On r-uniform hypergraphs with circumference less than r

Abstract

We show that for each k≥ 4 and n>r≥ k+1, every n-vertex r-uniform hypergraph with no Berge cycle of length at least k has at most (k-1)(n-1)r edges. The bound is exact, and we describe the extremal hypergraphs. This implies and slightly refines the theorem of Gyori, Katona and Lemons that for n>r≥ k≥ 3, every n-vertex r-uniform hypergraph with no Berge path of length k has at most (k-1)nr+1 edges. To obtain the bounds, we study bipartite graphs with no cycles of length at least 2k, and then translate the results into the language of multi-hypergraphs.