An Improved Fixed-Parameter Algorithm for 2-Club Cluster Edge Deletion

Abstract

A 2-club is a graph of diameter at most two. In the decision version of the parametrized 2-Club Cluster Edge Deletion problem, an undirected graph G is given along with an integer k≥ 0 as parameter, and the question is whether G can be transformed into a disjoint union of 2-clubs by deleting at most k edges. A simple fixed-parameter algorithm solves the problem in O*(3k), and a decade-old algorithm was claimed to have an improved running time of O*(2.74k) via a sophisticated case analysis. Unfortunately, this latter algorithm suffers from a flawed branching scenario. In this paper, an improved fixed-parameter algorithm is presented with a running time in O*(2.695k).