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Mean Empirical Likelihood Inference for Response Mean with Data Missing at Random

Hanji He, Guangming Deng

2020Discrete Dynamics in Nature and Society13 citationsDOIOpen Access PDF

Abstract

We extend the mean empirical likelihood inference for response mean with data missing at random. The empirical likelihood ratio confidence regions are poor when the response is missing at random, especially when the covariate is high-dimensional and the sample size is small. Hence, we develop three bias-corrected mean empirical likelihood approaches to obtain efficient inference for response mean. As to three bias-corrected estimating equations, we get a new set by producing a pairwise-mean dataset. The method can increase the size of the sample for estimation and reduce the impact of the dimensional curse. Consistency and asymptotic normality of the maximum mean empirical likelihood estimators are established. The finite sample performance of the proposed estimators is presented through simulation, and an application to the Boston Housing dataset is shown.

Topics & Concepts

Empirical likelihoodEstimatorStatisticsMathematicsCovariateMissing dataInferenceSample size determinationConsistency (knowledge bases)EconometricsComputer scienceArtificial intelligenceGeometryStatistical Methods and InferenceStatistical Methods and Bayesian InferenceBayesian Methods and Mixture Models