By using the kernel-type density estimation and empirical distribution function in the case of identically distributed and negatively associated samples, the empirical Bayes one-sided test rules for the parameter of inverse exponential distribution are constructed based on negative associate sample under weighted linear loss function, and the asymptotically optimal property is obtained . It is shown that the convergence rates of the proposed empirical Bayes test rules can arbitrarily close to O(n-1/2) under suitable conditions.
| Published in | American Journal of Theoretical and Applied Statistics (Volume 5, Issue 6) |
| DOI | 10.11648/j.ajtas.20160506.12 |
| Page(s) | 342-347 |
| Creative Commons |
This is an Open Access article, distributed under the terms of the Creative Commons Attribution 4.0 International License (http://creativecommons.org/licenses/by/4.0/), which permits unrestricted use, distribution and reproduction in any medium or format, provided the original work is properly cited. |
| Copyright |
Copyright © The Author(s), 2016. Published by Science Publishing Group |
Empirical Bayes test, Negatively Associated Sample, Asymptotic Optimality, Weighted Linear Loss Function, Inverse Exponential Distribution
| [1] | Robbins H., 1956. An empirical Bayes approach to statistics. Annals of Mathematical Statistics, 35(1): 1-20. |
| [2] | Karunamuni R. J., 1996. Empirical Bayes sequential estimation for exponential families: the untruncated component. Annals of the Institute of Statistical Mathematics, 48(4): 711-730. |
| [3] | Phipson B., Lee S., Majewski I. J. Alexander W. S., Smyth G. K., 2013. Empirical Bayes in the presence of exceptional cases, with application to microarray data. Phytochemistry, 26(8): 2247-2250. |
| [4] | Prakash G., 2015. Reliability performances based on empirical Bayes censored Gompertz data. International Journal of Advanced Research, 3(11):1297-1307. |
| [5] | Coram M., Candille S., Duan, Q., Chan K. H., Li Y., Kooperberg C., et al., 2015. Leveraging multi-ethnic evidence for mapping complex traits in minority populations: an empirical Bayes approach. American Journal of Human Genetics, 96(5): 740-52. |
| [6] | Naznin F., Currie G., Sarvi M., Logan D., 2015. An empirical Bayes safety evaluation of tram/streetcar signal and lane priority measures in melbourne. Traffic Injury Prevention, 17(1): 91-97. |
| [7] | Karunamuni, R. J. (1999). Optimal rates of convergence of monotone empirical Bayes tests for uniform distributions. Statistics & Decisions, 17(1), 63-86. |
| [8] | Xu, Y. S., Xu, Y., & Shi, Y. M. (2006). Convergence rates of empirical Bayes test for one-side truncation parameters with asymmetric loss functions. International Journal of Pure & Applied Mathematics, 27(1), 21-29. |
| [9] | Qian Z., Wei L., 2013. The two-sided empirical Bayes test of parameters for scale exponential family under weighed loss function. Journal of University of Science & Technology of China, 2(2): 156-161. |
| [10] | Chen J., Jin Q., Chen Z., Liu C., 2013. Two-sided empirical Bayes test for the exponential family with contaminated data. Wuhan University Journal of Natural Sciences, 18(6): 466-470. |
| [11] | Wang L., Shi Y. M., Chang P., 2012. Empirical Bayes test for two-parameter exponential distribution under Type-Ⅱ censored samples. Chinese Quarterly Journal of Mathematics, 27(1): 54-58. |
| [12] | Shao Q. M., 2000. A comparison theorem on moment inequalities between negatively associated and independent random variables. Journal of Theoretical Probability, 13(2): 343-356. |
| [13] | Sung S. H., 2009. An exponential inequality for negatively associated random variables. Electronic Journal of Statistics, 3(1): 171-174. |
| [14] | Wei L., 2000. The empirical Bayes test problem for scale exponential family: in the case of NA samples. Acta Mathematicae Applicatae Sinica, 23(3: 403-412. |
| [15] | Shi Y., Shi X., Yan J., 2005. Two-sided empirical Bayes test for truncation parameter using NA samples. Information Sciences, 173(1-3): 65-74. |
