On the existence of non-golden signed graphs
A signed graph is a pair Γ=(G,σ), where G=(V(G), E(G)) is a graph and σ: E(G) → {+1, -1} is the sign function on the edges of G. For a signed graph we consider the least eigenvalue λ(Γ) of the Laplacian matrix defined as L(Γ)=D(G)-A(Γ), where D(G) is the matrix of vertices degrees of G and A(Γ) is t...
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Accademia Peloritana dei Pericolanti
2018-11-01
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| Series: | Atti della Accademia Peloritana dei Pericolanti : Classe di Scienze Fisiche, Matematiche e Naturali |
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http://dx.doi.org/10.1478/AAPP.96S2A2
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doaj-52090c363f694a6595141f0fc1bb7efa2020-11-25T00:41:54ZengAccademia Peloritana dei PericolantiAtti della Accademia Peloritana dei Pericolanti : Classe di Scienze Fisiche, Matematiche e Naturali0365-03591825-12422018-11-0196S2A210.1478/AAPP.96S2A2AAPP.96S2A2On the existence of non-golden signed graphsMaurizio BrunettiA signed graph is a pair Γ=(G,σ), where G=(V(G), E(G)) is a graph and σ: E(G) → {+1, -1} is the sign function on the edges of G. For a signed graph we consider the least eigenvalue λ(Γ) of the Laplacian matrix defined as L(Γ)=D(G)-A(Γ), where D(G) is the matrix of vertices degrees of G and A(Γ) is the signed adjacency matrix. An unbalanced signed bicyclic graph is said to be golden if it is switching equivalent to a graph Γ satisfying the following property: there exists a cycle C in Γ and a λ(Γ)-eigenvector x such that the unique negative edge pg of Γ belongs to C and detects the minimum of the set S_x(Γ, C)={|x_r x_s| | rs ∈ E(C)}. In this paper we show that non-golden bicyclic graphs with frustration index 1 exist for each n≥5. http://dx.doi.org/10.1478/AAPP.96S2A2 |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
Maurizio Brunetti |
| spellingShingle |
Maurizio Brunetti On the existence of non-golden signed graphs Atti della Accademia Peloritana dei Pericolanti : Classe di Scienze Fisiche, Matematiche e Naturali |
| author_facet |
Maurizio Brunetti |
| author_sort |
Maurizio Brunetti |
| title |
On the existence of non-golden signed graphs |
| title_short |
On the existence of non-golden signed graphs |
| title_full |
On the existence of non-golden signed graphs |
| title_fullStr |
On the existence of non-golden signed graphs |
| title_full_unstemmed |
On the existence of non-golden signed graphs |
| title_sort |
on the existence of non-golden signed graphs |
| publisher |
Accademia Peloritana dei Pericolanti |
| series |
Atti della Accademia Peloritana dei Pericolanti : Classe di Scienze Fisiche, Matematiche e Naturali |
| issn |
0365-0359 1825-1242 |
| publishDate |
2018-11-01 |
| description |
A signed graph is a pair Γ=(G,σ), where G=(V(G), E(G)) is a graph and σ: E(G) → {+1, -1} is the sign function on the edges of G. For a signed graph we consider the least eigenvalue λ(Γ) of the Laplacian matrix defined as L(Γ)=D(G)-A(Γ), where D(G) is the matrix of vertices degrees of G and A(Γ) is the signed adjacency matrix. An unbalanced signed bicyclic graph is said to be golden if it is switching equivalent to a graph Γ satisfying the following property: there exists a cycle C in Γ and a λ(Γ)-eigenvector x such that the unique negative edge pg of Γ belongs to C and detects the minimum of the set S_x(Γ, C)={|x_r x_s| | rs ∈ E(C)}. In this paper we show that non-golden bicyclic graphs with frustration index 1 exist for each n≥5. |
| url |
http://dx.doi.org/10.1478/AAPP.96S2A2
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AT mauriziobrunetti ontheexistenceofnongoldensignedgraphs |
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1725284970191126528 |