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Bibliographic Details
Main Authors: Ciccarelli, Fabio, Furini, Fabio, Hojny, Christopher, Lübbecke, Marco
Format: Preprint
Published: 2026
Subjects:
Online Access:https://arxiv.org/abs/2602.04984
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author Ciccarelli, Fabio
Furini, Fabio
Hojny, Christopher
Lübbecke, Marco
author_facet Ciccarelli, Fabio
Furini, Fabio
Hojny, Christopher
Lübbecke, Marco
contents Given an undirected graph, the k-vertex cut problem (k-VCP) asks for a minimum-cost set of vertices whose removal yields at least k connected components in the resulting graph. The k-VCP is an important problem in network optimization, with applications in infrastructure protection and epidemic containment. We present a new extended integer linear programming (ILP) formulation that unifies and strengthens existing models and serves as the foundation for a new branch-and-price algorithm for the k-VCP. An in-depth theoretical study enables us to devise algorithmic components such as tailored branching rules that preserve the structure of the pricing problems, as well as valid inequalities and symmetry-handling techniques. We also show that our new model dominates all previous ILP formulations of the k-VCP in terms of their linear relaxations, which theoretically justifies the computational effectiveness of our approach. Extensive computational experiments against state-of-the-art methods demonstrate substantially improved performance, both in terms of instances solved to proven optimality and running times. On the full benchmark of 608 instances, our algorithm consistently outperforms all competitors and is able to solve 73 previously unsolved instances within the time limit of one hour.
format Preprint
id arxiv_https___arxiv_org_abs_2602_04984
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Branch-and-price strikes back for the k-vertex cut problem
Ciccarelli, Fabio
Furini, Fabio
Hojny, Christopher
Lübbecke, Marco
Optimization and Control
Given an undirected graph, the k-vertex cut problem (k-VCP) asks for a minimum-cost set of vertices whose removal yields at least k connected components in the resulting graph. The k-VCP is an important problem in network optimization, with applications in infrastructure protection and epidemic containment. We present a new extended integer linear programming (ILP) formulation that unifies and strengthens existing models and serves as the foundation for a new branch-and-price algorithm for the k-VCP. An in-depth theoretical study enables us to devise algorithmic components such as tailored branching rules that preserve the structure of the pricing problems, as well as valid inequalities and symmetry-handling techniques. We also show that our new model dominates all previous ILP formulations of the k-VCP in terms of their linear relaxations, which theoretically justifies the computational effectiveness of our approach. Extensive computational experiments against state-of-the-art methods demonstrate substantially improved performance, both in terms of instances solved to proven optimality and running times. On the full benchmark of 608 instances, our algorithm consistently outperforms all competitors and is able to solve 73 previously unsolved instances within the time limit of one hour.
title Branch-and-price strikes back for the k-vertex cut problem
topic Optimization and Control
url https://arxiv.org/abs/2602.04984