Counting Hypergraphs with Large Girth

Abstract

Morris and Saxton used the method of containers to bound the number of n-vertex graphs with m edges containing no -cycles, and hence graphs of girth more than . We consider a generalization to r-uniform hypergraphs. The girth of a hypergraph H is the minimum such that for some F ⊂eq H, there exists a bijection φ : E(C) E(F) with e⊂eq φ(e) for all e∈ E(C). Letting Nmr(n,) denote the number of n-vertex r-uniform hypergraphs with m edges and girth larger than and defining λ = (r - 2)/( - 2), we show \[ Nmr(n,) ≤ Nm2(n,)r - 1 + λ\] which is tight when - 2 divides r - 2 up to a 1 + o(1) term in the exponent. This result is used to address the extremal problem for subgraphs of girth more than in random r-uniform hypergraphs.