Ming-Zhu Chen, Zhao-Ming Li, Xiao-Dong Zhang
Published 2022-09-07Version 1
Let $Q(G)=D(G)+A(G)$ be the signless Laplacian matrix of a simple graph of order $n$, where $D(G)$ and $A(G)$ are the degree diagonal matrix and the adjacency matrix of $G$, respectively. In this paper, we present a sharp upper bound for the signless spectral radius of $G$ without any tree and characterize all extremal graphs which attain the upper bound, which may be regarded as a spectral extremal version for the famous Erd\H{o}s-S\'{o}s conjecture.
Signless Laplacian spectral radius and Hamiltonicity of graphs with large minimum degree
Extremal graphs for clique-paths
A proof of the stability of extremal graphs, Simonovits' stability from Szemerédi's regularity
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