Quantile estimation for discrete data via empirical likelihood

Quantile estimation for discrete distributions has not been well studied, although discrete data are common in practice. Under the assumption that data are drawn from a discrete distribution, we examine the consistency of the maximum empirical likelihood estimator (MELE) of the pth population quantile θ p , with the assistance of a jittering method and results for continuous distributions. The MELE may or may not be consistent for θ p , depending on whether or not the underlying distribution has a plateau at the level of p. We propose an empirical likelihood-based categorisation procedure which not only helps in determining the shape of the true distribution at level p but also provides a way of formulating a new estimator that is consistent in any case. Analogous to confidence intervals in the continuous case, the probability of a correct estimate (PCE) accompanies the point estimator. Simulation results show that PCE can be estimated using a simple bootstrap method.

[1]  Yuehua Wu,et al.  An estimator of a conditional quantile in the presence of auxiliary information , 2001 .

[2]  P. Hall,et al.  A note on the accuracy of bootstrap percentile method confidence intervals for a quantile , 1989 .

[3]  A. V. D. Vaart,et al.  Asymptotic Statistics: Frontmatter , 1998 .

[4]  Rolf-Dieter Reiss Estimation of Quantiles in Certain Nonparametric Models , 1980 .

[5]  José A.F. Machado,et al.  Quantiles for Counts , 2002 .

[6]  Gianfranco Adimari An empirical likelihood statistic for quantiles , 1998 .

[7]  Biao Zhang,et al.  M-estimation and quantile estimation in the presence of auxiliary information , 1995 .

[8]  A. Owen Empirical Likelihood Ratio Confidence Regions , 1990 .

[9]  José M. González-Barrios,et al.  ON CONVERGENCE THEOREMS FOR QUANTILES , 2001 .

[10]  Bing-Yi Jing,et al.  Adjusted empirical likelihood method for quantiles , 2003 .

[11]  J. Lawless,et al.  Empirical Likelihood and General Estimating Equations , 1994 .

[12]  Ing Rj Ser Approximation Theorems of Mathematical Statistics , 1980 .

[13]  Peter Hall,et al.  Smoothed empirical likelihood confidence intervals for quantiles , 1993 .

[14]  A. V. D. Vaart,et al.  Asymptotic Statistics: U -Statistics , 1998 .

[15]  A. Owen Empirical likelihood ratio confidence intervals for a single functional , 1988 .

[16]  Shie-Shien Yang A Smooth Nonparametric Estimator of a Quantile Function , 1985 .

[17]  Stephen M. S. Lee,et al.  Iterated smoothed bootstrap confidence intervals for population quantiles , 2005, math/0504516.

[18]  S. T. Buckland,et al.  An Introduction to the Bootstrap. , 1994 .

[19]  H. Bateman,et al.  LXXVI. The probability variations in the distribution of α particles , 1910 .

[20]  B. Efron Bootstrap Methods: Another Look at the Jackknife , 1979 .

[21]  P S Albert,et al.  A two-state Markov mixture model for a time series of epileptic seizure counts. , 1991, Biometrics.