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Journal of the American Statistical Association Volume 115, 2020 - Issue 530
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Theory and Methods

Nonparametric Estimation of Copula Regression Models With Discrete Outcomes

Lu Yanga Amsterdam School of Economics, University of Amsterdam, Netherlands; Correspondence[email protected]
ORCID Iconhttps://orcid.org/0000-0002-7538-6687
ORCID Icon,
Edward W. Freesb Wisconsin School of Business, University of Wisconsin, Madison, WI;;
&
Zhengjun Zhangc Department of Statistics, University of Wisconsin, Madison, WI
Pages 707-720 | Received 06 Aug 2017, Accepted 31 Oct 2018, Published online: 11 Apr 2019

References

  • Aitchison, J., and Ho, C. (1989), “The Multivariate Poisson-Log Normal Distribution,” Biometrika, 76, 643–653. DOI: 10.1093/biomet/76.4.643.
  • Bermúdez, L., and Karlis, D. (2011), “Bayesian Multivariate Poisson Models for Insurance Ratemaking,” Insurance: Mathematics and Economics, 48, 226–236. DOI: 10.1016/j.insmatheco.2010.11.001.
  • Brown, C. E. (1998), “Multivariate Probit Analysis,” in Applied Multivariate Statistics in Geohydrology and Related Sciences, Berlin: Springer, pp. 167–169.
  • Chen, S. X., and Huang, T.-M. (2007),“Nonparametric Estimation of Copula Functions for Dependence Modelling,” Canadian Journal of Statistics, 35, 265–282. DOI: 10.1002/cjs.5550350205.
  • Chib, S., and Winkelmann, R. (2001), “Markov chain Monte Carlo Analysis of Correlated Count Data,” Journal of Business & Economic Statistics, 19, 428–435. DOI: 10.1198/07350010152596673.
  • Chiu, S.-T. (1991) “Bandwidth Selection for Kernel Density Estimation,” The Annals of Statistics, 19, 1883–1905. DOI: 10.1214/aos/1176348376.
  • Cox, D. R., and Snell, E. J. (1968), “A General Definition of Residuals,” Journal of the Royal Statistical Society, Series B, 30, 248–275. DOI: 10.1111/j.2517-6161.1968.tb00724.x.
  • Deheuvels, P. (1979), “La Fonction de Dépendance Empirique et ses Propriétés. Un Test Non paramétrique d’Indépendance,” Acad. Roy. Belg. Bull. Cl. Sci.(5), 65, 274–292.
  • Denuit, M. and Lambert, P. (2005), “Constraints on Concordance Measures in Bivariate Discrete Data,” Journal of Multivariate Analysis, 93, 40–57. DOI: 10.1016/j.jmva.2004.01.004.
  • Fan, J., and Gijbels, I. (1995), “Adaptive Order Polynomial Fitting: Bandwidth Robustification and Bias Reduction,” Journal of Computational and Graphical Statistics, 4, 213–227. DOI: 10.2307/1390848.
  • Fermanian, J. D., and Scaillet O. (2003). “Nonparametric estimation of copulas for time series,” Journal of Risk, 5, 25–54. DOI: 10.21314/JOR.2003.082.
  • Frees, E. W., Jin, X., and Lin, X. (2013), “Actuarial Applications of Multivariate Two-Part Regression Models,” Annals of Actuarial Science, 7, 258–287. DOI: 10.1017/S1748499512000346.
  • Frees, E. W., Lee, G., and Yang, L. (2016), “Multivariate Frequency-Severity Regression Models in Insurance,” Risks, 4, 1-36. DOI: 10.3390/risks4010004.
  • Frees, E. W., and Valdez, E. A. (1998), “Understanding Relationships Using Copulas,” North American Actuarial Journal, 2, 1–25. DOI: 10.1080/10920277.1998.10595667.
  • Genest, C., and Nešlehová, J. (2007), “A Primer on Copulas for Count Data,” Astin Bulletin, 37, 475–515. DOI: 10.1017/S0515036100014963.
  • Genest, C., Nikoloulopoulos, A. K., Rivest, L.-P., and Fortin, M. (2013), “Predicting Dependent Binary Outcomes Through Logistic Regressions and Meta-Elliptical Copulas,” Brazilian Journal of Probability and Statistics, 27, 265–284. DOI: 10.1214/11-BJPS165.
  • Haff, I. H., Aas, K., and Frigessi, A. (2010), “On the Simplified Pair-Copula Construction–Simply Useful or Too Simplistic?” Journal of Multivariate Analysis, 101, 1296–1310. DOI: 10.1016/j.jmva.2009.12.001.
  • Jiryaie, F., Withanage, N., Wu, B., and De Leon, A. (2016), “Gaussian Copula Distributions for Mixed Data, With Application in Discrimination,” Journal of Statistical Computation and Simulation, 86, 1643–1659. DOI: 10.1080/00949655.2015.1077386.
  • Joe, H. (1993) “Parametric Families of Multivariate Distributions With Given Margins,” Journal of Multivariate Analysis, 46, 262–282. DOI: 10.1006/jmva.1993.1061.
