Codegree Tur\'an density of complete r-uniform hypergraphs

Abstract

Let r 3. Given an r-graph H, the minimum codegree δr-1(H) is the largest integer t such that every (r-1)-subset of V(H) is contained in at least t edges of H. Given an r-graph F, the codegree Tur\'an density γ(F) is the smallest γ >0 such that every r-graph on n vertices with δr-1(H) (γ + o(1))n contains F as a subhypergraph. Using results on the independence number of hypergraphs, we show that there are constants c1, c2>0 depending only on r such that \[ 1 - c2 ttr-1 γ(Ktr) 1 - c1 ttr-1, \] where Ktr is the complete r-graph on t vertices. This gives the best general bounds for γ(Ktr).