Extremal results on the second largest eigenvalue of graphs with given order

Abstract

In this paper, we demonstrate the effects on the second largest eigenvalue λ2(G) of a connected graph G after edge addition or deletion. In 1989, Chung, Graham and Wilson showed \|λ2|,|λn|\>Ω(n) for dense Kr+1-free graphs of order n, giving spectral comprehension of existence of large clique or independent set, respect to Ramsey theory. Applying the results of effects on λ2 after edge operations, we determine the maximum value of λ2 among all Kr+1-free connected graphs with given order, and completely characterize the extremal graphs. Moreover, for arbitrary given graph F, we investigates the maximum second largest λ2(G) among F-free connected graphs of order n. Let ρ*(n,F) be the maximum spectral radius of F-free graphs on n nF vertices, and G*(n,F) be a graph with its spectral radius ρ(G*(n,F))=ρ*(n,F). We prove that, for an F-free connected graph G of order n f(nF), \\(1) if n is odd, then λ2(G)ρ*(n-12,F) with equality if and only if G∈ I(G*(n-12,F),G*(n-12,F)); and\\ (2) if n is even, and F does not contain cut edges, then the graph G† with the maximum second largest eigenvalue satisfies λ2(G†)=ρ*(n2,F)-o(1) and G†∈ E(H1,H2), where H1 and H2 are F-saturated graphs on n2 vertices. In particular, other than a complete graph Kr+1, when F is a book graph Bk+1 or an odd cycle C2k+1, we are able to determine the maximum second largest eigenvalue for F-free connected graphs of given order, and completely characterize the extremal graphs.