An Improvement of the Westlake Symmetric Confidence Interval

Based on independent random matices X: p x m and S: p x p distributed, respectively, as Npm(#, E ® I,~) and Wp(n, ~) with # unknown and n > p, the problem of obtaining confidence interval for IEI is considered. Stein's idea of improving the best affine equivariant point estimator of IE[ has been ada

The usual conÿdence intervals for the ratio of two normal variances are constructed from F-distribution. These conÿdence intervals are especially important in the variance component model. In this paper, I focus on conÿdence estimate and conditional performance of these conÿdence intervals. Under so

I propose an exact confidence interval for the ratio of two proportions when the proportions are not independent. One application is to estimate the population prevalence using a screening test with perfect specificity but imperfect sensitivity. The population prevalence is the ratio of the observed