The extremal number of tight cycles

Abstract

A tight cycle in an r-uniform hypergraph H is a sequence of ≥ r+1 vertices x1,…,x such that all r-tuples \xi,xi+1,…,xi+r-1\ (with subscripts modulo ) are edges of H. An old problem of V. S\'os, also posed independently by J. Verstra\"ete, asks for the maximum number of edges in an r-uniform hypergraph on n vertices which has no tight cycle. Although this is a very basic question, until recently, no good upper bounds were known for this problem for r≥ 3. Here we prove that the answer is at most nr-1+o(1), which is tight up to the o(1) error term. Our proof is based on finding robust expanders in the line graph of H together with certain density increment type arguments.