Extremal problems for hypergraph blowups of trees

Abstract

In this paper we present a novel approach in extremal set theory which may be viewed as an asymmetric version of Katona's permutation method. We use it to find more Tur\'an numbers of hypergraphs in the Erdos--Ko--Rado range. An (a,b)-path P of length 2k-1 consists of 2k-1 sets of size r=a+b as follows. Take k pairwise disjoint a-element sets A0, A2, …, A2k-2 and other k pairwise disjoint b-element sets B1, B3, …, B2k-1 and order them linearly as A0, B1, A2, B3, A4…. Define the (hyper)edges of P2k-1(a,b) as the sets of the form Ai Bi+1 and Bj Aj+1. The members of P can be represented as r-element intervals of the ak+bk element underlying set. Our main result is about hypergraphs that are blowups of trees, and implies that for fixed k,a,b, as n ∞ \[ exr(n,P2k-1(a,b)) = (k - 1)n r - 1 + o(nr - 1).\] This generalizes the Erdos--Gallai theorem for graphs which is the case of a=b=1. We also determine the asymptotics when a+b is even; the remaining cases are still open.