Total graph of a signed graph

Francesco Belardo; Zoran Stanić; Thomas Zaslavsky

doi:10.26493/1855-3974.2842.6b5

Total graph of a signed graph

Francesco Belardo
, Zoran Stanić
, Thomas Zaslavsky

Mathematics and Statistics

Binghamton University

Research output: Contribution to journal › Article › peer-review

12 Scopus citations

Abstract

The total graph is built by joining the graph to its line graph by means of the incidences. We introduce a similar construction for signed graphs. Under two similar definitions of the line signed graph, we define the corresponding total signed graph and we show that it is stable under switching. We consider balance, the frustration index and frustration number, and the largest eigenvalue. In the regular case we compute the spectrum of the adjacency matrix of the total graph and the spectra of certain compositions, and we determine some with exactly two main eigenvalues.

Original language	English
Article number	P1.02
Journal	Ars Mathematica Contemporanea
Volume	23
Issue number	1
DOIs	https://doi.org/10.26493/1855-3974.2842.6b5
State	Published - 2023

Keywords

Bidirected graph
Cartesian product graph
graph eigenvalues
regular signed graph
signed line graph
signed total graph

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10.26493/1855-3974.2842.6b5

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abstract = "The total graph is built by joining the graph to its line graph by means of the incidences. We introduce a similar construction for signed graphs. Under two similar definitions of the line signed graph, we define the corresponding total signed graph and we show that it is stable under switching. We consider balance, the frustration index and frustration number, and the largest eigenvalue. In the regular case we compute the spectrum of the adjacency matrix of the total graph and the spectra of certain compositions, and we determine some with exactly two main eigenvalues.",

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AU - Stanić, Zoran

AU - Zaslavsky, Thomas

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Y1 - 2023

N2 - The total graph is built by joining the graph to its line graph by means of the incidences. We introduce a similar construction for signed graphs. Under two similar definitions of the line signed graph, we define the corresponding total signed graph and we show that it is stable under switching. We consider balance, the frustration index and frustration number, and the largest eigenvalue. In the regular case we compute the spectrum of the adjacency matrix of the total graph and the spectra of certain compositions, and we determine some with exactly two main eigenvalues.

AB - The total graph is built by joining the graph to its line graph by means of the incidences. We introduce a similar construction for signed graphs. Under two similar definitions of the line signed graph, we define the corresponding total signed graph and we show that it is stable under switching. We consider balance, the frustration index and frustration number, and the largest eigenvalue. In the regular case we compute the spectrum of the adjacency matrix of the total graph and the spectra of certain compositions, and we determine some with exactly two main eigenvalues.

KW - Bidirected graph

KW - Cartesian product graph

KW - graph eigenvalues

KW - regular signed graph

KW - signed line graph

KW - signed total graph

UR - https://www.scopus.com/pages/publications/85134018324

U2 - 10.26493/1855-3974.2842.6b5

DO - 10.26493/1855-3974.2842.6b5

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JO - Ars Mathematica Contemporanea

JF - Ars Mathematica Contemporanea

IS - 1

M1 - P1.02

ER -

Total graph of a signed graph

Abstract

Keywords

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