Eigenvalues and triangles in graphs

Abstract

Bollob\'as and Nikiforov [J. Combin. Theory, Ser. B. 97 (2007) 859--865] conjectured the following. If G is a Kr+1-free graph on at least r+1 vertices and m edges, then λ21(G)+λ22(G)≤ r-1r·2m, where λ1(G) and λ2(G) are the largest and the second largest eigenvalues of the adjacency matrix A(G), respectively. In this paper, we confirm the conjecture in the case r=2, by using tools from doubly stochastic matrix theory, and also characterize all families of extremal graphs. Motivated by classic theorems due to Erdos and Nosal respectively, we prove that every non-bipartite graph G of order n and size m contains a triangle, if one of the following is true: (1) λ1(G)≥m-1 and G≠ C5 (n-5)K1; and (2) λ1(G)≥ λ1(S(Kn-12,n-12)) and G≠ S(Kn-12,n-12), where S(Kn-12,n-12) is obtained from Kn-12,n-12 by subdividing an edge. Both conditions are best possible. We conclude this paper with some open problems.