Tur\' an number for bushes

Abstract

Let a,b ∈ Z+, r=a + b, and let T be a tree with parts U = \u1,u2,…,us\ and V = \v1,v2,…,vt\. Let U1, … ,Us and V1, …, Vt be disjoint sets, such that |Ui|=a and |Vj|=b for all i,j. The (a,b)-blowup of T is the r-uniform hypergraph with edge set \Ui Vj : uivj ∈ E(T)\. We use the -systems method to prove the following Tur\' an-type result. Suppose a,b,s ∈ Z+, r=a+b≥ 3, a≥ 2, and T is a fixed tree of diameter 4 in which the degree of the center vertex is s . Then there exists a C=C(r,s ,T)>0 such that |H|≤ (s -1)n r-1 +Cnr-2 for every n-vertex r-uniform hypergraph H not containing an (a,b)-blowup of T. This is asymptotically exact when s ≤ |V(T)|/2. A stability result is also presented.