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Main Authors: Lederman, Jimmy, Schein, Aaron
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2507.09032
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author Lederman, Jimmy
Schein, Aaron
author_facet Lederman, Jimmy
Schein, Aaron
contents The Poisson distribution is the default choice of likelihood for probabilistic models of count data. However, due to the equidispersion contraint of the Poisson, such models may have predictive uncertainty that is artificially inflated. While overdispersion has been extensively studied, conditional underdispersion -- where latent structure renders data more regular than Poisson -- remains underexplored, in part due to the lack of tractable modeling tools. We introduce a new class of models based on discrete order statistics, where observed counts are assumed to be an order statistic (e.g., minimum, median, maximum) of i.i.d. draws from some discrete parent, such as the Poisson or negative binomial. We develop a general data augmentation scheme that is modular with existing tools tailored to the parent distribution, enabling parameter estimation or posterior inference in a wide range of such models. We characterize properties of Poisson and negative binomial order statistics, exposing interpretable knobs on their dispersion. We apply our framework to four case studies -- i.e., to commercial flight times, COVID-19 case counts, Finnish bird abundance, and RNA sequencing data -- and illustrate the flexibility and generality of the proposed framework. Our results suggest that order statistic models can be built, used, and interpreted in much the same way as commonly-used alternatives, while often obtaining better fit, and offer promise in the wide range of applications in which count data arise.
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publishDate 2025
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spellingShingle Modeling Latent Underdispersion with Discrete Order Statistics
Lederman, Jimmy
Schein, Aaron
Methodology
The Poisson distribution is the default choice of likelihood for probabilistic models of count data. However, due to the equidispersion contraint of the Poisson, such models may have predictive uncertainty that is artificially inflated. While overdispersion has been extensively studied, conditional underdispersion -- where latent structure renders data more regular than Poisson -- remains underexplored, in part due to the lack of tractable modeling tools. We introduce a new class of models based on discrete order statistics, where observed counts are assumed to be an order statistic (e.g., minimum, median, maximum) of i.i.d. draws from some discrete parent, such as the Poisson or negative binomial. We develop a general data augmentation scheme that is modular with existing tools tailored to the parent distribution, enabling parameter estimation or posterior inference in a wide range of such models. We characterize properties of Poisson and negative binomial order statistics, exposing interpretable knobs on their dispersion. We apply our framework to four case studies -- i.e., to commercial flight times, COVID-19 case counts, Finnish bird abundance, and RNA sequencing data -- and illustrate the flexibility and generality of the proposed framework. Our results suggest that order statistic models can be built, used, and interpreted in much the same way as commonly-used alternatives, while often obtaining better fit, and offer promise in the wide range of applications in which count data arise.
title Modeling Latent Underdispersion with Discrete Order Statistics
topic Methodology
url https://arxiv.org/abs/2507.09032