| [16] | Wang L., Shi Y. M., 2008. The empirical Bayes test for one exponential family using NA samples. Journal of Northwest University, 38(4): 523-526. |
| [17] | Esary J. D.,1983. Negative association of random variables, with applications. Annals of Statistics, 11(1): 286-295. |
| [18] | Lin C., Duran B., Lewis T., 1989. Inverted Gamma as a life distribution. Microelectronics and Reliability, 29(4): 619-626. |
| [19] | Rao G. S., 2013. Estimation of reliability in multicomponent stress-strength based on inverse exponential distribution, International Journal of Statistics and Economics, 10(1): 28-37. |
| [20] | Prakash G., 2012. Inverted exponential distribution under a Bayesian viewpoint. Journal of Modern Applied Statistical Methods, 11(1):190-202. |
| [21] | Singh S., Tripathi Y. M., Jun C. H., 2015. Sampling plans based on truncated life test for a generalized inverted exponential distribution. Industrial Engineering & Management Systems, 14(2): 183-195. |
| [22] | Johns, M. V., 1972. Convergence rates for empirical Bayes two-action problems ii. continuous case. Annals of Mathematical Statistics, 43(3): 934-947. |
| [23] | Chen J. Q, Liu C. H., 2008. Empirical Bayes test problem for the parameter of linear exponential distribution. Journal of Systems Science and Mathematical Sciences, 28(5): 616-626. |
APA Style
Guobing Fan. (2016). Empirical Bayes One-side Test for Inverse Exponential Model based on Negative Associate Samples. American Journal of Theoretical and Applied Statistics, 5(6), 342-347. https://doi.org/10.11648/j.ajtas.20160506.12
ACS Style
Guobing Fan. Empirical Bayes One-side Test for Inverse Exponential Model based on Negative Associate Samples. Am. J. Theor. Appl. Stat. 2016, 5(6), 342-347. doi: 10.11648/j.ajtas.20160506.12
AMA Style
Guobing Fan. Empirical Bayes One-side Test for Inverse Exponential Model based on Negative Associate Samples. Am J Theor Appl Stat. 2016;5(6):342-347. doi: 10.11648/j.ajtas.20160506.12
Share This Article
Twitter
Linked In
Facebook
Copy
Download@article{10.11648/j.ajtas.20160506.12,
author = {Guobing Fan},
title = {Empirical Bayes One-side Test for Inverse Exponential Model based on Negative Associate Samples},
journal = {American Journal of Theoretical and Applied Statistics},
volume = {5},
number = {6},
pages = {342-347},
doi = {10.11648/j.ajtas.20160506.12},
url = {https://doi.org/10.11648/j.ajtas.20160506.12},
eprint = {https://article.sciencepublishinggroup.com/pdf/10.11648.j.ajtas.20160506.12},
abstract = {By using the kernel-type density estimation and empirical distribution function in the case of identically distributed and negatively associated samples, the empirical Bayes one-sided test rules for the parameter of inverse exponential distribution are constructed based on negative associate sample under weighted linear loss function, and the asymptotically optimal property is obtained . It is shown that the convergence rates of the proposed empirical Bayes test rules can arbitrarily close to O(n-1/2) under suitable conditions.},
year = {2016}
}
TY - JOUR T1 - Empirical Bayes One-side Test for Inverse Exponential Model based on Negative Associate Samples AU - Guobing Fan Y1 - 2016/10/15 PY - 2016 N1 - https://doi.org/10.11648/j.ajtas.20160506.12 DO - 10.11648/j.ajtas.20160506.12 T2 - American Journal of Theoretical and Applied Statistics JF - American Journal of Theoretical and Applied Statistics JO - American Journal of Theoretical and Applied Statistics SP - 342 EP - 347 PB - Science Publishing Group SN - 2326-9006 UR - https://doi.org/10.11648/j.ajtas.20160506.12 AB - By using the kernel-type density estimation and empirical distribution function in the case of identically distributed and negatively associated samples, the empirical Bayes one-sided test rules for the parameter of inverse exponential distribution are constructed based on negative associate sample under weighted linear loss function, and the asymptotically optimal property is obtained . It is shown that the convergence rates of the proposed empirical Bayes test rules can arbitrarily close to O(n-1/2) under suitable conditions. VL - 5 IS - 6 ER -
Email: