Asymptotic Probabilities of Attaining the Maximum in Heterogeneous Gaussian Samples

Abstract

We study asymptotic probabilities of attaining the maximum in heterogeneous Gaussian samples. In the two-group setting, the first sample has variance 1 and size n1, while the second has variance σ2>1 and size n2. We investigate the probability that the maximum of the standard-variance group exceeds that of the high-variance group. Using the classical extreme-value normalization for Gaussian maxima together with a second-order comparison of the centering terms, we show that this probability admits a non-degenerate limit if and only if n1 C n2σ2( n2)-(σ2-1)/2 as n1,n2∞ for some C∈(0,∞). In that regime, the limit admits an integral representation. Outside the critical regime, the comparison necessarily degenerates to 0 or 1. We then extend the analysis to finitely many independent Gaussian groups and obtain a generalized integral representation for the limiting winning probabilities. The results provide a complete asymptotic classification for this maximum-comparison problem