References
- Arellano-Valle, R. B., and A. Azzalini. 2006. On unification of skew normal families. Scand. J. Stat., 33, 561–574.
- Arellano-Valle, R. B., H. W. Gomez, and F. A. Quintana. 2004. A new class of skew normal distribution. Commun. Stat. Theory Methods, 33, 1465–1480.
- Azzalini, A. 1985. A class of distributions which includes the normal ones. Scand. J. Stat., 12, 171–178.
- Azzalini, A. 1986. Further results on a class of distributions which includes the normal. Statistica, 46, 199–208.
- Buccianti, A. 2005. Meaning of the λ parameter of skew normal and log skew normal distributions in fluid geo chemistry. CODAWORK’05, October 19–21, 1–15.
- Genton, M. G. 2004. Skew-elliptical distributions and their applications. New York, NY: Chapman and Hall.
- Gonzales-Farias, G., J. Dominguez-Molina, and A. Gupta. 2004. Additive properties of skew normal random vectors. J. Stat. Plan. Inference, 126, 521–534.
- Gupta, R. C., and R. D. Gupta. 2004. Generalized skew normal model. Test, 13, 501–524.
- Gupta, A. K., M. A. Aziz, and W. Ning. 2013. On some properties of the unified skew normal distribution. J. Stat. Theory Pract., 7(3), 480–495.
- Henze, N. 1986. A probabilistic representation of the skew normal distribution. Scand. J. Stat., 13, 271–275.
- Kumar, C. S., and M. R. Anusree. 2011. On a generalized mixture of standard normal and skew normal distributions. Stat. Probability Lett., 81, 1813–1821.
- Kumar, C. S., and M. R. Anusree. 2013a. On a generalized two-piece skew normal distribution and some of its properties. Statistics, 47(6), 1370–138.
- Kumar, C. S., and M. R. Anusree, 2013b. On an extended version of skew generalized normal distribution and some of its properties. Commun. Stat. Theory Methods, doi: 10.1080/03610926.2012.739251.
- Loperfido, N. 2001. Quadratic forms of skew-normal random vectors. Stat. Probability Lett., 54, 381–387.
- Pewsey, A. 2000. Problems of inference for Azzalini’s skew-normal distribution. J. App. Stat., 27(7), 859–870.
- Roberts, H. V. 1988. Data analysis for managers with Minitab. Redwood City, CA: Scientific Press.