On r-wise t-intersecting uniform families

Abstract

We consider families, F of k-subsets of an n-set. For integers r≥ 2, t≥ 1, F is called r-wise t-intersecting if any r of its members have at least t elements in common. The most natural construction of such a family is the full t-star, consisting of all k-sets containing a fixed t-set. In the case r=2 the Exact Erdos-Ko-Rado Theorem shows that the full t-star is largest if n≥ (t+1)(k-t+1). In the present paper, we prove that for n≥ (2.5t)1/(r-1)(k-t)+k, the full t-star is largest in case of r≥ 3. Examples show that the exponent 1r-1 is best possible. This represents a considerable improvement on a recent result of Balogh and Linz.