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Main Authors: Royset, Johannes O., Lejeune, Miguel A.
Format: Preprint
Published: 2023
Subjects:
Online Access:https://arxiv.org/abs/2310.09844
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author Royset, Johannes O.
Lejeune, Miguel A.
author_facet Royset, Johannes O.
Lejeune, Miguel A.
contents For parameterized mixed-binary optimization problems, we construct local decision rules that prescribe near-optimal courses of action across a set of parameter values. The decision rules stem from solving risk-adaptive training problems over classes of continuous, possibly nonlinear mappings. In asymptotic and nonasymptotic analysis, we establish that the decision rules prescribe near-optimal decisions locally for the actual problems, without relying on linearity, convexity, or smoothness. The development also accounts for practically important aspects such as inexact function evaluations, solution tolerances in training problems, regularization, and reformulations to solver-friendly models. The decision rules also furnish a means to carry out sensitivity and stability analysis for broad classes of parameterized optimization problems. We develop a decomposition algorithm for solving the resulting training problems and demonstrate its ability to generate quality decision rules on a nonlinear binary optimization model from search theory.
format Preprint
id arxiv_https___arxiv_org_abs_2310_09844
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle Risk-Adaptive Local Decision Rules
Royset, Johannes O.
Lejeune, Miguel A.
Optimization and Control
Systems and Control
For parameterized mixed-binary optimization problems, we construct local decision rules that prescribe near-optimal courses of action across a set of parameter values. The decision rules stem from solving risk-adaptive training problems over classes of continuous, possibly nonlinear mappings. In asymptotic and nonasymptotic analysis, we establish that the decision rules prescribe near-optimal decisions locally for the actual problems, without relying on linearity, convexity, or smoothness. The development also accounts for practically important aspects such as inexact function evaluations, solution tolerances in training problems, regularization, and reformulations to solver-friendly models. The decision rules also furnish a means to carry out sensitivity and stability analysis for broad classes of parameterized optimization problems. We develop a decomposition algorithm for solving the resulting training problems and demonstrate its ability to generate quality decision rules on a nonlinear binary optimization model from search theory.
title Risk-Adaptive Local Decision Rules
topic Optimization and Control
Systems and Control
url https://arxiv.org/abs/2310.09844