Fast algorithms for min independent dominating set
Abstract
We first devise a branching algorithm that computes a minimum independent dominating set on any graph with running time O*(20.424n) and polynomial space. This improves the O*(20.441n) result by (S. Gaspers and M. Liedloff, A branch-and-reduce algorithm for finding a minimum independent dominating set in graphs, Proc. WG'06). We then show that, for every r>3, it is possible to compute an r-((r-1)/r)log2(r)-approximate solution for min independent dominating set within time O*(2(nlog2(r)/r)).
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