A tree version of Konig's theorem
classification
🧮 math.CO
keywords
theoremgraphkonignumbertreeauthorbipartitecovering
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Konig's theorem states that the covering number and the matching number of a bipartite graph are equal. We prove a generalisation of this result, in which each point in one side of the graph is replaced by a subtree of a given tree. The proof uses a recent extension of Hall's theorem to families of hypergraphs, by the first author and P. Haxell.
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