Some Results on [1, k]-sets of Lexicographic Products of Graphs

Abstract

A subset S ⊂eq V in a graph G = (V,E) is called a [1, k]-set, if for every vertex v ∈ V S, 1 ≤ | NG(v) S | ≤ k. The [1,k]-domination number of G, denoted by γ[1, k](G) is the size of the smallest [1,k]-sets of G. A set S'⊂eq V(G) is called a total [1,k]-set, if for every vertex v ∈ V, 1 ≤ | NG(v) S | ≤ k. If a graph G has at least one total [1, k]-set then the cardinality of the smallest such set is denoted by γt[1, k](G). We consider [1, k]-sets that are also independent. Note that not every graph has an independent [1, k]-set. For graphs having an independent [1, k]-set, we define [1, k]-independence numbers which is denoted by γi[1, k](G). In this paper, we investigate the existence of [1,k]-sets in lexicographic products G H. Furthermore, we completely characterize graphs which their lexicographic product has at least one total [1,k]-set. Also, we determine γ[1, k](G H), γt[1, k](G H) and γi[1, k](G H). Finally, we show that finding smallest total [1, k]-set is NP-complete.