论文信息 - A note on a probability involving independent order statistics

A note on a probability involving independent order statistics

Suppose that we have a sample consisting of independent order statistics from the same continuous parent distribution. Kvam and Samaniego [Kvam, P.H. and Samaniego, F.J., 1993, On the inadmissibility of empirical averages as estimators in ranked set sampling. Journal of Statistical Planning and Inference, 36, 39–55.] developed a formula for the probability that these order statistics have a particular ordering, but their formula is computationally feasible only for small sample sizes. In this paper, an alternate, combinatorial proof of their result is presented. It is then shown how ideas from the new proof allow one to compute such probabilities even when the sample size is large. An example is given to illustrate how the method may be used to produce distribution-free confidence intervals for quantiles of the unknown parent distribution.

Jesse Frey

[1] Jayant V. Deshpande,et al. Ranked-set sample nonparametric quantile confidence intervals , 2006 .

[2] Barry C. Arnold,et al. PARAMETRIC INFERENCE WITH GENERALIZED RANKED SET DATA , 2002 .

[3] T R Willemain,et al. Estimating the population median by nomination sampling. , 1980, Journal of the American Statistical Association.

[4] Francisco J. Samaniego,et al. On the inadmissibility of empirical averages as estimators in ranked set sampling , 1993 .

[5] Estimating a Distribution Function Based on Nomination Sampling , 1986 .

[6] Francisco J. Samaniego,et al. Nonparametric Maximum Likelihood Estimation Based on Ranked Set Samples , 1994 .

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

[8] Lynne Stokes,et al. Parametric ranked set sampling , 1995, Annals of the Institute of Statistical Mathematics.