Lagrangian Dual Decision Rules for Multistage Stochastic Mixed-Integer Programming
成果类型:
Article
署名作者:
Daryalal, Maryam; Bodur, Merve; Luedtke, James R.
署名单位:
Universite de Montreal; HEC Montreal; University of Toronto; University of Wisconsin System; University of Wisconsin Madison
刊物名称:
OPERATIONS RESEARCH
ISSN/ISSBN:
0030-364X
DOI:
10.1287/opre.2022.2366
发表日期:
2024
关键词:
decomposition algorithms
approximation approach
capacity expansion
network
optimization
aggregation
restoration
Recourse
DESIGN
SYSTEM
摘要:
Multistage stochastic programs can be approximated by restricting policies to follow decision rules. Directly applying this idea to problems with integer decisions is difficult because of the need for decision rules that lead to integral decisions. In this work, we introduce Lagrangian dual decision rules (LDDRs) for multistage stochastic mixed-integer programming (MSMIP), which overcome this difficulty by applying decision rules in a Lagrangian dual of the MSMIP. We propose two new bounding techniques based on stagewise (SW) and nonanticipative (NA) Lagrangian duals, where the Lagrangian multiplier policies are restricted by LDDRs. We demonstrate how the solutions from these duals can be used to drive primal policies. Our proposal requires fewer assumptions than most existing MSMIP methods. We compare the theoretical strength of the restricted duals and show that the restricted NA dual can provide relaxation bounds at least as good as the ones obtained by the restricted SW dual. In our numerical study on two problem classes, one traditional and one novel, we observe that the proposed LDDR approaches yield significant optimality-gap reductions compared with existing general-purpose bounding methods for MSMIP problems.
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