Integer-valued autoregressive processes with prespecified marginal and innovation distributions: a novel perspective

IF 0.5 4区 数学 Q4 STATISTICS & PROBABILITY
Matheus B. Guerrero, W. Barreto‐Souza, H. Ombao
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引用次数: 8

Abstract

Abstract Integer-valued autoregressive (INAR) processes are generally defined by specifying the thinning operator and either the innovations or the marginal distributions. The major limitations of such processes include difficulties in deriving the marginal properties and justifying the choice of the thinning operator. To overcome these drawbacks, we propose a novel approach for building an INAR model that offers the flexibility to prespecify both marginal and innovation distributions. Thus, the thinning operator is no longer subjectively selected but is rather a direct consequence of the marginal and innovation distributions specified by the modeler. Novel INAR processes are introduced following this perspective; these processes include a model with geometric marginal and innovation distributions (Geo-INAR) and models with bounded innovations. We explore the Geo-INAR model, which is a natural alternative to the classical Poisson INAR model. The Geo-INAR process has interesting stochastic properties, such as MA( ) representation, time reversibility, and closed forms for the -order transition probabilities, which enables a natural framework to perform coherent forecasting. To demonstrate the real-world application of the Geo-INAR model, we analyze a count time series of criminal records in sex offenses using the proposed methodology and compare it with existing INAR and integer-valued generalized autoregressive conditional heteroscedastic models.
具有预定边际和创新分布的整数值自回归过程:一个新的视角
抽象整数值自回归(INAR)过程通常通过指定稀疏算子和创新或边际分布来定义。这种过程的主要局限性包括在推导边际性质和证明稀疏算子的选择合理性方面的困难。为了克服这些缺点,我们提出了一种新的方法来构建INAR模型,该模型提供了预先指定边际分布和创新分布的灵活性。因此,稀疏算子不再是主观选择的,而是建模者指定的边际分布和创新分布的直接结果。从这个角度介绍了新的INAR工艺;这些过程包括具有几何边际和创新分布的模型(Geo INAR)和具有有限创新的模型。我们探索了Geo INAR模型,它是经典泊松INAR模型的自然替代方案。Geo INAR过程具有有趣的随机性质,如MA()表示、时间可逆性和阶跃变概率的闭合形式,这使得自然框架能够执行相干预测。为了证明Geo INAR模型在现实世界中的应用,我们使用所提出的方法分析了性犯罪中犯罪记录的计数时间序列,并将其与现有的INAR和整数值广义自回归条件异方差模型进行了比较。
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来源期刊
Stochastic Models
Stochastic Models 数学-统计学与概率论
CiteScore
1.30
自引率
14.30%
发文量
42
审稿时长
>12 weeks
期刊介绍: Stochastic Models publishes papers discussing the theory and applications of probability as they arise in the modeling of phenomena in the natural sciences, social sciences and technology. It presents novel contributions to mathematical theory, using structural, analytical, algorithmic or experimental approaches. In an interdisciplinary context, it discusses practical applications of stochastic models to diverse areas such as biology, computer science, telecommunications modeling, inventories and dams, reliability, storage, queueing theory, mathematical finance and operations research.
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