Inference on a Distribution Function from Ranked Set Samples

Abstract

Consider independent observations (X1,R1), (X2,R2), …, (Xn,Rn) with random or fixed ranks Ri ∈ \1,2,…,k\, while conditional on Ri = r, the random variable Xi has the same distribution as the r-th order statistic within a random sample of size k from an unknown continuous distribution function F. Such observation schemes are utilized in situations in which ranking observations is much easier than obtaining their precise values. Two well-known special cases are ranked set sampling (McIntyre 1952) and judgement post-stratification (MacEachern et al. 2004). Within a general setting including unbalanced ranked set sampling we derive and compare the asymptotic distributions of three different estimators of the distribution function F as n ∞ with fixed k: The stratified estimator of Stokes and Sager (1988), the nonparametric maximum-likelihood estimator of Kvam and Samaniego (1994) and a moment-based estimator of Chen (2001). Our functional central limit theorems generalize and refine previous asymptotic analyses. In addition we discuss briefly pointwise and simultaneous confidence intervals for the distribution function F with guaranteed coverage probability for finite sample sizes. The methods are illustrated with a real data example, and the potential impact of imperfect rankings is investigated in a small simulation experiment. All in all, the moment-based estimator seems to offer a good compromise between efficiency and robustness versus imperfect ranking, in addition to computational efficiency.