🌙

通过矩阵补全对Hüsler–Reiss图模型进行统计推断

Statistical Inference for Hüsler–Reiss Graphical Models Through Matrix Completions

Journal of the American Statistical Association · 2024
被引 22 · 同刊同年前 2%
ABS 4

中文导读

本文提出Hüsler–Reiss精度矩阵,通过矩阵补全方法为给定图结构提供首个一致的参数估计,并可用于未知图结构的学习,在航班延误和河流流量数据中展示了应用。

Abstract

The severity of multivariate extreme events is driven by the dependence between the largest marginal observations. The Hüsler–Reiss distribution is a versatile model for this extremal dependence, and it is usually parameterized by a variogram matrix. In order to represent conditional independence relations and obtain sparse parameterizations, we introduce the novel Hüsler–Reiss precision matrix. Similarly to the Gaussian case, this matrix appears naturally in density representations of the Hüsler–Reiss Pareto distribution and encodes the extremal graphical structure through its zero pattern. For a given, arbitrary graph we prove the existence and uniqueness of the completion of a partially specified Hüsler–Reiss variogram matrix so that its precision matrix has zeros on non-edges in the graph. Using suitable estimators for the parameters on the edges, our theory provides the first consistent estimator of graph structured Hüsler–Reiss distributions. If the graph is unknown, our method can be combined with recent structure learning algorithms to jointly infer the graph and the corresponding parameter matrix. Based on our methodology, we propose new tools for statistical inference of sparse Hüsler–Reiss models and illustrate them on large flight delay data in the U.S., as well as Danube river flow data.

极值统计图模型矩阵补全统计推断多元极值