International Journal of Statistika and Mathematika, ISSN: 2277- 2790 E-ISSN: 2249-8605
Volume 9, Issue 3, April 2014 pp 85-93
Research Article
On Exact Moments of Lower Generalized Order Statistics from a Class of Exponential Distributions and its Characterization
Jagdish Saran, Kamal Nain
Department of Statistics, University of Delhi, Delhi -110007, INDIA.
Academic Editor: Dr. Dase R. K.
Linked References
Balakrishnan, N. and Joshi, P.C. (1984). Product moments of order statistics from doubly truncated exponential distribution. Naval Res. Logist. Quart, 31, 27-31.
Balakrishnan, N. and Malik, H. J. (1986). Order statistics from linear-exponential distribution, Part I : Increasing hazard rate case. Commun. Statist. – Theor. Meth, 15, 179-203.
Joshi, P. C. (1978). Recurrence relations between moments of order statistics from exponential and truncated exponential distributions. Sankhya, Ser. B, 39, 362-371.
Joshi, P. C. (1982). A note on mixed moments of order statistics from exponential and truncated exponential distributions. J. Statist. Plann. Inf., 6, 13-16.
Kamps, U. (1995a). A concept of generalized order statistics. B. G. Teubner, Stuttgart.
Kamps, U. (1995b). A concept of generalized order statistics. J. Statist. Plann. Inf., 48, 1–23.
Khan, R. U., Kulshrestha, A. and Kumar, D. (2012). Exact moments of lower generalized order statistics from exponentiated Weibull distribution and its characterization. International Journal of Statistika and Mathematika, 4(3), 81-89.
Mohie El-Din, M. M., Mahmoud, M. A. W., Abu-Youssef, S. E. and Sultan, K. S. (1997). Order statistics from the doubly truncated linear-exponential distribution and its characterizations. Commun. Statist.- Simul. Comput., 26, 281-290.
Nain, K. (2010 a). Recurrence relations for single and product moments of ordinary order statistics from pth order exponential distribution. International Mathematical Forum, 5, No. 34, 1653 – 1662.
Nain, K. (2010 b). Recurrence relations for single and product moments of kth record values from generalized Weibull distribution and a characterization. International Mathematical Forum, 5, No. 33, 1645 – 1652.
Pawlas, P. and Szynal, D. (2001). Recurrence relations for single and product moments of generalized order statistics from Pareto, Generalized Pareto and Burr distributions. Commun. Statist. – Theor. Meth., 30, 739–746.
Ruiz, S.M. (1996). An algebraic identity leading to Wilson’s Theorem. Math. Gaz. , 80, 579- 582.
Saran, J. and Pandey, A. (2004). Recurrence relations for single and product moments of generalized order statistics from linear-exponential distribution. Journal of Applied Statistical Science, 13, 323-333.
Saran, J. and Pandey, A. (2009). Recurrence relations for single and product moments of generalized order statistics from linear-exponential and Burr distributions. Journal of Statistical Theory and Applications, 8, No. 3, 383-391.
Saran, J. and Pandey, A. (2011). Recurrence relations for marginal and joint moment generating functions of dual generalized order statistics from inverse Weibull distribution. Journal of Statistical Studies, 30, 65-72.
Saran, J. and Pushkarna, N. (1999). Moments of order statistics from doubly truncated linear- exponential distribution. J. Korean Statist. Soc., 28, 279-296.
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