On the (6,4)-problem of Brown, Erdos and S\'os

Abstract

Let f(r)(n;s,k) be the maximum number of edges of an r-uniform hypergraph on n vertices not containing a subgraph with k edges and at most s vertices. In 1973, Brown, Erdos and S\'os conjectured that the limit n ∞ n-2 f(3)(n;k+2,k) exists for all k and confirmed it for k=2. Recently, Glock showed this for k=3. We settle the next open case, k=4, by showing that f(3)(n;6,4)=(736+o(1))n2 as n∞. More generally, for all k∈ \3,4\, r 3 and t∈ [2,r-1], we compute the value of the limit n ∞ n-tf(r)(n;k(r-t)+t,k), which settles a problem of Shangguan and Tamo.