Loose paths in random ordered hypergraphs

Abstract

We consider the length of ordered loose paths in the random r-uniform hypergraph H=H(r)(n, p). A ordered loose path is a sequence of edges E1,E2,…,E where \j∈ Ei\=\j∈ Ei+1\ for 1≤ i<. We establish fairly tight bounds on the length of the longest ordered loose path in H that hold with high probability.

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