Efficient (j,k)-Domination in Regular Graphs
Abstract
Rubalcaba and Slater (Robert R. Rubalcaba and Peter J. Slater. Efficient (j,k)-domination. Discuss. Math. Graph Theory, 27(3):409-423, 2007.) define a -dominating function on graph as a function so that for each , , where is the closed neighbourhood of . Such a function is efficient if all of the vertex inequalities are met with equality. They give a simple necessary condition for efficient domination, namely: if is an -regular graph on vertices that has an efficient -dominating function, then the size of the corresponding dominating set divides . The Hamming graph is the graph on the vectors where two vectors are adjacent if and only if they are at Hamming distance . We show that if is prime, then the previous necessary condition is sufficient for to have an efficient -dominating function. This result extends a result of Lee (Jaeun Lee. Independent perfect domination sets in Cayley graphs. J. Graph Theory, 37(4):213-219, 2001.) on independent perfect domination in Cayley graphs. We mention difficulties that arise for when is a prime power but not prime.
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Cite
@article{arxiv.2107.09758,
title = {Efficient (j,k)-Domination in Regular Graphs},
author = {Brendan Rooney},
journal= {arXiv preprint arXiv:2107.09758},
year = {2021}
}
Comments
11 pages, 1 figure