Determining some graph joins by the signless Laplacian spectrum
Abstract
A graph is determined by its signless Laplacian spectrum if there is no other non-isomorphic graph sharing the same signless Laplacian spectrum. Let Cl, Pl, Kl and Ks,l-s be the cycle, the path, the complete graph and the complete bipartite graph with l vertices, respectively. We prove that G K1 (Cl1 Cl2·s Clt sK1), with s 0, t 1, n≥ 22, is determined by the signless Laplacian spectrum if and only if either s=0 or s 1 and li 3 holds for all 1≤ i≤ t, where n is the order of G, and and stand for the disjoint union and the join of two graphs, respectively. Moreover, for s 1 and lt=3, K1 (K1,3 Cl1 Cl2·s Clt-1 (s-1)K1) is fixed as a graph sharing the signless Laplacian spectrum with G. This contribution extends some recently published results.
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