English

k-Tuple Restrained Domination in Graphs

Combinatorics 2018-08-14 v2

Abstract

For k1k \ge 1 an integer, a set SS of vertices in a graph GG with minimum degree at least~k1k-1 is a kk-tuple dominating set of GG if every vertex of SS is adjacent to at least k1k-1 vertices in SS and every vertex of V(G)SV(G) \setminus S is adjacent to at least kk vertices in SS; that is, NG[v]Sk|N_G[v] \cap S| \ge k for every vertex vv of GG where NG[v]N_G[v] denotes the closed neighborhood of vv which consists of vv and all neighbors of vv. A kk-tuple restrained dominating set of GG is a kk-tuple dominating set SS of GG with the additional property that every vertex outside SS has at least kk neighbors outside SS. The minimum cardinality of a kk-tuple restrained dominating set of GG is the kk-tuple restrained domination number of GG. When k=1k=1, the kk-tuple restrained domination number is the well-studied restrained domination number. In this paper, we determine the kk-tuple restrained domination number of several classes of graphs. Tight upper bounds on the kk-tuple restrained domination number of a general graph are established. We present basic properties of the kk-tuple restrained domatic number of a graph which is the maximum number of the classes of a partition of V(G)V(G) into kk-tuple restrained dominating sets of GG.

Keywords

Cite

@article{arxiv.1603.02433,
  title  = {k-Tuple Restrained Domination in Graphs},
  author = {M. A. Henning and Adel P. Kazemi},
  journal= {arXiv preprint arXiv:1603.02433},
  year   = {2018}
}
R2 v1 2026-06-22T13:06:07.946Z