IJPAM: Volume 118, No. 4 (2018)

Title

A NOTE ON TOTAL NEIGHBORHOOD PRIME LABELING

Authors

Rajesh Kumar T.J.$^1$, Mathew Varkey T.K.$^2$
$^{1,2}$Department of Mathematics
T.K.M College of Engineering
Kollam, Kerala, INDIA

Abstract

A graph G with vertex set V(G) is said to have a prime labeling if its vertices can be labeled with distinct integers 1,2,3,...,$\vert V\vert$ such that for each $xy\epsilon E(G)$ the labels assigned to x and y are relatively prime.A graph that admits a prime labeling is called a prime graph.In this paper,we introduce a new type of labeling called total neighborhood prime labeling. A graph which admits total neighbourhood prime labeling is called total neighbourhood prime graph.We studied the total neighbourhood prime labeling of paths and cycles.We proved that every path $P_n$ and every cycle $C_n$ if n is even and $n \ncong 2 mod(4)$ are total neighbourhood prime graphs. We also prove that the comb graph is total neighbourhood prime graph.

History

Received: May 24, 2017
Revised: January 12, 2018
Published: May 23, 2018

AMS Classification, Key Words

AMS Subject Classification: 05C78
Key Words and Phrases: total neighborhood prime labeling, paths, cycles, comb graph

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Bibliography

1
G. S. Bloom, S. W. Golomb, Applications of numbered undirected graphs, Proc. of the IEEE, 165, No. 4 (1977), 562-70.

2
F. Harary, Graph Theory, Addision Wesley, Reading, M. A, 1969.

3
Joseph A. Gallian, A dynamic survey of graph labeling, The Electronic Journal of Combinatorics, 17 (2014).

4
A. Tout, A. N. Dabboucy, K. Howalla, Prime labeling of graphs, Nat. Acad. Sci. Letters, 11 (1982), 365-368.

5
H. L. Fu, K. C. Huang, On prime labeling, Discrete Math. , 127 (1994), 181-186.

6
Samir K. Vaidya, Udayan M. Prajapati, Some new results on prime graphs, Open Journal of Discrete Mathematics, 2 (2012), 99-104.

7
S. K. Vaidya, K. K. Kanani, Prime labeling for some cycle related graphs, Journal of Mathematics Research, 2, No. 2 (2010).

8
S. K. Patel, N. P. Shrimali, Neighborhood prime labeling, International Journal of Mathematics and Soft Computing, 5, No. 2 (2015), 135-143.

9
T. K. Mathew Varkey, Rajesh Kumar T. J. , A note on neighbourhood prime labeling, International journal of Mathematics Combinatorics, 4 (2016).

10
Ramasubramanian R. Kala, Total prime graph, International Journal of Computational Engineering Research, 2, No. 5 (2012).

How to Cite?

DOI: 10.12732/ijpam.v118i4.14 How to cite this paper?

Source:
International Journal of Pure and Applied Mathematics
ISSN printed version: 1311-8080
ISSN on-line version: 1314-3395
Year: 2018
Volume: 118
Issue: 4
Pages: 1007 - 1013


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