Bounds for Hypergraph Universality

Abstract

A graph is said to be universal for a class of graphs H if contains a copy of every H ∈ H as a subgraph. The number of edges required for a host graph to be universal for the class of D-degenerate graphs on n vertices has been shown to be O(n2-1/D( n)2/D( n)5). We generalise this result to r-uniform hypergraphs, showing the following. Given D, r 2 and n sufficiently large, there exists a constant C = C(D, r) such that there exists a graph with at most \[Cnr-1/D( n)2/D( n)2r+1\] edges which is universal for the class of D-degenerate r-uniform hypergraphs on n vertices. This is tight up to the polylogarithmic term.

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