On the signless Laplacian spectral radius of Ks,t-minor free graphs
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Publication:4959299
DOI10.1080/03081087.2019.1650880zbMath1472.05095arXiv1908.04221OpenAlexW2965701129MaRDI QIDQ4959299
Ming-Zhu Chen, Xiao Dong Zhang
Publication date: 13 September 2021
Published in: Linear and Multilinear Algebra (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1908.04221
extremal graphssignless Laplacian spectral radius\(K_{2,t}\)-minor free graph\(K_{3,3}\)-minor free graph
Extremal problems in graph theory (05C35) Graphs and linear algebra (matrices, eigenvalues, etc.) (05C50) Graph minors (05C83)
Related Items (3)
Maxima of the \(Q\)-index: graphs with no \(K_{1,t}\)-minor ⋮ An \(A_{\alpha}\)-spectral Erdős-Sós theorem ⋮ The spectral radius of minor-free graphs
Cites Work
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- The edge-density for \(K_{2,t}\) minors
- Bounds of eigenvalues of \(K_{3,3}\)-minor free graphs
- A note on Laplacian graph eigenvalues
- Tree-width, clique-minors, and eigenvalues.
- The Colin de Verdière parameter, excluded minors, and the spectral radius
- The spectral radius of graphs with no \(k_{2,t}\) minor
- Über eine Eigenschaft der ebenen Komplexe
- Bounds of spectral radii of K_{2,3}-minor free graphs
- Maxima of the signless Laplacian spectral radius for planar graphs
- Maxima of the Q-index, Forbidden 4-ycle and 5-cycle
- Spanning trees with many leaves
- Maxima of the \(Q\)-index: graphs with no \(K_{s,t}\)
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