Maximum likelihood estimation of primary productivity coefficients

In this paper we bring together the previously separate parametric and nonparametric approaches to production frontier estimation by developing composed error models for maximum likelihood estimation from nonparametrically specified classes of frontiers. This approach avoids the untestable restricti

We propose a maximum likelihood estimator (MLE) of the kappa coefficient from a 2 x 2 table when the binary ratings depend on patient and/or clinician effects. We achieve this by expressing the logit of the probability of positive rating as a linear function of the subject-specific and the rater-spe

For a sequence of independent and identically distributed random variables (r.v.) valued in some metric space (E, d), we obtain a sharp concentration inequality of the maximum likelihood estimator under some standard concavity condition.