Regret Equals Covariance: A Closed-Form Characterization for Stochastic Optimization
摘要
Regret is the cost of uncertainty in algorithmic decision-making. Quantifying regret typically requires computationally expensive simulation via Sample Average Approximation (SAA), with complexity in the number of scenarios , variables , and constraints . % This paper proves that expected regret in any stochastic optimization problem admits the exact decomposition % \begin{equation*} \mathrm{Regret}(c) = \mathrm{Cov}(c,\,\pi^{*}(c)) + R(c), \end{equation*} % where is the vector of uncertain parameters, is the optimal decision, and is a residual whose magnitude we bound explicitly under Lipschitz, smooth, and strongly convex conditions. % For linear programs and unconstrained quadratic programs, including the classical Markowitz portfolio problem, we prove exactly, so that holds without approximation. % When historical cost-decision pairs are available, the covariance can be estimated in time, which is orders of magnitude faster than SAA. The estimation is performed by a single pass through the data. % We derive concentration bounds, a central limit theorem, and an asymptotically unbiased residual estimator, and we validate all results on synthetic LP, QP, and integer programming instances and on a rolling-window portfolio experiment using ten years of CRSP equity data.
引用
@article{arxiv.2605.14019,
title = {Regret Equals Covariance: A Closed-Form Characterization for Stochastic Optimization},
author = {Irene Aldridge},
journal= {arXiv preprint arXiv:2605.14019},
year = {2026}
}
备注
33 pages