Given a graph G, the Connected Vertex Cover problem (CVC) asks to find a minimum cardinality vertex cover of G that induces a connected subgraph. This paper describes some approaches to solve the CVC problem exactly. First, we give compact mixed-integer extended formulations for CVC: these are the first formulations proposed for this problem, have a small number of extra variables and can be easily adapted to variations of the problem such as Tree Cover. Second, we describe a simple branch and bound algorithm for the CVC problem. Finally, we implement our algorithm and compare its performance against our best extended formulation: contrary to what usually happens for the classical Vertex Cover problem, our formulation outperforms the branch and bound algorithm.
Exact Approaches for the Connected Vertex Cover Problem
Aprile, Manuel
2024
Abstract
Given a graph G, the Connected Vertex Cover problem (CVC) asks to find a minimum cardinality vertex cover of G that induces a connected subgraph. This paper describes some approaches to solve the CVC problem exactly. First, we give compact mixed-integer extended formulations for CVC: these are the first formulations proposed for this problem, have a small number of extra variables and can be easily adapted to variations of the problem such as Tree Cover. Second, we describe a simple branch and bound algorithm for the CVC problem. Finally, we implement our algorithm and compare its performance against our best extended formulation: contrary to what usually happens for the classical Vertex Cover problem, our formulation outperforms the branch and bound algorithm.
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