Counting and Locating the Solutions of Polynomial Systems of Maximum Likelihood Equations, II: The Behrens-Fisher Problem

Abstract

Let μ be a p-dimensional vector, and let 1 and 2 be p × p positive definite covariance matrices. On being given random samples of sizes N1 and N2 from independent multivariate normal populations Np(μ,1) and Np(μ,2), respectively, the Behrens-Fisher problem is to solve the likelihood equations for estimating the unknown parameters μ, 1, and 2. We shall prove that for N1, N2 > p there are, almost surely, exactly 2p+1 complex solutions of the likelihood equations. For the case in which p = 2, we utilize Monte Carlo simulation to estimate the relative frequency with which a typical Behrens-Fisher problem has multiple real solutions; we find that multiple real solutions occur infrequently.