W[1]-hardness of Outer Connected Dominating set in d-degenerate Graphs

Abstract

A set D ⊂eq V of a graph G = (V,E) is called an outer-connected dominating set of G if every vertex v not in D is adjacent to at least one vertex in D, and the induced subgraph of G on V D is connected. The Minimum Outer-connected Domination problem is to find an outer-connected dominating set of minimum cardinality for the input graph G. Given a positive integer k and a graph G = (V, E), the Outer-connected Domination Decision problem is to decide whether G has an outer-connected dominating set of cardinality at most k. The Outer-connected Domination Decision problem is known to be NP-complete, even for bipartite graphs. We study the problem of outer-connected domination on sparse graphs from the perspective of parameterized complexity and show that it is W[1]-hard on d-degenerate graphs, while the original connected dominating set has FTP algorithm on d-degenerate graphs.