the class of INGARCH models, log and softplus link functions are suggested in the literature, where the softplus approach leads to conditional linearity in good approximation. However, the softplus approach is limited to the INGARCH family for unbounded counts, that is, it can neither be used for bounded counts, nor for count processes from the INARMA family. In this paper, we present an alternative solution, named the Tobit approach, for achieving approximate linearity together with negative ACF values, which is more generally applicable than the softplus approach. A Skellam–Tobit INGARCH model for unbounded counts is studied in detail, including stationarity, approximate computation of moments, maximum likelihood and censored least absolute deviations estimation for unknown parameters and corresponding simulations. Extensions of the Tobit approach to other situations are also discussed, including underlying discrete distributions, INAR models, and bounded counts. Three real‐data examples are considered to illustrate the usefulness of the new approach.
计数时间序列的 Tobit 模型
过去几十年来,人们开发了多种计数时间序列模型,其灵感往往来自实值时间序列的传统自回归移动平均(ARMA)模型,包括整数值 ARMA(INARMA)和整数值广义自回归条件异方差(INGARCH)模型。INARMA 和 INGARCH 模型都表现出类似 ARMA 的自相关函数 (ACF)。为了在 INGARCH 模型中实现负 ACF 值,文献中提出了对数和软加链接函数,其中软加方法可以很好地近似条件线性。然而,softplus 方法仅限于 INGARCH 族中的无界计数,也就是说,它既不能用于有界计数,也不能用于 INARMA 族中的计数过程。在本文中,我们提出了另一种解决方案,即 Tobit 方法,用于实现近似线性和负 ACF 值,它比软加法更普遍适用。本文详细研究了无界计数的 Skellam-Tobit INGARCH 模型,包括静态性、矩的近似计算、未知参数的最大似然估计和删减最小绝对偏差估计以及相应的模拟。还讨论了 Tobit 方法在其他情况下的扩展,包括基本离散分布、INAR 模型和有界计数。还考虑了三个真实数据示例,以说明新方法的实用性。
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
Scandinavian Journal of Statistics
Scandinavian Journal of Statistics 数学-统计学与概率论
CiteScore
1.80
自引率
0.00%
发文量
61
审稿时长
6-12 weeks
期刊介绍: The Scandinavian Journal of Statistics is internationally recognised as one of the leading statistical journals in the world. It was founded in 1974 by four Scandinavian statistical societies. Today more than eighty per cent of the manuscripts are submitted from outside Scandinavia. It is an international journal devoted to reporting significant and innovative original contributions to statistical methodology, both theory and applications. The journal specializes in statistical modelling showing particular appreciation of the underlying substantive research problems. The emergence of specialized methods for analysing longitudinal and spatial data is just one example of an area of important methodological development in which the Scandinavian Journal of Statistics has a particular niche.
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