Algorithm for finding vertex-edge domination number on graphs with bounded treewidth and related problems on planar graphs

Abstract

Given a graph G=(V,E), a vertex u ∈ V ve-dominates all edges incident to any vertex of NG[u]. A set S ⊂eq V is a ve-dominating set if for all edges e∈ E, there exists a vertex u∈ S such that u ve-dominates e. The minimum cardinality among all ve-dominating sets is known as the vertex-edge domination number (or simply ve-domination number) and denoted by γve(G). Finding a minimum ve-dominating set was proved to be NP-complete. Restricted to trees, the problem admits a linear-time algorithm. Treewidth is a commonly used parameter for solving NP-hard problems. In this paper, we present a polynomial-time algorithm for finding a minimum ve-dominating set on graphs with bounded treewidth. Moreover, we show that the treewidth of a planar graph G with ve-domination number γve(G) is O(γve(G)) and present an O(ck|V(G)|)-time algorithm for the k-ve-domination problem on planar graphs.