On (Semi-) Edge-primality of Graphs

Author(s):

W.-C. Shiu , G.-C. Lau , S.-M. Lee

Abstract:
Let $G= (V,E)$ be a $(p,q)$-graph. A bijection $f: Eto{1,2,3,ldots,q }$ is called an edge-prime labeling if for each edge $uv$ in $E$, we have $GCD(f^(u),f^(v))=1$ where $f^(u) = sum_{uwin E} f(uw)$. Moreover, a bijection $f: Eto{1,2,3,ldots,q }$ is called a semi-edge-prime labeling if for each edge $uv$ in $E$, we have $GCD(f^(u),f^(v))=1$ or $f^(u)=f^(v)$. A graph that admits an edge-prime (or a semi-edge-prime) labeling is called an edge-prime (or a semi-edge-prime) graph. In this paper we determine the necessary and/or sufficient condition for the existence of (semi-) edge-primality of many family of graphs.
Keywords:

Prime labeling , Edge-prime labeling , Semi-Edge-prime labeling , Bipartite graphs , Tripartite graphs

Language:
English
Published:
Iranian Journal of Mathematical Sciences and Informatics, Volume:12 Issue: 2, Nov 2017
Pages:
1 to 14
https://www.magiran.com/p1746023