On \(Q\)-integral graphs with edge-degrees at most six
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Publication:2002711
DOI10.1016/j.laa.2019.04.015zbMath1416.05178OpenAlexW2937522858MaRDI QIDQ2002711
Publication date: 12 July 2019
Published in: Linear Algebra and its Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.laa.2019.04.015
Enumeration in graph theory (05C30) Graphs and linear algebra (matrices, eigenvalues, etc.) (05C50) Distance in graphs (05C12) Connectivity (05C40)
Related Items (3)
Graphs whose second largest signless Laplacian eigenvalue does not exceed \(2+\sqrt{2}\) ⋮ On \(Q\)-integral graphs with \(Q\)-spectral radius 6 ⋮ Connected \(Q\)-integral graphs with maximum edge-degree less than or equal to 8
Cites Work
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- The non-bipartite integral graphs with spectral radius three
- Spectra of graphs
- Signless Laplacians of finite graphs
- Q-integral graphs with edge-degrees at most five
- The integral trees with spectral radius 3
- Towards a spectral theory of graphs based on the signless Laplacian. II.
- Infinite families of \(Q\)-integral graphs
- Which non-regular bipartite integral graphs with maximum degree four do not have \(\pm 1\) as eigenvalues?
- \(Q\)-integral complete \(r\)-partite graphs
- Remarks on \(Q\)-integral complete multipartite graphs
- On Q-integral (3,s)-semiregular bipartite graphs
- Q-integral unicyclic, bicyclic and tricyclic graphs
- Towards a spectral theory of graphs based on the signless Laplacian, I
- A survey on integral graphs
- Towards a spectral theory of graphs based on the signless Laplacian, III
- QLS-integrality of complete r-partite graphs
- The nonregular, bipartite, integral graphs with maximum degree 4. I: Basic properties
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