On the Matching Problem in Random Hypergraphs

Abstract

We study a variant of the Erdos Matching Problem in random hypergraphs. Let Kp(n,k) denote the Erdos-R\'enyi random k-uniform hypergraph on n vertices where each possible edge is included with probability p. We show that when n k2s and p is not too small, with high probability, the maximum number of edges in a sub-hypergraph of Kp(n,k) with matching number s is obtained by the trivial sub-hypergraphs, i.e. the sub-hypergraph consisting of all edges containing at least one vertex in a fixed set of s vertices.

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