基于乘法薄化的整数值GARCH模型

A multiplicative thinning‐based integer‐valued GARCH model

Journal of Time Series Analysis · 2023
被引 13 · 同刊同年前 5%
ABS 3

中文导读

提出一种乘法整数值时间序列模型,结合INGARCH、ACD和INAR特征,能简洁生成高过度离散、持久性和厚尾性,并给出两阶段加权最小二乘估计及其渐近性质。

Abstract

In this article, we introduce a multiplicative integer‐valued time series model, which is defined as the product of a unit‐mean integer‐valued independent and identically distributed (i.i.d.) sequence, and an integer‐valued dependent process. The latter is defined as a binomial thinning operation of its own past and of the past of the observed process. Furthermore, it combines some features of the integer‐valued GARCH (INGARCH), the autoregressive conditional duration (ACD), and the integer autoregression (INAR) processes. The proposed model has an unspecified distribution and is able to parsimoniously generate very high overdispersion, persistence, and heavy‐tailedness. The dynamic probabilistic structure of the model is first analyzed. In addition, parameter estimation is considered by using a two‐stage weighted least squares estimate (2SWLSE), consistency and asymptotic normality (CAN) of which are established under mild conditions. Applications of the proposed formulation to simulated and actual count time series data are provided.

时间序列分析计量经济学金融统计计数数据建模