Tight Bound for Nikiforov's Spectral Even-Cycle Conjecture

Abstract

Nikiforov conjectured that, for every fixed k2 and all sufficiently large n, the unique n-vertex C2k+2-free graph with maximum adjacency spectral radius is S+n,k, where Sn,k=Kk Kn-k and S+n,k is obtained from Sn,k by adding one edge inside the independent part. Cioabă, Desai and Tait proved this conjecture for n kO(k). Later, Li and Ning raised the problem of determining the optimal exponent γ=γ(k) such that the same conclusion holds for n Ω(kγ(k)). We prove a stronger uniform theorem for Nikiforov's matrices Aα(G)=αD(G)+(1-α)A(G). More precisely, for every ε>0 there are constants Cε and kε such that for all 0α1-ε, k kε and n Cεk, every n-vertex C2k+2-free graph G satisfies ρα(G)ρα(S+n,k), with equality if and only if G S+n,k. In particular, the case when α=0 answers the problem of Li and Ning in the linear range, and the Aα-spectral even-cycle threshold is linear in k, uniformly for all α bounded away from 1. Our proof introduces a weighted rooted Erdős--Gallai type path lemma, which may be of independent interest in Perron-vector methods for spectral extremal graph problems. The same method also yields asymptotically tight Aα-spectral bounds for two local forbidden-subgraph families, namely (K1 P)-free graphs and Fs-free graphs, where Fs denotes the friendship graph.