The Burr Type XII distribution is a member of a system of continuous distributions introduced by
Irving W. Burr (1942), which comprises 12 distributions.[8]
The
Dagum distribution, also known as the inverse Burr distribution, is the distribution of 1 / X, where X has the Burr distribution
References
^Nadarajah, S.; Pogány, T. K.; Saxena, R. K. (2012). "On the characteristic function for Burr distributions". Statistics. 46 (3): 419–428.
doi:
10.1080/02331888.2010.513442.
S2CID120848446.
^Maddala, G. S. (1996) [1983]. Limited-Dependent and Qualitative Variables in Econometrics. Cambridge University Press.
ISBN0-521-33825-5.
^Tadikamalla, Pandu R. (1980), "A Look at the Burr and Related Distributions", International Statistical Review, 48 (3): 337–344,
doi:
10.2307/1402945,
JSTOR1402945
^C. Kleiber and S. Kotz (2003). Statistical Size Distributions in Economics and Actuarial Sciences. New York: Wiley. See Sections 7.3 "Champernowne Distribution" and 6.4.1 "Fisk Distribution."
The Burr Type XII distribution is a member of a system of continuous distributions introduced by
Irving W. Burr (1942), which comprises 12 distributions.[8]
The
Dagum distribution, also known as the inverse Burr distribution, is the distribution of 1 / X, where X has the Burr distribution
References
^Nadarajah, S.; Pogány, T. K.; Saxena, R. K. (2012). "On the characteristic function for Burr distributions". Statistics. 46 (3): 419–428.
doi:
10.1080/02331888.2010.513442.
S2CID120848446.
^Maddala, G. S. (1996) [1983]. Limited-Dependent and Qualitative Variables in Econometrics. Cambridge University Press.
ISBN0-521-33825-5.
^Tadikamalla, Pandu R. (1980), "A Look at the Burr and Related Distributions", International Statistical Review, 48 (3): 337–344,
doi:
10.2307/1402945,
JSTOR1402945
^C. Kleiber and S. Kotz (2003). Statistical Size Distributions in Economics and Actuarial Sciences. New York: Wiley. See Sections 7.3 "Champernowne Distribution" and 6.4.1 "Fisk Distribution."