(1,j)-set problem in graphs

Abstract

A subset D ⊂eq V of a graph G = (V, E) is a (1, j)-set if every vertex v ∈ V D is adjacent to at least 1 but not more than j vertices in D. The cardinality of a minimum (1, j)-set of G, denoted as γ(1,j) (G), is called the (1, j)-domination number of G. Given a graph G = (V, E) and an integer k, the decision version of the (1, j)-set problem is to decide whether G has a (1, j)-set of cardinality at most k. In this paper, we first obtain an upper bound on γ(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)- set problem is NP-complete for chordal graphs. Finally, we design two algorithms for finding γ(1,j) (G) of a tree and a split graph, for any fixed j, which answers an open question posed in [CHHM13].