English

$(1,j)$-set problem in graphs

Discrete Mathematics 2014-10-14 v1 Combinatorics

Abstract

A subset DVD \subseteq V of a graph G=(V,E)G = (V, E) is a (1,j)(1, j)-set if every vertex vVDv \in V \setminus D is adjacent to at least 11 but not more than jj vertices in D. The cardinality of a minimum (1,j)(1, j)-set of GG, denoted as γ(1,j)(G)\gamma_{(1,j)} (G), is called the (1,j)(1, j)-domination number of GG. Given a graph G=(V,E)G = (V, E) and an integer kk, the decision version of the (1,j)(1, j)-set problem is to decide whether GG has a (1,j)(1, j)-set of cardinality at most kk. In this paper, we first obtain an upper bound on γ(1,j)(G)\gamma_{(1,j)} (G) using probabilistic methods, for bounded minimum and maximum degree graphs. Our bound is constructive, by the randomized algorithm of Moser and Tardos [MT10], We also show that the (1,j)(1, j)- set problem is NP-complete for chordal graphs. Finally, we design two algorithms for finding γ(1,j)(G)\gamma_{(1,j)} (G) of a tree and a split graph, for any fixed jj, which answers an open question posed in [CHHM13].

Keywords

Cite

@article{arxiv.1410.3091,
  title  = {$(1,j)$-set problem in graphs},
  author = {Arijit Bishnu and Kunal Dutta and Arijit Ghosh and Subhabrata Paul},
  journal= {arXiv preprint arXiv:1410.3091},
  year   = {2014}
}
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