A lower bound on the acyclic matching number of subcubic graphs
Abstract
The acyclic matching number of a graph G is the largest size of an acyclic matching in G, that is, a matching M in G such that the subgraph of G induced by the vertices incident to an edge in M is a forest. We show that the acyclic matching number of a connected subcubic graph G with m edges is at least m/6 except for two small exceptions.
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