4-total edge product cordial for some star related graphs

Almothana Azaizeh; Roslan Hasni; Firas Haddad; Mutasem Alsmadi; Raed Alkhasawneh; Asma Hamad

doi:10.11591/ijece.v12i4.pp4007-4020

4-total edge product cordial for some star related graphs

Almothana Azaizeh^*
, Roslan Hasni
, Firas Haddad
, Mutasem Alsmadi
, Raed Alkhasawneh
, Asma Hamad

^*Corresponding author for this work

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

1 Scopus citations

Abstract

Let G = (V (G), E(G)) be a graph, define an edge labeling function ψ from E(G) to {0, 1, . . ., k − 1} where k is an integer, 2 ≤ k ≤ |E(G)|, induces a vertex labeling function ψ^∗ from V (G) to {0, 1, . . ., k − 1} such that ψ^∗(v) = ψ(e1) × ψ(e2) × . . . × ψ(en) mod k where e1, e2, . . ., en are all edge incident to v. This function ψ is called a k-total edge product cordial (or simply k-TEPC) labeling of G if the absolute difference between number of vertices and edges labeling with i and number of vertices and edges labeling with j no more than 1 for all i, j ∈ {0, 1, . . ., k − 1}. In this paper, 4-total edge product cordial labeling for some star related graphs are determined.

Original language	English
Pages (from-to)	4007-4020
Number of pages	14
Journal	International Journal of Electrical and Computer Engineering
Volume	12
Issue number	4
DOIs	https://doi.org/10.11591/ijece.v12i4.pp4007-4020
State	Published - Aug 2022

Keywords

Edge labeling graph
k-total edge product cordial
Product vordial
Total product cordial

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10.11591/ijece.v12i4.pp4007-4020

Cite this

@article{0761a5e7b4f64fee86dc391b2a7816b5,

title = "4-total edge product cordial for some star related graphs",

abstract = "Let G = (V (G), E(G)) be a graph, define an edge labeling function ψ from E(G) to \{0, 1, . . ., k − 1\} where k is an integer, 2 ≤ k ≤ |E(G)|, induces a vertex labeling function ψ∗ from V (G) to \{0, 1, . . ., k − 1\} such that ψ∗(v) = ψ(e1) × ψ(e2) × . . . × ψ(en) mod k where e1, e2, . . ., en are all edge incident to v. This function ψ is called a k-total edge product cordial (or simply k-TEPC) labeling of G if the absolute difference between number of vertices and edges labeling with i and number of vertices and edges labeling with j no more than 1 for all i, j ∈ \{0, 1, . . ., k − 1\}. In this paper, 4-total edge product cordial labeling for some star related graphs are determined.",

keywords = "Edge labeling graph, k-total edge product cordial, Product vordial, Total product cordial",

author = "Almothana Azaizeh and Roslan Hasni and Firas Haddad and Mutasem Alsmadi and Raed Alkhasawneh and Asma Hamad",

year = "2022",

month = aug,

doi = "10.11591/ijece.v12i4.pp4007-4020",

language = "English",

volume = "12",

pages = "4007--4020",

journal = "International Journal of Electrical and Computer Engineering",

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T1 - 4-total edge product cordial for some star related graphs

AU - Azaizeh, Almothana

AU - Hasni, Roslan

AU - Haddad, Firas

AU - Alsmadi, Mutasem

AU - Alkhasawneh, Raed

AU - Hamad, Asma

PY - 2022/8

Y1 - 2022/8

N2 - Let G = (V (G), E(G)) be a graph, define an edge labeling function ψ from E(G) to {0, 1, . . ., k − 1} where k is an integer, 2 ≤ k ≤ |E(G)|, induces a vertex labeling function ψ∗ from V (G) to {0, 1, . . ., k − 1} such that ψ∗(v) = ψ(e1) × ψ(e2) × . . . × ψ(en) mod k where e1, e2, . . ., en are all edge incident to v. This function ψ is called a k-total edge product cordial (or simply k-TEPC) labeling of G if the absolute difference between number of vertices and edges labeling with i and number of vertices and edges labeling with j no more than 1 for all i, j ∈ {0, 1, . . ., k − 1}. In this paper, 4-total edge product cordial labeling for some star related graphs are determined.

AB - Let G = (V (G), E(G)) be a graph, define an edge labeling function ψ from E(G) to {0, 1, . . ., k − 1} where k is an integer, 2 ≤ k ≤ |E(G)|, induces a vertex labeling function ψ∗ from V (G) to {0, 1, . . ., k − 1} such that ψ∗(v) = ψ(e1) × ψ(e2) × . . . × ψ(en) mod k where e1, e2, . . ., en are all edge incident to v. This function ψ is called a k-total edge product cordial (or simply k-TEPC) labeling of G if the absolute difference between number of vertices and edges labeling with i and number of vertices and edges labeling with j no more than 1 for all i, j ∈ {0, 1, . . ., k − 1}. In this paper, 4-total edge product cordial labeling for some star related graphs are determined.

KW - Edge labeling graph

KW - k-total edge product cordial

KW - Product vordial

KW - Total product cordial

UR - https://www.scopus.com/pages/publications/85129621819

U2 - 10.11591/ijece.v12i4.pp4007-4020

DO - 10.11591/ijece.v12i4.pp4007-4020

M3 - Article

AN - SCOPUS:85129621819

SN - 2088-8708

VL - 12

SP - 4007

EP - 4020

JO - International Journal of Electrical and Computer Engineering

JF - International Journal of Electrical and Computer Engineering

IS - 4

ER -

4-total edge product cordial for some star related graphs

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Keywords

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