Kernel Density Estimator From Ranked Set Samples |
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| Authors: | Johan Lim Min Chen Sangun Park Xinlei Wang Lynne Stokes |
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| Affiliation: | 1. Department of Statistics, Seoul National University, Seoul, Koreajohanlim@snu.ac.kr;3. Department of Mathematical Sciences, University of Texas at Dallas, Dallas, Texas, USA;4. Department of Applied Statistics, Yonsei University, Seoul, Korea;5. Department of Statistical Science, Southern Methodist University, Dallas, Texas, USA |
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| Abstract: | We study kernel density estimator from the ranked set samples (RSS). In the kernel density estimator, the selection of the bandwidth gives strong influence on the resulting estimate. In this article, we consider several different choices of the bandwidth and compare their asymptotic mean integrated square errors (MISE). We also propose a plug-in estimator of the bandwidth to minimize the asymptotic MISE. We numerically compare the MISE of the proposed kernel estimator (having the plug-in bandwidth estimator) to its simple random sampling counterpart. We further propose two estimators for a symmetric distribution, and show that they outperform in MISE all other estimators not considering symmetry. We finally apply the methods in this article to analyzing the tree height data from Platt et al. (1988 Platt, W.J., Evans, G.M., Rathbun, S.L. (1988). The population dynamics of long-lived conifer (Pinus plaustris) (1988). Amer. Natrualist 131:491–525.[Crossref], [Web of Science ®] , [Google Scholar]) and Chen et al. (2003 Chen, Z., Bai, Z., Sinha, B.K. (2003). Ranked Set Sampling: Theory and Applications. New York: Springer. [Google Scholar]). |
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| Keywords: | Kernel density estimator Optimal bandwidth Ranked set sampling. |
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