Sharp bounds for uniform union-free hypergraphs

Abstract

An r-uniform hypergraph is called t-union-free if any two distinct subsets of at most t edges have distinct union. The study of union-free hypergraphs has multiple origins and a long history, dating back to the works of Kautz and Singleton (1964) in coding theory, Bollobás and Erdős (1976) in combinatorics, and Hwang and Sós (1987) in group testing. Let Ut(n,r) denote the maximum number of edges in an n-vertex t-union-free r-uniform hypergraph. In this paper, we determine the asymptotic behavior of Ut(n,r), up to a lower order term, for almost all t 3 and r 3. This significantly advances the understanding of this extremal function, as previously, only the asymptotics of U2(n,3) and U2(n,4) were known. As a key ingredient of our proof, we establish the existence of near-optimal locally sparse induced hypergraph packings, which is of independent interest.