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Main Authors: Aledo, Juan A., Domínguez, Concepción, Jaime-Alcántara, Juan de Dios, Landete, Mercedes
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2511.19345
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author Aledo, Juan A.
Domínguez, Concepción
Jaime-Alcántara, Juan de Dios
Landete, Mercedes
author_facet Aledo, Juan A.
Domínguez, Concepción
Jaime-Alcántara, Juan de Dios
Landete, Mercedes
contents Rank aggregation problems aim to combine multiple individual orderings of a common set of items into a consensus ranking that best reflects the collective preferences. This paper introduces a general Integer Linear Programming (ILP) framework to model and solve, in an exact way, problems whose solutions are weak orders (a.k.a.\ bucket orders). Within this framework, we consider additional relevant constraints to produce the consensus bucket order, considering configurations with a fixed number of buckets, predefined bucket sizes, top-$k$ type problems, and fairness constraints. All these formulations are developed in a general setting, allowing their application to different rank aggregation contexts. One of these problems is the Optimal Bucket Order Problem (OBOP), for which we propose for the first time an exact formulation and test the variants proposed. The computational study includes, on the one hand, a comparison between the exact results obtained by our models and the heuristic methods proposed by Aledo et al.\ (2018), and on the other hand, an additional evaluation of their performance on a representative set of instances from the PrefLib library. The results confirm the validity and efficiency of the proposed approach, providing a solid foundation for future research on rank aggregation problems with weak orders as consensus rankings.
format Preprint
id arxiv_https___arxiv_org_abs_2511_19345
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Optimizing Weak Orders via Integer Linear Programming
Aledo, Juan A.
Domínguez, Concepción
Jaime-Alcántara, Juan de Dios
Landete, Mercedes
Optimization and Control
Rank aggregation problems aim to combine multiple individual orderings of a common set of items into a consensus ranking that best reflects the collective preferences. This paper introduces a general Integer Linear Programming (ILP) framework to model and solve, in an exact way, problems whose solutions are weak orders (a.k.a.\ bucket orders). Within this framework, we consider additional relevant constraints to produce the consensus bucket order, considering configurations with a fixed number of buckets, predefined bucket sizes, top-$k$ type problems, and fairness constraints. All these formulations are developed in a general setting, allowing their application to different rank aggregation contexts. One of these problems is the Optimal Bucket Order Problem (OBOP), for which we propose for the first time an exact formulation and test the variants proposed. The computational study includes, on the one hand, a comparison between the exact results obtained by our models and the heuristic methods proposed by Aledo et al.\ (2018), and on the other hand, an additional evaluation of their performance on a representative set of instances from the PrefLib library. The results confirm the validity and efficiency of the proposed approach, providing a solid foundation for future research on rank aggregation problems with weak orders as consensus rankings.
title Optimizing Weak Orders via Integer Linear Programming
topic Optimization and Control
url https://arxiv.org/abs/2511.19345