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Maximum-Likelihood Estimation for the Zero-Inflated Polynomial-Adjusted Poisson Distribution

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  • Jong-Seung Lee

    (Department of Next Generation Smart Energy System Convergence, Gachon University, 1342 Seongnam-daero, Sujeong-gu, Seongnam-si 13557, Gyeonggi-do, Republic of Korea)

  • Hyung-Tae Ha

    (Department of Next Generation Smart Energy System Convergence, Gachon University, 1342 Seongnam-daero, Sujeong-gu, Seongnam-si 13557, Gyeonggi-do, Republic of Korea
    Department of Applied Statistics, Gachon University, 1342 Seongnam-daero, Sujeong-gu, Seongnam-si 13557, Gyeonggi-do, Republic of Korea)

Abstract

We propose the zero-inflated Polynomially Adjusted Poisson (zPAP) model. It extends the usual zero-inflated Poisson by multiplying the Poisson kernel with a nonnegative polynomial, enabling the model to handle extra zeros, overdispersion, skewness, and even multimodal counts. We derive the maximum-likelihood framework—including the log-likelihood and score equations under both general and regression settings—and fit zPAP to the zero-inflated, highly dispersed Fish Catch data as well as a synthetic bimodal mixture. In both cases, zPAP not only outperforms the standard zero-inflated Poisson model but also yields reliable inference via parametric bootstrap confidence intervals. Overall, zPAP is a clear and tractable tool for real-world count data with complex features.

Suggested Citation

  • Jong-Seung Lee & Hyung-Tae Ha, 2025. "Maximum-Likelihood Estimation for the Zero-Inflated Polynomial-Adjusted Poisson Distribution," Mathematics, MDPI, vol. 13(15), pages 1-20, July.
    • Handle: RePEc:gam:jmathe:v:13:y:2025:i:15:p:2383-:d:1709454
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