Title |
Resolving Restrained Domination in Graphs |
Authors |
Gerald B. Monsanto and Helen M. Rara |
Publication date |
July, 2021 |
Journal |
European Journal of Pure and Applied Mathematics |
Volume |
14 |
Issue |
No. 3, 2021 |
Pages |
829-841 |
Publisher |
New York Business Global |
Abstract |
Let G be a connected graph. Brigham et al. [3] de fined a resolving dominating set as a set S of vertices of a connected graph G that is both resolving and dominating. A set S subset of V (G) is a resolving restrained dominating set of G if S is a resolving dominating set of G and S = V (G) or V (G)S has no isolated vertex. In this paper, we characterize the resolving restrained dominating sets in the join, corona and lexicographic product of graphs and determine the resolving restrained domination number of these graphs. |
Index terms / Keywords |
dominating set, resolving set, resolving dominating set, resolving restrained dominating set, join, corona, lexicographic product |
DOI |
https;//doi.org/10.29020/nybg.ejpam.v14i3.3985 |
URL |
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