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Exponentially Titled Empirical Distribution Function for Ranked Set Samples

Computation 2015-06-23 v1 Statistics Theory Methodology Statistics Theory

Abstract

We study nonparametric estimation of the distribution function (DF) of a continuous random variable based on a ranked set sampling design using the exponentially tilted (ET) empirical likelihood method. We propose ET estimators of the DF and use them to construct new resampling algorithms for unbalanced ranked set samples. We explore the properties of the proposed algorithms. For a hypothesis testing problem about the underlying population mean, we show that the bootstrap tests based on the ET estimators of the DF are asymptotically normal and exhibit a small bias of order O(n1)O(n^{-1}). We illustrate the methods and evaluate the finite sample performance of the algorithms under both perfect and imperfect ranking schemes using a real data set and several Monte Carlo simulation studies. We compare the performance of the test statistics based on the ET estimators with those based on the empirical likelihood estimators.

Keywords

Cite

@article{arxiv.1506.06322,
  title  = {Exponentially Titled Empirical Distribution Function for Ranked Set Samples},
  author = {Saeid Amiri and Mohammad Jafari Jozani and Reza Modarres},
  journal= {arXiv preprint arXiv:1506.06322},
  year   = {2015}
}

Comments

18 pages, 3 Figuers, 6 Tables

R2 v1 2026-06-22T09:57:24.199Z