Estimation of Parameters in Binomial Crossover Designs

An estimate of the risk, adjusted for confounders, can be obtained from a fitted logistic regression model, but it substantially over-estimates when the outcome is not rare. The log binomial model, binomial errors and log link, is increasingly being used for this purpose. However this model's perfor

## Abstract This note considers the optimal and suboptimal sequential and fixed sample size estimation of the unknown binomial parameter, __p__, for a beta prior distribution for __p__ and under quadratic loss and constant observation cost. A numerical comparison of the methods is presented.

## Abstract This paper deals with optimal designs for Gaussian random fields with constant trend and exponential correlation structure, widely known as the Ornstein–Uhlenbeck process. Assuming the maximum likelihood approach, we study the optimal design problem for the estimation of the trend µ and

In many observed processes, data is fit well by a common distribution except for an excess of numbers of the zero class. This may be due to a threshold phenomenon in which no response occurs until a concomitant variable reaches a certain level, and the response is governed by the common probability