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分布鲁棒优化的高阶展开与Bartlett可校正性

Higher-Order Expansion and Bartlett Correctability of Distributionally Robust Optimization

Mathematics of Operations Research · 2025
被引 0
ABS 3

中文导读

研究了分布鲁棒优化中调整不确定性集大小如何降低高阶覆盖误差,类似于Bartlett校正,适用于更一般的泛函,并展示了其高阶自归一化性质。

Abstract

Distributionally robust optimization (DRO) is a worst-case framework for stochastic optimization under uncertainty that has drawn fast-growing studies in recent years. When the underlying probability distribution is unknown and observed from data, DRO suggests computing the worst-case distribution within a so-called uncertainty set that captures the involved statistical uncertainty. In particular, DRO with uncertainty set constructed as a statistical divergence neighborhood ball has been shown to provide a tool for constructing valid confidence intervals for nonparametric functionals and bears a duality with the empirical likelihood (EL). In this paper, we show how adjusting the ball size of such type of DRO can reduce higher-order coverage errors similar to the so-called Bartlett correction. Our correction, which applies to general von Mises differentiable functionals, is more general than the existing EL literature that only focuses on smooth function models or M-estimation. Moreover, we demonstrate a higher-order “self-normalizing” property of DRO regardless of the choice of divergence. Our approach builds on the development of a higher-order expansion of DRO, which is obtained through an asymptotic analysis on a fixed-point equation arising from the Karush-Kuhn-Tucker conditions. Funding: This work was supported by the National Science Foundation, Division of Information and Intelligent Systems [Grant IIS-1849280] and the Division of Civil, Mechanical and Manufacturing Innovation [Grant CAREER CMMI-1834710].

分布鲁棒优化经验似然Bartlett校正非参数推断统计不确定性