The distribution of the product of two noncentral beta variates

The purpose of this paper is to give an explicit estimator dominating the positive part of the UMVUE of a noncentrality parameter of a noncentral \(\chi_{n}^{2}(\mu 2)\). Let \(Y \sim \chi_{n}^{2}(\mu / 2)\) with degree of freedom \(n\) and unknown parameter \(\mu\), loss \(=(\delta-\mu)^{2}\). In h

When plot effecta are modeled in a randomized block design in multivariate analyeia of variance the error and hypothesis matrices have independent noncentrel Wishart distributions. This gives rise to doubly noncentral distribution of Wilb' statistic. The doubly noncentral distribution of Wilks' stat

Densities, citniultitives, and qita~itilcs of the noncentral distributions nre notoriously difficult to cnlculate. I t is shown how the noncentral t distribution is represented in the canonical S-systciii form, i.e., as a set of first-order nonlinear differential equations in which the derivative of