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Autori principali: van Rossum, Bart, Chen, Rui, Lodi, Andrea
Natura: Preprint
Pubblicazione: 2023
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Accesso online:https://arxiv.org/abs/2311.03885
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author van Rossum, Bart
Chen, Rui
Lodi, Andrea
author_facet van Rossum, Bart
Chen, Rui
Lodi, Andrea
contents We consider range minimization problems featuring exponentially many variables, as frequently arising in fairness-oriented or bi-objective optimization. While branch and price is successful at solving cost-oriented problems with many variables, the performance of classical branch-and-price algorithms for range minimization is drastically impaired by weak linear programming relaxations. We propose range branching, a generic branching rule that directly tackles this issue and can be used on top of problem-specific branching schemes. We show several desirable properties of range branching and show its effectiveness on a series of instances of the fair capacitated vehicle routing problem and fair generalized assignment problem. Range branching significantly improves multiple classical branching schemes in terms of computing time, optimality gap, and size of the branch-and-bound tree, allowing us to solve many more large instances than classical methods. Moreover, we show how range branching can be successfully generalized to order-based objective functions, such as the Gini deviation.
format Preprint
id arxiv_https___arxiv_org_abs_2311_03885
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle Efficient Branching Rules for Optimizing Range and Order-Based Objective Functions
van Rossum, Bart
Chen, Rui
Lodi, Andrea
Optimization and Control
We consider range minimization problems featuring exponentially many variables, as frequently arising in fairness-oriented or bi-objective optimization. While branch and price is successful at solving cost-oriented problems with many variables, the performance of classical branch-and-price algorithms for range minimization is drastically impaired by weak linear programming relaxations. We propose range branching, a generic branching rule that directly tackles this issue and can be used on top of problem-specific branching schemes. We show several desirable properties of range branching and show its effectiveness on a series of instances of the fair capacitated vehicle routing problem and fair generalized assignment problem. Range branching significantly improves multiple classical branching schemes in terms of computing time, optimality gap, and size of the branch-and-bound tree, allowing us to solve many more large instances than classical methods. Moreover, we show how range branching can be successfully generalized to order-based objective functions, such as the Gini deviation.
title Efficient Branching Rules for Optimizing Range and Order-Based Objective Functions
topic Optimization and Control
url https://arxiv.org/abs/2311.03885