https://orcid.org/0000-0002-7210-4541
References
- Baccini, A., Barabesi, L., and Stracqualursi, L. (2016), ‘Random Variate Generation and Connected Computational Issues for the Poisson–Tweedie Distribution’, Computational Statistics, 31(2), 729–748.
- Barabesi, L., Becatti, C., and Marcheselli, M. (2018), ‘The Tempered Discrete Linnik Distribution’, Statistical Methods & Applications, 27(1), 45–68.
- Barabesi, L., and Pratelli, L. (2014), ‘A Note on a Universal Random Variate Generator for Integer-Valued Random Variables’, Statistics and Computing, 24(4), 589–596.
- Batsidis, A., Jiménez-Gamero, M.D., and Lemonte, A.J. (2020), ‘On Goodness-of-Fit Tests for the Bell Distribution’, Metrika, 83(3), 297–319.
- Bell, E.T. (1934), ‘Exponential Numbers’, The American Mathematical Monthly, 41(7), 411–419.
- Betsch, S., and Ebner, B. (2019), ‘A New Characterization of the Gamma Distribution and Associated Goodness-of-Fit Tests’, Metrika, 82(7), 779–806.
- Borel, E. (1942), ‘Sur L'Emploi Du Théoreme De Bernoulli Pour Faciliter Le Calcul D'une Infinité De Coefficients. Application Au Probleme De L'Attentea Un Guichet’, Comptes Rendus de l'Académie des Sciences, 214, 452–456.
- Castellares, F., Ferrari, S.L.P., and Lemonte, A.J. (2018), ‘On the Bell Distribution and Its Associated Regression Model for Count Data’, Applied Mathematical Modelling, 56, 172–185.
- Dhar, S.S., Dassios, A., and Bergsma, W. (2016), ‘A Study of the Power and Robustness of a New Test for Independence Against Contiguous Alternatives’, Electronic Journal of Statistics, 10(1), 330–351.
- El-Shaarawi, A.H., Zhu, R., and Joe, H. (2011), ‘Modelling Species Aabundance Using the Poisson–Tweedie Family’, Environmetrics, 22(2), 152–164.
- Gibbons, J.D., and Chakraborti, S. (2020), Nonparametric Statistical Inference, Boca Raton: CRC Press.
- Gürtler, N., and Henze, N. (2000), ‘Recent and Classical Goodness-of-Fit Tests for the Poisson Distribution’, Journal of Statistical Planning and Inference, 90(2), 207–225.
- Janson, S., and Luczak, M.J. (2008), ‘Susceptibility in Subcritical Random Graphs’, Journal of Mathematical Physics, 49(12), article ID 125207.
- Jiménez-Gamero, M.D., and Alba-Fernández, M.V. (2019), ‘Testing for the Poisson–Tweedie Distribution’, Mathematics and Computers in Simulation, 164, 146–162.
- Jiménez-Gamero, M.D., and Alba-Fernández, M.V. (2021), ‘A Test for the Geometric Distribution Based on Linear Regression of Order Statistics’, Mathematics and Computers in Simulation, 186, 103–123.
- Jiménez-Gamero, M.D., and Batsidis, A. (2017), ‘Minimum Distance Estimators for Count Data Based on the Probability Generating Function with Applications’, Metrika, 80(5), 503–545.
- Johnson, N.L., Kemp, A.W., and Kotz, S. (2005), Univariate Discrete Distributions (Vol. 444), Hoboken: John Wiley & Sons.
- Kalemkerian, J., and Fernández, D. (2020), ‘An Independence Test Based on Recurrence Rates’, Journal of Multivariate Analysis, 178, article ID 104624.
- Kocherlakota, S., and Kocherlakota, K. (1986), ‘Goodness of Fit Tests for Discrete Distributions’, Communications in Statistics - Theory Methods, 15(3), 815–829.
- Meintanis, S.G., and Nikitin, Y.Y. (2008), ‘A Class of Count Models and a New Consistent Test for the Poisson Distribution’, Journal of Statistical Planning and Inference, 138(12), 3722–3732.
- Meselidis, C., and Karagrigoriou, A. (2020), ‘Statistical Inference for Multinomial Populations Based on a Double Index Family of Test Statistics’, Journal of Statistical Computation and Simulation, 90(10), 1773–1792.
- Nakamura, M., and Pérez-Abreu, V. (1993), ‘Use of An Empirical Probability Generating Function for Testing a Poisson Model’, Canadian Journal of Statistics, 21(2), 149–156.
- Puig, P., and Weiß, C.H. (2020), ‘Some Goodness-of-Fit Tests for the Poisson Distribution with Applications in Biodosimetry’, Computational Statistics & Data Analysis, 144, article ID 106878.
- R Core Team (2021), R: A Language and Environment for Statistical Computing, R Foundation for Statistical Computing, Austria: Vienna. https://www.R-project.org/
- Rueda, R., and O'Reilly, F. (1999), ‘Tests of Fit for Discrete Distributions Based on the Probability Generating Function’, Communications in Statistics - Simulation and Computation, 28(1), 259–274.
- Rueda, R., O'Reilly, F., and Pérez-Abreu, V. (1991), ‘Goodness of Fit for the Poisson Distribution Based on the Probability Generating Function’, Communications in Statistics - Theory and Methods, 20(10), 3093–3110.
- Sim, S.Z., and Ong, S.H. (2010), ‘Parameter Estimation for Discrete Distributions by Generalized Hellinger-Type Divergence Based on Probability Generating Function’, Communications in Statistics - Simulation and Computation, 39(2), 305–314.
- Steutel, F.W., and Van Harn, K. (2003), Infinite Divisibility of Probability Distributions on the Real Line, New York: CRC Press.
- Tsylova, E.G., and Ekgauz, E.Y. (2017), ‘Using Probabilistic Models to Study the Asymptotic Behavior of Bell Numbers’, Journal of Mathemathical Science, 221(4), 609–615.
- Van der Vaart, A.W. (2000), Asymptotic Statistics (Vol. 3), Cambridge: Cambridge University Press.