Title :
Quantile estimation based on nomination sampling
Author :
Tiwari, Ram C. ; Wells, Martin T.
Author_Institution :
Dept. of Math., North Carolina Univ., Charlotte, NC, USA
fDate :
12/1/1989 12:00:00 AM
Abstract :
Nomination sampling is a sampling process in which every observation is the maximum of a random sample from some distribution. If all samples are taken from a single underlying CDF, F, data can be viewed as consisting of pairs (Xi,Ki) where Ki is the size of sample i and, given Ki=ki, Xi is distributed according to CDF Fki. R.A. Boyles and F.J. Samaniego (1986) developed a nonparametric maximum-likelihood estimator of F. In the present work, their approach is extended to obtain estimates of the quantiles of F and to study the limit theory and consistency properties of these estimates. These results generalize the results of T.R. Willemain (1980), who discussed the estimation of the median of F based on nomination samples
Keywords :
reliability theory; statistical analysis; limit theory; nomination sampling; nonparametric maximum-likelihood estimator; quantile estimation; reliability; Bismuth; Educational institutions; Maximum likelihood estimation; Random variables; Reliability theory; Sampling methods; State estimation; Tiles;
Journal_Title :
Reliability, IEEE Transactions on
