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A new fine-scale Berry-Esseen-type Gumbel-limit theorem for multivariate maxima

Published 26 Jan 2026 in math.PR | (2601.18170v1)

Abstract: For $d \geq 2$ and i.i.d. $d$-dimensional observations $\mathbf{X}{(1)}, \mathbf{X}{(2)}, \ldots$ with independent Exponential$(1)$ coordinates, let $\varphi_n$ denote the minimum $\ell1$-norm among the maxima of ${\mathbf{X}{(1)}, \ldots, \mathbf{X}{(n)}}$. (A maximum from this set is an observation $\mathbf{X}{(k)}$ with $1 \leq k \leq n$ such that $\mathbf{X}{(k)} \not\prec \mathbf{X}{(i)}$ for all $1 \leq i \leq n$, where $\mathbf{x} \prec \mathbf{y}$ means that $x_j < y_j$ for $1 \leq j \leq d$.) Key roles in the study of multivariate Pareto records are played by $\varphi_n$ and by the more easily handled maximum with the maximum $\ell1$-norm. Fill, Naiman, and Sun (2024) proved that [ \varphi_n = \ln n - \ln \ln \ln n - \ln(d - 1) + O_{\mathrm{p}}!\left( \frac{1}{\ln \ln n} \right), ] where $Z_n = O_{\mathrm{p}}(a_n)$ means that $Z_n / a_n$ is bounded in probability, and conjectured that [ (\ln \ln n) \left(\varphi_n - [\ln n - \ln \ln \ln n - \ln(d - 1)] \right) ] has a nondegenerate limiting distribution, suggesting that the limiting distribution might be that of $ - G$, where $G$ has a Gumbel distribution with location $ - \frac{\ln[(d - 1)!]}{d - 1}$ and scale $\frac{1}{d - 1}$. In the present paper we prove a Berry-Esseen-type theorem for this convergence in distribution, thereby establishing a very sharp result for $\varphi_n$.

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