On the distribution of the likelihood ratio test statistic for a mixture of two normal distributions

Abstract

A likelihood ratio statistic can be used to test whether a random sample is taken from a single normal distribution or from a mixture of two normal distributions with a common variance. The asymptotic distribution of the likelihood ratio test statistic G² (minus twice the difference in the log_c likelihoods) in this situation is often assumed to be χ² with two degrees of freedom. In this study simulation is used to investigate the distribution of G² for sample sizes up to 256,000. We determine several approximations to the empirical distribution for sample sizes between 50 and 500, including one that does not require the computation of a χ² distribution with fractional degrees of freedom. We conclude that although the asymptotic distribution of G² is not a χ² with two degrees of freedom, this does appear to be a good approximation to the upper 15% of the distribution