Skip to Main Content
Frequently Asked Questions
Submit an ETD
Global Search Box
Need Help?
Keyword Search
Participating Institutions
Advanced Search
School Logo
Files
File List
yingjudissertation.pdf (606.7 KB)
ETD Abstract Container
Abstract Header
Jackknife Empirical Likelihood And Change Point Problems
Author Info
Chen, Ying-Ju
Permalink:
http://rave.ohiolink.edu/etdc/view?acc_num=bgsu1430823961
Abstract Details
Year and Degree
2015, Doctor of Philosophy (Ph.D.), Bowling Green State University, Statistics.
Abstract
Nonparametric methods are widely used in many practical applications when certain distributional assumptions on the underlying population are questionable. One popular nonparametric method is the empirical likelihood (EL) approach. Owen (1988) showed that the most appealing property of this method is that the asymptotic distribution of the empirical likelihood ratio test statistic follows a chi-squared distribution, which is the same as the asymptotic distribution of test statistic under parametric settings. However, when this approach is used on a nonlinear statistic, such as U-statistics, it will lose its computational advantage due to the increasing difficulties in simultaneously solving a number of nonlinear equations by the method of Lagrange multipliers. Jing et al. (2009) provided an example to illustrate this challenge and proposed a simpler method called jackknife empirical likelihood (JEL) method, which combines the jackknife and the empirical likelihood approaches, and Wilks' theorem can be established by the method. This dissertation research pursues the testing procedures based on JEL for the equality of two variances and for the equality of two mean residual lifetime functions for complete data. The asymptotical distribution under null hypothesis is also explored for these two tests, respectively. The type I error and power performance of these tests are illustrated through simulation studies. Applications of the proposed tests in data analysis and comparisons with other approaches are also studied. In addition, the change-point problems for mean and variance based on JEL and for mean residual lifetime functions of independent random variables under random censorship based on EL are investigated, individually. The testing procedure for detecting change point in mean and variance is used to detect the location of the change point in the Stock Market data and the Air Traffic data from Hsu (1979). Two real data sets in the R package ``survival": Veterans' administration lung cancer data and Stanford heart transplant data are utilized to illustrate the testing procedure for detecting change in the mean residual lifetime.
Committee
Wei Ning (Advisor)
Arjun Gupta (Advisor)
Arthur Yeh (Other)
John Chen (Committee Member)
Pages
104 p.
Subject Headings
Statistics
Keywords
Empirical Likelihood
;
Jackknife
;
U-statistics
;
Asymptotic distribution
;
Change Point
;
Mean Residual Life Functions
Recommended Citations
Refworks
EndNote
RIS
Mendeley
Citations
Chen, Y.-J. (2015).
Jackknife Empirical Likelihood And Change Point Problems
[Doctoral dissertation, Bowling Green State University]. OhioLINK Electronic Theses and Dissertations Center. http://rave.ohiolink.edu/etdc/view?acc_num=bgsu1430823961
APA Style (7th edition)
Chen, Ying-Ju.
Jackknife Empirical Likelihood And Change Point Problems .
2015. Bowling Green State University, Doctoral dissertation.
OhioLINK Electronic Theses and Dissertations Center
, http://rave.ohiolink.edu/etdc/view?acc_num=bgsu1430823961.
MLA Style (8th edition)
Chen, Ying-Ju. "Jackknife Empirical Likelihood And Change Point Problems ." Doctoral dissertation, Bowling Green State University, 2015. http://rave.ohiolink.edu/etdc/view?acc_num=bgsu1430823961
Chicago Manual of Style (17th edition)
Abstract Footer
Document number:
bgsu1430823961
Download Count:
1,120
Copyright Info
© 2015, some rights reserved.
Jackknife Empirical Likelihood And Change Point Problems by Ying-Ju Chen is licensed under a Creative Commons Attribution-NonCommercial-ShareAlike 3.0 Unported License. Based on a work at etd.ohiolink.edu.
This open access ETD is published by Bowling Green State University and OhioLINK.