On the Hamiltonicity, traceability and toughness of complements of line graphs

Abstract

A coline graph co(G) of a graph G is the graph with vertex set E(G) for which two vertices e and e' of co(G) are adjacent if and only if they are not adjacent as edges in G. A graph G is tough if the number of connected components of G-S is at most |S| for all cut sets S. Wu and Meng, and Liu independently gave similar characterisations of coline graphs that are Hamiltonian. In this paper we give an alternate proof of Wu and Meng's and Liu's results using the longest cycle method. We in fact prove the following reformation of their results. A tough coline graph co(G) is Hamiltonian unless G is one of four examples, one of which is K5, since co(K5) is the Petersen graph. Characterisations of tough coline graphs and coline graphs which contain a Hamiltonian path are also given.