Codegree Turán Density of Complete $r$-Uniform Hypergraphs

Abstract

Let $r\ge 3$. Given an $r$-graph $H$, the minimum codegree $\delta_{r-1}(H)$ 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 Turán density $\gamma(F)$ is the smallest $\gamma >0$ such that every $r$-graph on $n$ vertices with $\delta_{r-1}(H)\ge (\gamma + o(1))n$ contains $F$ as a subhypergraph. Using results on the independence number of hypergraphs, we show that there are constants $c_1, c_2>0$ depending only on $r$ such that $1 - c_2 \tfrac{\ln t}{t^{r-1}} \le \gamma(K_t^r) \le 1 - c_1 \tfrac{\ln t}{t^{r-1}},$ where $K_t^r$ is the complete $r$-graph on $t$ vertices. This gives the best general bounds for $\gamma(K_t^r)$.