Complexity of Paired Domination Problems on Circle and k-Polygon Graphs

Abstract

A set D ⊂eq V is a dominating set of a graph G if every vertex in V - D is adjacent to at least one vertex in D. A dominating set D is a paired-dominating set if the subgraph of G induced by D contains a perfect matching. In this paper, we prove that determining the minimum paired-dominating set in circle graphs is NP-complete. We further present an O(n(nk2-k)2k2-2k)-time algorithm for finding the minimum paired-dominating set in k-polygon graphs, a subclass of circle graphs. Additionally, we refine the existing algorithm of Elmallah and Stewart for computing the minimum dominating set in k-polygon graphs, reducing its time complexity from O(n4k2+3) to O(n3k-5), and further extend it to find the minimum total dominating set.

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