Linear kernels for k-tuple and liar's domination in bounded genus graphs

Abstract

A set D⊂eq V is called a k-tuple dominating set of a graph G=(V,E) if | NG[v] D | ≥ k for all v ∈ V, where NG[v] denotes the closed neighborhood of v. A set D ⊂eq V is called a liar's dominating set of a graph G=(V,E) if (i) | NG[v] D | ≥ 2 for all v∈ V and (ii) for every pair of distinct vertices u, v∈ V, | (NG[u] NG[v]) D | ≥ 3. Given a graph G, the decision versions of k-Tuple Domination Problem and the Liar's Domination Problem are to check whether there exists a k-tuple dominating set and a liar's dominating set of G of a given cardinality, respectively. These two problems are known to be NP-complete LiaoChang2003, Slater2009. In this paper, we study the parameterized complexity of these problems. We show that the k-Tuple Domination Problem and the Liar's Domination Problem are W[2]-hard for general graphs but they admit linear kernels for graphs with bounded genus.