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1	Statistical inferences for missing data/causal inferences based on modified empirical likelihood Sharghi, Sima 01 September 2021 (has links) No description available. Statistics
2	Statistical Inferences on Inflated Data Based on Modified Empirical Likelihood Stewart, Patrick 06 August 2020 (has links) No description available. Statistics Empirical likelihood adjusted empirical likelihood transformed empirical likelihood confidence intervals coverage probability zero observations inflated data zero-one observations hypothesis testing
3	Inference for Cox's Regression Model via a New Version of Empirical Likelihood Jinnah, Ali 28 November 2007 (has links) Cox Proportional Hazard Model is one of the most popular tools used in the study of Survival Analysis. Empirical Likelihood (EL) method has been used to study the Cox Proportional Hazard Model. In recent work by Qin and Jing (2001), empirical likelihood based confidence region is constructed with the assumption that the baseline hazard function is known. However, in Cox’s regression model the baseline hazard function is unspecified. In this thesis, we re-formulate empirical likelihood for the vector of regression parameters by estimating the baseline hazard function. The EL confidence regions are obtained accordingly. In addition, Adjusted Empirical Likelihood (AEL) method is proposed. Furthermore, we conduct extensive simulation studies to evaluate the performance of the proposed empirical likelihood methods in terms of coverage probabilities by comparing with the Normal Approximation based method. The simulation studies show that all the three methods produce similar coverage probabilities. coverage probability Adjusted Empirical Likelihood Normal Approximation Empirical Likelihood confidence range Cox’s regression model Mathematics

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