Nonnegative Minimum Biased Quadratic Estimation in the Linear Regression Models

The problem of nonnegative quadratic estimation of a parametric function Necessary and sufficient conditions are given for y$A 0 y to be a minimum biased estimator for #. It is shown how to formulate the problem of finding a nonnegative minimium biased estimator of # as a conic optimization problem

A new modification of Berkson's minimum logit chi-squared estimator in simple linear logistic regression is suggested in order to achieve reduction of first order biae of the estimator ae well as in the model. Furthermore, unlike estimators currently available, our procedure is quite simple to apply

## Abstract A linear regression model with random walk coefficients is extended to allow for linear restrictions between the coefficients to be satisfied at each point in time. Estimation in this model is shown to be no more involved than estimation in the standard model. It is also demonstrated ho

For the model ~=/3,,+/?~ z + e (model 1 of linear regression) in the literature confidence estimators of an unknown position z , are given at which either the expectation of y is given (see FIELLER, 1944; FINNEP, 1952), or realizations of y are given (see GRAYBILL, 1981). These confidence regions wi