Two Greedy Consequences for Maximum Induced Matchings
Abstract
We prove that, for every integer d with d≥ 3, there is an approximation algorithm for the maximum induced matching problem restricted to \ C3,C5\-free d-regular graphs with performance ratio 0.7083d+0.425, which answers a question posed by Dabrowski et al. (Theor. Comput. Sci. 478 (2013) 33-40). Furthermore, we show that every graph with m edges that is k-degenerate and of maximum degree at most d with k<d, has an induced matching with at least m/((3k-1)d-k(k+1)+1) edges.
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