References
- Aitchison, J. 1975. Goodness of prediction fit. Biometrika 62:547–54.
- Arellano-Valle, R. B., and A. Azzalini. 2006. On the unification of families of skew–normal distributions. Scandinavian Journal of Statistics 33:561–74.
- Arellano-Valle, R. B., H. W. Gomez, and F. A. Quintana. 2004. A new class of skew–normal distribution. Communication in Statistics :Theory and Methods 33:1465–80.
- Arellano-Valle, R. B., M. D. Branco, and M. G. Genton. 2006. A unified view on skewed distributions arising from selections. Canadian Journal of Statistics 34:581–601.
- Arnold, B. C., and R. J. Beaver. 2002. Skewed multivariate models related to hidden truncation and/or selective reporting (with discussion). Test 11:7–54.
- Arnold, B. C., R. J. Beaver, R. A. Groeneveld, and W. Q. Meeker. 1993. The nontruncated marginal of a truncated bivariate normal distribution. Psychometrika 58:471–88.
- Arnold, B. C., H. W. Gomez, and J. F. Olivares-Pacheco. 2015. A doubly skewed normal distribution. Statistics 49:842–58.
- Arnold, B. C., H. W. Gomez, and H. S. Salinas. 2014. Multiple constraint and truncated skew models. Statistics 48:971–82.
- Azzalini, A. 1985. A class of distributions which includes the normal ones. Scandinavian Journal of Statistics 12:171–8.
- Balakrishnan, N. 2002. Discussion on Skew multivariate models related to hidden truncation and/or selective reporting by B. C. Arnold and R. J. Beaver. Test 11:37–9.
- Bahrami, W., H. Agahi, and H. Rangin. 2009. A two-parameter Balakrishnan skew–normal distribution. Journal of Statistical Research of Iran 6:231–42.
- Jamalizadeha, A., J. Behboodian, and N. Balakrishnan. 2008. A two-parameter generalized skew–normal distribution. Statistics & Probability Letters 78:1722–26.
- Gupta, R. C., and R. D. Gupta. 2004. Generalized skew normal model. Test 13:501–24.
- Kazemi, M. R., H. Haghbin, and J. Behboodian. 2011. Another generalization of the skew normal distribution. World Applied Sciences Journal 12:1034–39.
- Mameli, V., and M. Musio. 2013. A Generalization of the skew–normal Distribution: The Beta skew–normal. Communication in Statistics :Theory and Methods 42:2229–44.
- Roberts, H. V. 1988. Data analysis for managers with minitab. Redwood City, CA: Scientific Press.
- Sharafi, M., and J. Behboodian. 2008. The Balakrishnan skew–normal density. Statistical Papers 49:769–78.