The spectral radius of graphs without long cycles

Abstract

Nikiforov conjectured that for a given integer k 2, any graph G of sufficiently large order n with spectral radius μ(G)≥ μ(Sn,k) (or μ(G) μ(Sn,k+)) contains C2k+1 or C2k+2(or C2k+2), unless G=Sn,k (or G=Sn,k+), where C is a cycle of length and Sn,k=Kk Kn-k, the join graph of a complete graph of order k and an empty graph on n-k vertices, and Sn,k+ is the graph obtained from Sn,k by adding an edge in the independent set of Sn,k. %This can be vie as spectral version of Erd\"os and S\'os conjecture. In this paper, a weaker version of Nikiforov's conjecture is considered, we prove that for a given integer k 2, any graph G of sufficiently large order n with spectral radius μ(G)≥ μ(Sn,k) (or μ(G) μ(Sn,k+)) %C2k+1 or C2k+2(or C2k+2), unless G=Sn,k (or G=Sn,k+)Sn,k ( or Sn,k+) is the unique extremal graph with maximum radius among all of the graphs of order n and contains a cycle C with ≥ 2k+1 (or C with ≥ 2k+2), unless G=Sn,k (or G=Sn,k+). These results also imply a result of Nikiforov given in [Theorem 2, The spectral radius of graphs without paths and cycles of specified length, LAA, 2010].