On the multiplicity of −1 as an eigenvalue of a tree with given number of pendant vertices
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Publication:5049197
DOI10.1080/03081087.2020.1838424zbMath1505.05095OpenAlexW3096250376MaRDI QIDQ5049197
Dein Wong, Fenglei Tian, Liangli Wei, Xinlei Wang
Publication date: 11 November 2022
Published in: Linear and Multilinear Algebra (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/03081087.2020.1838424
Related Items
A characterization of trees with eigenvalue multiplicity one less than their number of pendant vertices, Eigenvalue multiplicity of graphs with given cyclomatic number and given number of quasi-pendant vertices
Cites Work
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- Nullity of a graph in terms of the dimension of cycle space and the number of pendant vertices
- A characterization of graphs \(G\) with nullity \(|V(G)|-2m(G)+2c(G)\)
- Permanental roots and the star degree of a graph
- On the nullity and the matching number of unicyclic graphs
- On the multiplicity of \(\alpha\) as an eigenvalue of \(A_\alpha(G)\) of graphs with pendant vertices
- Trees with maximum nullity
- On the Faria's inequality for the Laplacian and signless Laplacian spectra: a unified approach
- On the multiplicity of \(\alpha\) as an \(A_\alpha(\varGamma)\)-eigenvalue of signed graphs with pendant vertices
- The multiplicity of an arbitrary eigenvalue of a graph in terms of cyclomatic number and number of pendant vertices
- On the nullity of unicyclic graphs
- An upper bound for the nullity of a bipartite graph in terms of its maximum degree
- On the nullity of graphs
- On the nullity of bipartite graphs
- On the nullity of line graphs of trees
- Relation between the skew-rank of an oriented graph and the rank of its underlying graph
