On the small sample properties of norm-restricted maximum likelihood estimators for logistic regression models |
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| Authors: | Diane E. Duffy Thomas J. Santner |
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| Affiliation: | 1. Statistics Research Group , Bell Communications Research , Morristown, New Jersey, 07960;2. School of Operations Research and Industrial Engineering , Cornell University , Ithaca, New York, 14853 |
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| Abstract: | This paper develops alternatives to maximum likelihood estimators (MLE) for logistic regression models and compares the mean squared error (MSE) of the estimators. The MLE for the vector of underlying success probabilities has low MSE only when the true probabilities are extreme (i.e., near 0 or 1). Extreme probabilities correspond to logistic regression parameter vectors which are large in norm. A competing “restricted” MLE and an empirical version of it are suggested as estimators with better performance than the MLE for central probabilities. An approximate EM-algorithm for estimating the restriction is described. As in the case of normal theory ridge estimators, the proposed estimators are shown to be formally derivable by Bayes and empirical Bayes arguments. The small sample operating characteristics of the proposed estimators are compared to the MLE via a simulation study; both the estimation of individual probabilities and of logistic parameters are considered. |
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| Keywords: | binary response models EM algorithm empirical Bayes methods logistic regression posterior modes restricted maximum likelihood ridge regression |
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