论文信息 - Two-sample inference based on one-sample ranked set sample sign statistics

Two-sample inference based on one-sample ranked set sample sign statistics

A two-sample sign test is developed for ranked set samples. It is shown that the testing procedure is distribution free but requires evaluation of the incomplete beta function. Efficiency and type I error, in general, depend on the measured observations and the ratio of cycle sizes. It is shown that there is a substantial gain in the efficiency of the test even when there are ranking errors. On the other hand, the type I error is inflated for imperfect ranking. The proposed test is superior to the two-sample Mann-Whitney-Wilcoxon ranked set sample test when the underlying probability model has heavy and long tail distribution, and the number of quantified observations in each cycle is small. We provide a simple way to implement the procedure.

Omer Ozturk

[1] T. Sager,et al. Characterization of a Ranked-Set Sample with Application to Estimating Distribution Functions , 1988 .

[2] Two-sample inference based on one-sample Wilcoxon signed rank statistics , 1987 .

[3] G. McIntyre,et al. A method for unbiased selective sampling, using ranked sets , 1952 .

[4] Douglas A. Wolfe,et al. The Effect of Imperfect Judgment Rankings on Properties of Procedures Based on the Ranked-Set Samples Analog of the Mann-Whitney-Wilcoxon Statistic , 1994 .

[5] Thomas P. Hettmansperger,et al. Two‐Sample Inference Based on One‐Sample Sign Statistics , 1984 .

[6] S. Stokes,et al. Ranked set sampling with concomitant variables , 1977 .

[7] Thomas P. Hettmansperger. The ranked-set sample sign test , 1995 .

[8] Gutti Jogesh Babu,et al. Sign test for ranked-set sampling , 1996 .

[9] Douglas A. Wolfe,et al. Nonparametric Two-Sample Procedures for Ranked-Set Samples Data , 1992 .

[10] G. C. Tiao,et al. A Further Look at Robustness via Bayes's Theorem , 1962 .

[11] R. Randles,et al. Introduction to the Theory of Nonparametric Statistics , 1991 .