A short proof of a lower bound for Tur\'an numbers

Abstract

Let F be a strictly balanced r-uniform hypergraph with e>2 edges and r-density m. We give a new short proof of the fact that the Tur\'an number (n, F) is greater than c\, nr-1/m ( n)1/(e-1) where c depends only on F. The previous proof of this for r=2 by Bohman and Keevash and for r 3 by Bennett and Bohman used a random greedy process and its analysis using the differential equations method. Our proof uses elementary probabilistic arguments together with a (nontrivial) classical result about independent sets in hypergraphs.