稳健的可引发泛函

Robust elicitable functionals

European Journal of Operational Research · 2025
被引 0
ABS 4

中文导读

针对分布假设可能被轻微违反的现实问题,提出基于KL散度的稳健可引发泛函,确保唯一解并保持良好统计性质,适用于再保险和稳健回归等场景。

Abstract

Elicitable functionals and (strictly) consistent scoring functions are of interest due to their utility of determining (uniquely) optimal forecasts, and thus the ability to effectively backtest predictions. However, in practice, assuming that a distribution is correctly specified is too strong a belief to reliably hold. To remediate this, we incorporate a notion of statistical robustness into the framework of elicitable functionals, meaning that our robust functional accounts for “small” misspecifications of a baseline distribution. Specifically, we propose a robustified version of elicitable functionals by using the Kullback–Leibler divergence to quantify potential misspecifications from a baseline distribution. We show that the robust elicitable functionals admit unique solutions lying at the boundary of the uncertainty region, and provide conditions for existence and uniqueness. Since every elicitable functional possesses infinitely many scoring functions, we propose the class of b-homogeneous strictly consistent scoring functions, for which the robust functionals maintain desirable statistical properties. We show the applicability of the robust elicitable functional in several examples: in a reinsurance setting and in robust regression problems. • We introduce distributionally robust elicitable functionals. • Establish uniqueness and existence with Kullback–Leibler uncertainty. • Joint robustification of Value-at-Risk and Expected Shortfall. • Introduce Murphy diagrams for robust functionals. • Application to robust regression, including expectiles and quantile regression.

计量经济学金融风险管理统计学机器学习