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Main Authors: Weiß, Christian H., Silbernagel, Angelika
Format: Preprint
Published: 2026
Subjects:
Online Access:https://arxiv.org/abs/2605.14796
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author Weiß, Christian H.
Silbernagel, Angelika
author_facet Weiß, Christian H.
Silbernagel, Angelika
contents Existing integer-valued autoregressive (INAR) models for count random fields suffer from difficulties in characterizing the stationary marginal distribution and in computing conditional probabilities (as required for likelihood inference). To overcome these drawbacks, the novel class of combined INAR (CINAR) models is proposed, which both exhibits the classical autoregressive dependence structure and allows to specify the marginal distribution within the wide class of discrete self-decomposable distributions. In particular, CINAR random fields can be equipped with a Poisson or negative-binomial marginal distribution. The CINAR's key stochastic properties are derived (including a simple expression for conditional probabilities), and special cases as well as possible extensions are discussed. Approaches for parameter estimation are developed and investigated, and the practical relevance of the novel CINAR family is demonstrated by an agricultural data application.
format Preprint
id arxiv_https___arxiv_org_abs_2605_14796
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle A Class of Higher-Order INAR Random Fields for Poisson Counts and Beyond
Weiß, Christian H.
Silbernagel, Angelika
Methodology
Existing integer-valued autoregressive (INAR) models for count random fields suffer from difficulties in characterizing the stationary marginal distribution and in computing conditional probabilities (as required for likelihood inference). To overcome these drawbacks, the novel class of combined INAR (CINAR) models is proposed, which both exhibits the classical autoregressive dependence structure and allows to specify the marginal distribution within the wide class of discrete self-decomposable distributions. In particular, CINAR random fields can be equipped with a Poisson or negative-binomial marginal distribution. The CINAR's key stochastic properties are derived (including a simple expression for conditional probabilities), and special cases as well as possible extensions are discussed. Approaches for parameter estimation are developed and investigated, and the practical relevance of the novel CINAR family is demonstrated by an agricultural data application.
title A Class of Higher-Order INAR Random Fields for Poisson Counts and Beyond
topic Methodology
url https://arxiv.org/abs/2605.14796