English

Efficient (j,k)-Domination in Regular Graphs

Combinatorics 2021-07-22 v1

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 (j,k)(j,k)-dominating function on graph XX as a function f:V(X){0,,j}f:V(X)\rightarrow \{0,\ldots,j\} so that for each vV(X)v\in V(X), f(N[v])kf(N[v])\geq k, where N[v]N[v] is the closed neighbourhood of vv. 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 XX is an rr-regular graph on nn vertices that has an efficient (1,k)(1,k)-dominating function, then the size of the corresponding dominating set divides nkn\cdot k. The Hamming graph H(q,d)H(q,d) is the graph on the vectors Zqd\mathbb{Z}_q^d where two vectors are adjacent if and only if they are at Hamming distance 11. We show that if qq is prime, then the previous necessary condition is sufficient for H(q,d)H(q,d) to have an efficient (1,k)(1,k)-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 H(q,d)H(q,d) when qq is a prime power but not prime.

Keywords

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

R2 v1 2026-06-24T04:22:42.693Z