2018
DOI: 10.5705/ss.202016.0388
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Rank-based estimating equation with non-ignorable missing responses via empirical likelihood

Abstract: In this paper, a general regression model with responses missing not at random is considered. From a rankbased estimating equation, a rank-based estimator of the regression parameter is derived. Based on this estimator's asymptotic normality property, a consistent sandwich estimator of its corresponding asymptotic covariance matrix is obtained. In order to overcome the over-coverage issue of the normal approximation procedure, the empirical likelihood based on the rank-based gradient function is defined, and i… Show more

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Cited by 3 publications
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“…Regarding nonrandom missing data, previous studies have addressed the issue in different regression settings. Specifically, Niu et al [13] and Bindele and Zhao [14] focused on estimation equation imputation in linear regression and rank regression, respectively. In the context of quantile regression, Chen et al [15] introduced three missing quantile regression estimation equations: inverse probability weighting, estimation equation imputation, and an enhanced approach combining both methods.…”
Section: Introductionmentioning
confidence: 99%
“…Regarding nonrandom missing data, previous studies have addressed the issue in different regression settings. Specifically, Niu et al [13] and Bindele and Zhao [14] focused on estimation equation imputation in linear regression and rank regression, respectively. In the context of quantile regression, Chen et al [15] introduced three missing quantile regression estimation equations: inverse probability weighting, estimation equation imputation, and an enhanced approach combining both methods.…”
Section: Introductionmentioning
confidence: 99%