[[1] Ahmad, A.A. (2001): Moments of order statistics from doubly truncated continuous distributions and characterizations, Statistics, Vol. 35, 479-494.10.1080/02331880108802749]Search in Google Scholar
[[2] Ahsanullah, M. (2004): A characterization of the uniform distribution by dual generalized order statistics, Communication of Statistics Theory and Methods, Vol. 33, 2921-2928.]Search in Google Scholar
[[3] Asadi, M., Rao, C.R. and Shanbahag, D.N. (2001): Some unified characterization result on generalized Pareto distribution, Journal of Statistical Planning and Inference, Vol. 93, 29-50.]Search in Google Scholar
[[4] Bieniek M and Szynal D (2003): Characterizations of distributions via linearity of regression of generalized order statistics, Metrika, Vol. 58, 259-271.]Search in Google Scholar
[[5] Burkschat, M., Cramer, E. and Kamps, U. (2003): Dual generalized order statistics, Metron, Vol. LXI, 13-26.]Search in Google Scholar
[[6] Chang, S.K. (2007): Recurrence relations of quotient moments of the Weibull distribution by record values. Journal of Applied Mathematics and Computing,Vol. 1, 471-477.]Search in Google Scholar
[[7] Cramer, E. Kamps, U. and Keseling C. (2004): Characterization via linear regression of ordered random variables a unifying approach, Communication of Statistics Theory and Methods, Vol. 33, 2885-2911.]Search in Google Scholar
[[8] El-Din, M.M.M. and Kotb, M.S. (2011): Recurrence relations for quotient moments of generalized order statistics and characterization, Journal of Advance Research in Statistics and Probability, Vol. 3, 1-14.]Search in Google Scholar
[[9] Govindarajulu, Z. (2001): Characterization of double exponential using moments of order statistics, Communication of Statistics Theory and Methods, Vol. 30, 2355-2372.]Search in Google Scholar
[[10] Grudzien, Z. and Szynal, D. (1998): On characterizations of continuous in terms of moments of order statistics when the sample size is random. Journal of Mathematical Sciences, Vol. 92, 4017-4022.10.1007/BF02432335]Search in Google Scholar
[[11] Hwang, J.S. and Lin, G.D. (1984): On a generalized moments problem II. Proc. American Mathematical Society, Vol. 91, 577-580.]Search in Google Scholar
[[12] Kamps, U. (1995): A Concept of Generalized Order Statistics, B.G. Teubner Stuttgart, Germany.10.1007/978-3-663-09196-7]Search in Google Scholar
[[13] Kamps, U. (1998): Characterizations of distributions by recurrence relations and identities for moments of order statistics. In: Balakrishnan N and Rao CR, Handbook of Statistics 16, Order Statistics: Theory & Methods, North-Holland, Amsterdam, Vol. 16, 291-311.10.1016/S0169-7161(98)16012-1]Search in Google Scholar
[[14] Keseling, C. (1999): Conditional distributions of generalized order statistics and some characterizations, Metrika, Vol. 49, 27-40.]Search in Google Scholar
[[15] Khan, A.H. and Abouammoh, A.M. (1999): Characterizations of distributions by conditional expectation of order statistics, Journal of Applied Statistical Sciences, Vol. 9, 159-168.]Search in Google Scholar
[[16] Khan, A.H., Khan, R.U. and Yaqub, M. (2006): Characterization of continuous distributions through conditional expectation of functions of generalized order statistics, Journal of Applied Probability and Statistics, Vol. 1, 115-131.]Search in Google Scholar
[[17] Khan, R.U. and Kumar, D. (2010): On moments of lower generalized order statistics from exponentiated Pareto distribution and its characterization, Applied Mathematical Sciences (Ruse), Vol. 55, 2711-2722.]Search in Google Scholar
[[18] Khan, R.U. and Kumar, D. (2011): Lower generalized order statistics from exponentiated gamma distribution and its characterization. ProbStats Forum, Vol. 4, 25-38.]Search in Google Scholar
[[19] Khan, RU and Kumar, D. (2011): Expectation identities of lower generalized order statistics from generalized exponential distribution and a characterization. Mathematical Methods of Statistics, Vol. 20, 150-157.10.3103/S1066530711020049]Search in Google Scholar
[[20] Kumar, D. (2011): Explicit expressions for moments of lower generalized order statistics from exponentiated Kumaraswamy distribution and its characterization. Journal of Applied Probability and Statistics, Vol. 6, 61-72.]Search in Google Scholar
[[21] Kumar, D. (2012): Relations for moments of lower generalized order statistics from a family of Jshaped distributions and its characterization. Journal of Applied Probability and Statistics, Vol. 7, 71-86.]Search in Google Scholar
[[22] Lee, M.Y. and Chang, S.K. (2004): Recurrence relations of quotient moments of the exponential distribution by record values. Honam Mathematical Journal, Vol. 26, 463-469.]Search in Google Scholar
[[23] Lee, M.Y. and Chang, S.K. (2004): Recurrence relations of quotient moments of the Pareto distribution by record values. Pure and Applied Mathematics, Vol. 11, 97-102.]Search in Google Scholar
[[24] Lee, M.Y. and Chang, S.K. (2004): Recurrence relations of quotient moments of the power function distribution by record values, Kangweon-Kyungki Mathematical Journal, vol. 12, 15-22.]Search in Google Scholar
[[25] Mbah, A.K. and Ahsanullah, M. (2007): Some characterization of the power function distribution based on lower generalized order statistics, Pakistan Journal of Statistics, Vol. 23, 139-146.]Search in Google Scholar
[[26] Pawlas, P. and Szynal, D. (2001): Recurrence relations for single and product moments of lower generalized order statistics from the inverse Weibull distribution, Demonstratio Mathematica, Vol.XXXIV, 353-358.]Search in Google Scholar
[[27] Wu, J. and Ouyang, L.Y. (1996): On characterizing distributions by conditional expectations of functions of order statistics, Metrika, Vol. 34, 135-147. ]Search in Google Scholar