Far East Journal of Theoretical Statistics

The Far East Journal of Theoretical Statistics publishes original research papers and survey articles in the field of theoretical statistics, covering topics such as Bayesian analysis, multivariate analysis, and stochastic processes.

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A NOTE ON THE BIVARIATE GENERALIZED POISSON DISTRIBUTION OF TYPE 1

Authors

  • P. C. Batsindila Nganga
  • R. F. Mizelé Kitoti
  • E. Nguessolta
  • D. Mizère

Keywords:

generalized Poisson distribution, convergence in distribution, generalized bivariate Poisson distribution of type 1

DOI:

https://doi.org/10.17654/0972086325007

Abstract

Given the univariate generalized Poisson distribution as defined by Déniz and Sarabia [5], in this paper, we construct a bivariate generalized Poisson distribution of type 1 whose marginal distributions are univariate generalized Poisson distributions according to Déniz and Sarabia [5]. We also show that this distribution belongs to the family of bivariate Poisson distributions. Under certain conditions, this distribution converges in distribution to the bivariate Poisson distribution of Berkhout and Plug [4]. It also converges to the bivariate Poisson distribution of Lakshminarayana et al. [9].

Received: November 24, 2024
Accepted: February 11, 2025

References

R. Bidounga, M. Koukouatikissa Diafouka, R. F. Mizélé Kitoti and D. Mizère, The bivariate extended Poisson distribution of type 1, Eur. J. Pure Appl. Math. 14(4) (2021a), 1517-1529.

R. Bidounga, P. C. Batsindila Nganga, L. Niéré and D. Mizère, A note on the (weighted) bivariate Poisson distribution, Eur. J. Pure Appl. Math. 14(1) (2021b), 192-203.

P. C. Batsindila Nganga, R. Bidounga, D. Mizère and C. C. Kokonendji, Comparison between two bivariate Poisson distributions through the phi-divergence, Afrika Statistika 12(3) (2017), 1481-1494.

P. Berkhout and E. Plug, A bivariate Poisson count data model using conditional probabilities, Statist. Neerlandica 58(3) (2004), 349-364.

E. G. Déniz and J. M. Sarabia, A discrete distribution including the Poisson, Communication in Statistics-Theory and Methods 45(8) (2016), 2311-2322.

F. Famoye, A new bivariate generalized Poisson distribution, Statistica Neerlandica 64(1) (2010), 112-124.

G. J. O. Jameson, The incomplete gamma functions, The Mathematical Gazette 100(548) (2016), 298-306.

P. Holgate, Estimation for the bivariate Poisson distribution, Biometrika 51 (1964), 241-245.

J. Lakshminarayana, S. N. N. Pandit and K. Srinivasa Rao, On a bivariate Poisson distribution, Communications in Statistics Theory and Methods 28(2) (1999), 267 276.

C. G. Louzayadio, E. Nguessolta, M. Koukouatikissa Diafouka, R. Bidounga and D. Mizère, The bivariate extended Poisson distribution of type 2, J. Comp. Sci. Appl. Math. 5(2) (2023), 89-102.

D. Karlis and P. Tsiamyrtzis, Exact Bayesian modeling for bivariate Poisson data and extensions, Stat. Comput. 18(1) (2008), 27-40.

K. Kawamura, The structure of bivariate Poisson distribution, Kodai Math. Sem. J. 25 (1973), 246-256.

A. Morin, Loi de Poisson multivariée, Journal de la Société Statistique de Paris 134(2) (1993), 3-13.

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Published

2025-04-14

Issue

Vol. 69 No. 2 (2025)

Section

Articles

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How to Cite

A NOTE ON THE BIVARIATE GENERALIZED POISSON DISTRIBUTION OF TYPE 1. (2025). Far East Journal of Theoretical Statistics , 69(2), 155-168. https://doi.org/10.17654/0972086325007

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