Abstract
An induced matching in a graph is a set of edges whose endpoints induce a \(1\)-regular subgraph. It is known that every \(n\)-vertex graph has at most \(10^{n/5}\approx 1.5849^n\) maximal induced matchings, and this bound is best possible. We prove that every \(n\)-vertex triangle-free graph has at most \(3^{n/3}\approx 1.4423^n\) maximal induced matchings, and this bound is attained by every disjoint union of copies of the complete bipartite graph \(K_{3,3}\). Our result implies that all maximal induced matchings in an \(n\)-vertex triangle-free graph can be listed in time \(O(1.4423^n)\), yielding the fastest known algorithm for finding a maximum induced matching in a triangle-free graph.
This work is supported by the Research Council of Norway (project SCOPE, 197548/F20), and by the European Research Council under the European Union’s Seventh Framework Programme (FP/2007–2013)/ERC Grant Agreement no. 267959.
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Notes
- 1.
We use the \(O^*\)-notation to suppress polynomial factors, i.e., we write \(O^*(f(n))\) instead of \(O(f(n)\cdot n^{O(1)})\) for any function \(f\).
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Basavaraju, M., Heggernes, P., van ’t Hof, P., Saei, R., Villanger, Y. (2014). Maximal Induced Matchings in Triangle-Free Graphs. In: Kratsch, D., Todinca, I. (eds) Graph-Theoretic Concepts in Computer Science. WG 2014. Lecture Notes in Computer Science, vol 8747. Springer, Cham. https://doi.org/10.1007/978-3-319-12340-0_8
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DOI: https://doi.org/10.1007/978-3-319-12340-0_8
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