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Bibliographic Details
Main Author: Zhang, Yiling
Format: Preprint
Published: 2023
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Online Access:https://arxiv.org/abs/2303.15282
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author Zhang, Yiling
author_facet Zhang, Yiling
contents We study distributionally robust chance-constrained programs (DRCCPs) with individual chance constraints under a Wasserstein ambiguity. The DRCCPs treat the risk tolerances associated with the distributionally robust chance constraints (DRCCs) as decision variables to trade off between the system cost and risk of violations by penalizing the risk tolerances in the objective function. The introduction of adjustable risks, unfortunately, leads to NP-hard optimization problems. We develop integer programming approaches for individual chance constraints with uncertainty either on the right-hand side or on the left-hand side. In particular, we derive mixed integer programming reformulations for the two types of uncertainty to determine the optimal risk tolerance for the chance constraint. Valid inequalities are derived to strengthen the formulations. We test diverse instances of diverse sizes.
format Preprint
id arxiv_https___arxiv_org_abs_2303_15282
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle Integer Programming Approaches for Distributionally Robust Chance Constraints with Adjustable Risks
Zhang, Yiling
Optimization and Control
We study distributionally robust chance-constrained programs (DRCCPs) with individual chance constraints under a Wasserstein ambiguity. The DRCCPs treat the risk tolerances associated with the distributionally robust chance constraints (DRCCs) as decision variables to trade off between the system cost and risk of violations by penalizing the risk tolerances in the objective function. The introduction of adjustable risks, unfortunately, leads to NP-hard optimization problems. We develop integer programming approaches for individual chance constraints with uncertainty either on the right-hand side or on the left-hand side. In particular, we derive mixed integer programming reformulations for the two types of uncertainty to determine the optimal risk tolerance for the chance constraint. Valid inequalities are derived to strengthen the formulations. We test diverse instances of diverse sizes.
title Integer Programming Approaches for Distributionally Robust Chance Constraints with Adjustable Risks
topic Optimization and Control
url https://arxiv.org/abs/2303.15282