Abstract

For a positive integer k, a k-dominating set of a graph G is a subset D⊆V(G) such that every vertex not in D is adjacent to at least k vertices in D. The k-domination problem is to determine a minimum k-dominating set of G. This paper studies the k-domination problem in graphs from an algorithmic point of view. In particular, we present a linear-time algorithm for the k-domination problem for graphs in which each block is a clique, a cycle or a complete bipartite graph. This class of graphs includes trees, block graphs, cacti and block-cactus graphs. We also establish NP-completeness of the k-domination problem in split graphs.

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