Signless Laplacian spectral analysis of a class of graph joins

Abstract

A graph is said to be determined by its signless Laplacian spectrum (abbreviated as DQS) if no other non-isomorphic graph shares the same signless Laplacian spectrum. In this paper, we establish the following results: (1). Every graph of the form K1 (Cs qK2), where q 0, s 3, and the number of vertices is at least 16, is DQS; (2). Every graph of the form K1 (Cs1 Cs2 ·s Cst qK2), where t 2, q 0, si 3, and the number of vertices is at least 52, is DQS. Here, Kn and Cn denote the complete graph and the cycle of order n, respectively, while and represent the disjoint union and the join of graphs. Moreover, the signless Laplacian spectrum of the graphs under consideration is computed explicitly.