The signless Laplacian spectral radius of graphs without intersecting odd cycles
Abstract
Let Fa1,…,ak be a graph consisting of k cycles of odd length 2a1+1,…, 2ak+1, respectively which intersect in exactly a common vertex, where k≥1 and a1 a2 ·s ak 1. In this paper, we present a sharp upper bound for the signless Laplacian spectral radius of all Fa1,…,ak-free graphs and characterize all extremal graphs which attain the bound. The stability methods and structure of graphs associated with the eigenvalue are adapted for the proof.
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