Rank Distributions for Independent Normals with a Single Outlier

Abstract

Thurstone's latent-normal model, introduced a century ago to describe human preferences in psychometrics (1927), remains a cornerstone for modeling random rankings. Yet when the underlying normals differ in distribution, the joint law of ranks Ri:=Σj=1n1Xj≤ Xi is virtually unexplored. We study the simplest non-identically-distributed case: n+1 independent normals with X0(μ0,\,σ02) and Xi(μ,\,σ2) for 1≤ i≤ n. Here, R0 X0 \;\; 1 + Binomial(n,\;((X0 - μ)/σ)), and the success probability ((X0 - μ)/σ) is accurately modeled by a beta distribution. Exploiting beta-binomial conjugacy, we observe that R0-1 follows a beta-binomial law, which then yields a precise approximation for the joint distribution of (R0,Ri1,…,Rim). We derive closed-form expressions for ERi, Cov(Ri,Rj), and the limiting distributions of (R0,Ri1,…,Rim) as key parameters grow large or small.