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面向高维空间极值的空间尺度感知尾依赖建模

Spatial Scale-Aware Tail Dependence Modeling for High-Dimensional Spatial Extremes

Journal of the American Statistical Association · 2026
被引 0 · 同刊同年前 8%
ABS 4

中文导读

提出一种混合模型,通过允许径向变量平滑变化并加入非平稳性,灵活刻画大范围空间极端事件的异质性尾依赖特征,应用于美国中部夏季极端降水数据。

Abstract

Extreme events over large spatial domains may exhibit highly heterogeneous tail dependence characteristics, yet most existing spatial extremes models yield only one dependence class over the entire spatial domain. To accurately characterize dependence in extreme events, we propose a mixture model that achieves flexible dependence properties and allows high-dimensional inference ( ∼600 spatial locations in our data example) for extremes of spatial processes. We modify the popular random scale construction that multiplies a Gaussian random field by a single radial variable; we allow the radial variable to vary smoothly across space and add non-stationarity to the Gaussian process. As the level of extremeness increases, this single model exhibits both asymptotic independence at long ranges and either asymptotic dependence or independence at short ranges. We make joint inference on the dependence model and a marginal model using a copula approach within a Bayesian hierarchical model. Three different simulation scenarios show close to nominal frequentist coverage rates. Lastly, we apply the model to a dataset of extreme summertime precipitation over the central United States. We find that the joint tail of precipitation exhibits non-stationary dependence structure that cannot be captured by limiting extreme value models or current state-of-the-art sub-asymptotic models.

空间极值尾依赖气候极端事件贝叶斯分层模型