  • Joe, H. (2014), Dependence Modeling with Copulas: CRC Press.
  • Johnson, N. L., Kotz, S., and Balakrishnan, N. (1997), Discrete Multivariate Distributions, Vol. 165: Wiley New York.
  • Li, D. X. (1999), “On Default Correlation: A Copula Function Approach,” available at SSRN 187289.
  • Li, B., and Genton, M. G. (2013), “Nonparametric Identification of Copula Structures,” Journal of the American Statistical Association, 108, 666–675. DOI: 10.1080/01621459.2013.787083.
  • McCullagh, P., and Nelder, J. A. (1989), Generalized Linear Models (Vol. 37). London: CRC Press.
  • McCulloch, C. E., and Neuhaus, J. M. (2005), Generalized Linear Mixed Models, Hoboken: Wiley.
  • Muthén, B. (1979), “A Structural Probit Model With Latent Variables,” Journal of the American Statistical Association, 74, 807–811.
  • Nelsen, R. B. (2006), An Introduction to Copulas, New York: Springer Science & Business Media.
  • Nikoloulopoulos, A. K. (2013), “Copula-Based Models for Multivariate Discrete Response Data,” in Copulae in Mathematical and Quantitative Finance, eds. P. Jaworski, F. Durante, and W. K. Härdle, Berlin: Springer, pp. 231–249.
  • Nikoloulopoulos, A. K., and Karlis, D. (2008), “Multivariate Logit Copula Model With an Application to Dental Data,” Statistics in Medicine, 27, 6393–6406. DOI: 10.1002/sim.3449.
  • Nikoloulopoulos, A. K., and Karlis, D. (2009), “Modeling Multivariate Count Data Using Copulas,” Communications in Statistics-Simulation and Computation, 39, 172–187.
  • Omelka, M., Gijbels, I., and Veraverbeke, N. (2009), “Improved Kernel Estimation of Copulas: Weak Convergence and Goodness-of-Fit Testing,” The Annals of Statistics, 37, pp. 3023–3058. DOI: 10.1214/08-AOS666.
  • Panagiotelis, A., Czado, C., and Joe, H. (2012), “Pair Copula Constructions for Multivariate Discrete Data,” Journal of the American Statistical Association, 107, 1063–1072. DOI: 10.1080/01621459.2012.682850.
  • Ruppert, D., Sheather, S. J., and Wand, M. P. (1995), “An Effective Bandwidth Selector for Local Least Squares Regression,” Journal of the American Statistical Association, 90, 1257–1270. DOI: 10.1080/01621459.1995.10476630.
  • Scaillet, O., and Fermanian, J.-D. (2002), “Nonparametric Estimation of Copulas for Time Series,” FAME Research Paper.
  • Shi, P., and Valdez, E. A. (2014), “Multivariate Negative Binomial Models for Insurance Claim Counts,” Insurance: Mathematics and Economics, 55, 18–29. DOI: 10.1016/j.insmatheco.2013.11.011.
  • Shih, J. H., and Louis, T. A. (1995), “Inferences on the Association Parameter in Copula Models for Bivariate Survival Data,” Biometrics, 1384–1399. DOI: 10.2307/2533269.
  • Sklar, M. (1959), Fonctions de Répartition À N Dimensions et Leurs Marges, Université Paris 8.
  • Song, P. X.-K. (2007), Correlated Data Analysis: Modeling, Analytics, and Applications, Springer Science & Business Media.
  • Song, P. X.-K., Li, M., and Yuan, Y. (2009), “Joint Regression Analysis of Correlated Data using Gaussian Copulas,” Biometrics, Vol. 65, pp. 60–68. DOI: 10.1111/j.1541-0420.2008.01058.x.
  • Vuong, Q. H. (1989), “Likelihood Ratio Tests for Model Selection and Non-Nested Hypotheses,” Econometrica, 57, 307–333. DOI: 10.2307/1912557.
  • Winkelmann, R. (2000), “Seemingly Unrelated Negative Binomial Regression,” Oxford Bulletin of Economics and Statistics, 62, 553–560. DOI: 10.1111/1468-0084.00188.
  • Yang, L. (2017), “Copula Regression With Discrete Outcomes,” Ph.D. dissertation, University of Wisconsin–Madison.
  • Yang, X., Frees, E. W., and Zhang, Z. (2011), “A Generalized Beta Copula With Applications in Modeling Multivariate Long-Tailed Data,” Insurance: Mathematics and Economics, 49, 265–284. DOI: 10.1016/j.insmatheco.2011.04.007.
  • Zeger, S. L., and Liang, K.-Y. (1986), “Longitudinal Data Analysis for Discrete and Continuous Outcomes,” Biometrics, 42, 121–130.
  • Zilko, A. A., and Kurowicka, D. (2016), “Copula in a Multivariate Mixed Discrete–Continuous Model,” Computational Statistics & Data Analysis, 103, 28–55. DOI: 10.1016/j.csda.2016.02.017.

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