The Parameterized Complexity of the Equidomination Problem

Abstract

A graph G=(V,E) is called equidominating if there exists a value t ∈ N and a weight function ω : V → N such that the total weight of a subset D⊂eq V is equal to t if and only if D is a minimal dominating set. To decide whether or not a given graph is equidominating is referred to as the Equidomination problem. In this paper we show that two parameterized versions of the Equidomination problem are fixed-parameter tractable: the first parameterization considers the target value t leading to the Target-t Equidomination problem. The second parameterization allows only weights up to a value k, which yields the k-Equidomination problem. In addition, we characterize the graphs whose every induced subgraph is equidominating. We give a finite forbidden induced subgraph characterization and derive a fast recognition algorithm.