The stability method, eigenvalues and cycles of consecutive lengths

Abstract

Woodall proved that for a graph G of order n≥ 2k+3 where k≥ 0 is an integer, if e(G)≥ n-k-12+k+22+1 then G contains a C for each ∈ [3,n-k]. In this article, we prove a stability result of this theorem. As a byproduct, we give complete solutions to two problems in GN19. Our second part is devoted to an open problem by Nikiforov: what is the maximum C such that for all positive <C and sufficiently large n, every graph G of order n with spectral radius (G)>n24 contains a cycle of length for every ≤ (C-)n. We prove that C≥14 by a method different from previous ones, improving the existing bounds. We also derive an Erdos-Gallai type edge number condition for even cycles, which may be of independent interest.