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分布有利优化的可处理性、复杂性与混合整数凸规划表示性

On tractability, complexity, and mixed-integer convex programming representability of distributionally favorable optimization

Mathematical Programming · 2025
被引 1
ABS 4

中文导读

研究了分布有利优化(DFO)框架的可处理性和复杂性,发现尽管DFO通常非凸,但可表示为混合整数凸规划,从而能用标准求解器求解。

Abstract

Abstract Distributionally Favorable Optimization (DFO) is a framework for decision-making under uncertainty, with applications spanning various fields, including reinforcement learning, online learning, robust statistics, chance-constrained programming, and two-stage stochastic optimization without complete recourse. In contrast to the traditional Distributionally Robust Optimization (DRO) paradigm, DFO presents a unique challenge– the application of the inner infimum operator often fails to retain the convexity. In light of this challenge, we study the tractability and complexity of DFO. We establish sufficient and necessary conditions for determining when DFO problems are tractable (i.e., solvable in polynomial time) or intractable (i.e., not solvable in polynomial time). Despite the typical nonconvex nature of DFO problems, our results show that they are mixed-integer convex programming representable (MICP-R), thereby enabling solutions via standard optimization solvers. Finally, we numerically validate the efficacy of our MICP-R formulations.

不确定性决策鲁棒优化随机规划凸优化混合整数规划