References
- Ahsanullah, M. (2004). A characterization of the uniform distribution by dual generalized order statistics. Communications in Statististics—Theory and Methods, 33, 2921–2928.
- Ahsanullah, M. (2005). On lower generalized order statistics and a characterization of power function distribution. Statistical Methods, 7(1), 16–28.
- Athar, H., Islam, H. M., & Yaqub, M. (2007). On ratio and inverse moments of generalized order statistics from Weibull distribution. Journal of Applied Statistical Science, 16, 37–46.
- Burkschat, M., Cramer, E., & Kamps, U. (2003). Dual generalized order statistics. Metron, LXI, 13–26.
- Kamps, U. (1995). A concept of generalized order statistics. Stuttgart, Germany: B. G. Teubner.
- Khan, R. U., & Kumar, D. (2010). On moments of generalized order statistics from exponentiated Pareto distribution and its characterization. Applied Mathematical Sciences (Ruse), 4, 2711–2722.
- Khan, R. U., Anwar, Z., & Athar, H. (2008). Recurrence relations for single and product moments of generalized order statistics from exponentiated Weibull distribution, Aligarh Journal of Statististics, 28, 37–45.
- Kumar, D. (2013a). Relations for marginal and joint moment generating functions of Marshall-Olkin extended logistic distribution based on lower generalized order statistics and characterization. American Journal of Mathematical and Management Sciences, 32, 19–39.
- Kumar, D. (2013b). On moments of lower generalized order statistics from exponentiated lomax distribution and characterization. American Journal of Mathematical and Management Sciences, 32, 238–256.
- Klugman, S. A., Panjer, H. H., & Willmot, G. E. (1998), Loss models, from data to decisions. New York: John Wiley & Sons.
- Mbah, A. K., & Ahsanullah, M. (2007). Some characterization of the power function distribution based on lower generalized order statistics. Pakistan Journal of Statistics, 23, 139–146.
- Pawlas, P., & Szynal, D. (2000). Rrecurrence relations for single and product moments of k–th lower record values from the inverse distributions of Pareto's type and characterizations, Discussiones Mathematicae Probability and Statistics 20, 223–231.
- Pawlas, P., & Szynal, D. (2001). Recurrence relations for single and product moments of lower generalized order statistics from the inverse Weibull distribution. Demonstratio Mathematica, XXXIV, 353–358.
- Ruiz, S. M. (1996). An algebraic identity leading to Wilson's theorem. Mathematical Gazette, 80, 579–582.
- Sultan, K. S., & Moshref, M. E. (2000). Record values from generalized Pareto distribution and associated inference, Metrika, 51, 105–116.