BazEkon - The Main Library of the Cracow University of Economics

BazEkon home page

Main menu

Author
Prakash Gyan (Harish Chandra P. G. College, India), Singh D.C. (Harish Chandra P. G. College, India)
Title
Double Stage Shrinkage Testimation in Exponential Type-II Censored Data
Source
Statistics in Transition, 2009, vol. 10, nr 2, s. 235-250, tab., bibliogr. s. 249-250
Keyword
Funkcje kosztów, Estymatory, Zastosowanie statystyki
Costs functions, Estimators, Application of statistics
Note
summ.
Abstract
The present paper investigates the properties of the shrinkage testimators for mean and variance of an Exponential distribution in double stage samples, by using the cost function when Type - II censored data are available. (original abstract)
Accessibility
The Main Library of the Cracow University of Economics
The Library of Warsaw School of Economics
The Library of University of Economics in Katowice
The Main Library of Poznań University of Economics and Business
The Main Library of the Wroclaw University of Economics
Full text
Show
Bibliography
Show
  1. ADKE, S. R., WAIKAR, V. B. and SCHUURMANN, F. J. (1987). A two stage shrinkage testimator for the mean of an exponential distribution. Communication in Statistics - Theory and Methods, 16, 1821-1834.
  2. AL-BAYYATI, H. A. and ARNOLD, J. C. (1969). Double stage shrunken estimator of the variance. Ind. Statist. Theory Meth. Assoc., 7, 175- 184.
  3. AL-BAYYATI, H. A. and ARNOLD, J. C. (1972). On double stage estimation in simple liner regression using prior knowledge. Technometrices, 14, 405-414.
  4. AL-BAYYATI, H. A. and ARNOLD, J. C. (1970). On double stage estimation of mean using prior knowledge. Biometrics, 26, 787-800.
  5. BANCROFT, T. A. and HAN, C. P. (1977). Inference based on conditional specification. A note and a bibliography. International Statistical Review, 15, 117-127.
  6. BASU, A. P. and EBRAHIMI, N. (1991). Bayesian approach to life testing and reliability estimation using asymmetric loss function. Journal of Statistical Planning and Inferences, 29, 21-31.
  7. CHAPMAN, D. G. (1960). Some two sample test. Annals of Mathematical Statistics, 21, 601-606.
  8. EBRAHIMI, N. and HOSMANE, B. (1987). On shrinkage estimation of the Exponential parameter. Communications in Statistics -Theory and Methods, 16,2623-2637.
  9. EPSTEIN, B. and SOBEL, M. (1953). Life Testing. Journal of American Statistical Association, 48, 486-507.
  10. HAN, C. P., RAO, C. V. and RAVICHANDRAN, J. (1988). Inference based on the condition specification: A second bibliography. Communications in Statistics -Theory and Methods, A-17, 1-21.
  11. KATTI, S. K. (1962). Use of some apriori knowledge in the estimation of mean from double samples. Biometrics, 18, 139-147.
  12. PANDEY, B. N. (1979). Double stage estimation of population variance. Annals of Institute of Statistics Mathematical, 31, 225-233.
  13. PANDEY, B. N. (1983). Shrinkage estimation of the Exponential scale parameter. IEEE Transaction on Reliability, R-32, 203-205.
  14. PANDEY, B. N. (1997). Testimator of the scale parameter of the Exponential distribution using LINEX loss function. Communication in Statistics - Theory and Methods, 26, 2191-2200.
  15. PANDEY, B. N and SRIVASTAVA, R. (1987). A shrinkage testimator for scale parameter of an exponential distribution. Microelectron Reliability, 27 (16), 949-951.
  16. SHAH, S. M. (1964). Use a prior knowledge in the estimation of a parameter from double samples. Journal of Indian Statistical Association, 2, 41-51.
  17. STEIN, C. (1945). A two-stage sample test for a linear hypothesis whose power is independent of the variance. Annals of Mathematical Statistics, 16, 243-258.
  18. THOMPSON, J. R. (1968) Some Shrunken techniques for estimating the Mean. Journal of the American Statistical Association, 63, 113-122.
  19. WAIKAR, V. B., SCHUURMANN, F. J. and RAGHUNATHAN, T. E. (1984). On a two stage shrunken testimator of the mean of a normal distribution. Communications in Statistics - Theory and Methods, 13, 1901-1913.
  20. WEISS, L. (1945). On confidence intervals of given length for the mean of a Normal distribution with unknown variance. Annals of Mathematical Statistics, 16, 348-352.
Cited by
Show
ISSN
1234-7655
Language
eng
Share on Facebook Share on Twitter Share on Google+ Share on Pinterest Share on LinkedIn Wyślij znajomemu