Linear three-uniform hypergraphs with no Berge path of given length
Abstract
Extensions of Erdos-Gallai Theorem for general hypergraphs are well studied. In this work, we prove the extension of Erdos-Gallai Theorem for linear hypergraphs. In particular, we show that the number of hyperedges in an n-vertex 3-uniform linear hypergraph, without a Berge path of length k as a subgraph is at most (k-1)6n for k≥ 4.
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