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Cogent Mathematics & Statistics Volume 5, 2018 - Issue 1
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Research Article

A trivariate Bernoulli regression model

M. Ataharul IslamISRT (Institute of Statistical Research and Training), University of Dhaka, Dhaka, BangladeshCorrespondence[email protected]
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Article: 1472519 | Received 24 Jul 2017, Accepted 01 May 2018, Published online: 04 Jun 2018

References

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  • Islam, M. A., Alzaid, A. A., Chowdhury, R. I., & Sultan, K. S. (2013). A generalized bivariate Bernoulli model with covariate dependence. Journal of Applied Statistics, 40(5), 1064–1075. doi:10.1080/02664763.2013.780156
  • Islam, M. A., & Chowdhury, R. I. (2006). A higher order Markov model for analyzing covariate dependence. Applied Mathematical Modeling, 30, 477–488. doi:10.1016/j.apm.2005.05.006
  • Islam, M. A., & Chowdhury, R. I. (2008). Chapter 4: First and higher order transition models with covariate dependence. In F. Columbus (Ed.). Progress in applied mathematical modeling (pp. 153–196). Hauppage, NY: Nova Science Publishers.
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  • Islam, M. A., Chowdhury, R. I., & Briollais, L. (2012a). A bivariate binary model for testing depedence in outcomes. Bulletin of Malaysian Mathematical Sciences Society, 35, 845–858.
  • Islam, M. A., Chowdhury, R. I., & Huda, S. (2009). Markov models with covariate dependence for repeated measures. New York: Nova Science Publishers.
  • Marshall, A. W., & Olkin, I. (1985). A family of bivariate distributions generated by the bivariate Bernoulli distribution. Journal of the American Statistical Association, 80, 332–338. doi:10.1080/01621459.1985.10478116
  • McCullagh, P., & Nelder, J. A. (1989). Generalized linear models (2nd ed.). London: Chapman and Hall.
  • Yee, T. W., & Dirnbock, T. (2009). Models for analyzing species’ presence/absence data at two time points. Journal of Theoretical Biology, 259, 684–694. doi:10.1016/j.jtbi.2009.05.004

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