New bounds for a hypergraph Bipartite Tur\'an problem

Abstract

Let t be an integer such that t≥ 2. Let K2,t(3) denote the triple system consisting of the 2t triples \a,xi,yi\, \b,xi,yi\ for 1 i t, where the elements a, b, x1, x2, …, xt, y1, y2, …, yt are all distinct. Let ex(n,K2,t(3)) denote the maximum size of a triple system on n elements that does not contain K2,t(3). This function was studied by Mubayi and Verstra\"ete, where the special case t=2 was a problem of Erdos that was studied by various authors. Mubayi and Verstra\"ete proved that ex(n,K2,t(3))<t4n2 and that for infinitely many n, ex(n,K2,t(3))≥ 2t-13 n2. These bounds together with a standard argument show that g(t):=n ∞ ex(n,K2,t(3))/n2 exists and that \[2t-13≤ g(t)≤ t4.\] Addressing the question of Mubayi and Verstra\"ete on the growth rate of g(t), we prove that as t ∞, \[g(t) = (t1+o(1)).\]