International Journal of Nonlinear Analysis and Applications
The arrow edge domination in graphs
Document Type : Research Paper
Authors
College of Education for Pure Sciences, University of Thi-Qar, Thi-Qar, Iraq
Abstract
The idea of this paper is to study the arrow edge domination. The arrow edge dominating set $D_{e}$ of a graph $G$ is an arrow edge dominating set if every edge from $D$ dominates exactly one edge from $V-D$ and is adjacent to two or more edges from $D$. The arrow edge domination number $\gamma_{\text {are }}(G)$ is the minimum cardinality of all arrow edge dominating sets in $G$. Several properties and bounds are introduced here. Our results are applied in some graphs such that the path graph, cycle graph, complete graph, wheel graph, complete bipartite graph, Barbell graph, helm graph, big helm graph, complement path graph, complement cycle graph, the complement of complete graph and complement of complete bipartite graph. An important fact given here is if $G$ has no arrow vertex dominating set, then $G$ may have an arrow edge dominating set and an example is given.
Keywords
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Volume 13, Issue 2
July 2022Pages 591-597
- Receive Date: 02 January 2022
- Revise Date: 18 February 2022
- Accept Date: 25 March 2022