Optimal Locating-Paired-Dominating Sets in King Grids

Abstract

In this paper, we continue the study of locating-paired-dominating set, abbreviated LPDS, in graphs introduced by McCoy and Henning. Given a finite or infinite graph G=(V,E), a set S⊂ V is paired-dominating if the induced subgraph G[S] has a perfect matching and every vertex in V is adjacent to a vertex in S. The other condition for LPDS requires that for any distinct vertices u,v ∈ V S, we have N(u) S≠ N(v) S. Motivated by the conjecture of Kinawi, Hussain and Niepel, we prove the minimal density of LPDS in the king grid is between 8/37 and 2/9, and we find uncountable many different LPDS with density 2/9 in the king grid. These results partially solve their conjecture.