Non-standard boundary behaviour in two-component mixture models

Abstract

Consider a binary mixture model of the form Fθ = (1-θ)F0 + θ F1, where F0 is standard Gaussian and F1 is a completely specified heavy-tailed distribution with the same support. For a sample of n independent and identically distributed values Xi Fθ, the maximum likelihood estimator θn is asymptotically normal provided that 0 < θ < 1 is an interior point. This paper investigates the large-sample behaviour for boundary points, which is entirely different and strikingly asymmetric for θ=0 and θ=1. The reason for the asymmetry has to do with typical choices such that F0 is an extreme boundary point and F1 is usually not extreme. On the right boundary, well known results on boundary parameter problems are recovered, giving P1(θn < 1)=1/2. On the left boundary, 0(θn > 0)=1-1/α, where 1≤ α ≤ 2 indexes the domain of attraction of the density ratio f1(X)/f0(X) when X F0. For α=1, which is the most important case in practice, we show how the tail behaviour of F1 governs the rate at which P0(θn > 0) tends to zero. A new limit theorem for the joint distribution of the sample maximum and sample mean conditional on positivity establishes multiple inferential anomalies. Most notably, given θn > 0, the likelihood ratio statistic has a conditional null limit distribution G≠21 determined by the joint limit theorem. We show through this route that no advantage is gained by extending the single distribution F1 to the nonparametric composite mixture generated by the same tail-equivalence class.

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