Spectral extrema of graphs with fixed size: cycles and complete bipartite graphs

Abstract

Nikiforov [Some inequalities for the largest eigenvalue of a graph, Combin. Probab. Comput. 179--189] showed that if G is Kr+1-free then the spectral radius (G)≤2m(1-1/r), which implies that G contains C3 if (G)>m. In this paper, we follow this direction on determining which subgraphs will be contained in G if (G)> f(m), where f(m)m as m→ ∞. We first show that if (G)≥ m, then G contains K2,r+1 unless G is a star; and G contains either C3+ or C4+ unless G is a complete bipartite graph, where Ct+ denotes the graph obtained from Ct and C3 by identifying an edge. Secondly, we prove that if (G)≥12+m-34, then G contains pentagon and hexagon unless G is a book; and if (G)>12(k-12)+m+14(k-12)2, then G contains Ct for every t≤ 2k+2. In the end, some related conjectures are provided for further research.