On derived t-path, t=2,3 signed graph and t-distance signed graph

IF 1.6 Q2 MULTIDISCIPLINARY SCIENCES MethodsX Pub Date : 2025-01-14 DOI:10.1016/j.mex.2025.103160

Deepa Sinha, Sachin Somra

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引用次数: 0

Abstract

A signed graph

Σ

is a pair

Σ = (Σ^{u}, σ)

that consists of a graph

(Σ^{u}, E)

and a sign mapping called signature

σ

from E to the sign group

{+, -}

. In this paper, we discuss the t-path product signed graph

{\hat{(Σ)}}_{t}

where vertex set of

{\hat{(Σ)}}_{t}

is the same as that of

Σ

and two vertices are adjacent if there is a path of length t, between them in the signed graph

Σ

. The sign of an edge in the t-path product signed graph is determined by the product of marks of the vertices in the signed graph

Σ

, where the mark of a vertex is the product of signs of all edges incident to it. In this paper, we provide a characterization of

Σ

which are switching equivalent to t-path product signed graphs

{\hat{(Σ)}}_{t}

for

t = 2, 3

which are switching equivalent to

Σ

and also the negation of the signed graph ŋ

(Σ)

that are switching equivalent to

{\hat{(Σ)}}_{t}

for

t = 2, 3

. We also characterize signed graphs that are switching equivalent to

t

-distance signed graph

{(\bar{Σ})}_{t}

for

t = 2

where 2-distance signed graph

{(\bar{Σ})}_{2} = (V^{'}, E^{'}, σ^{'})

defined as follows: the vertex set is same as the original signed graph

Σ

and two vertices

u, v \in {(\bar{Σ})}_{2}

, are adjacent if and only if there exists a distance of length two in

Σ

. The edge

u v \in {(\bar{Σ})}_{2}

is negative if and only if all the edges, in all the distances of length two in

Σ

are negative otherwise the edge is positive. The t-path network along with these characterizations can be used to develop model for the study of various real life problems communication networks.