Hypergraphs not containing a tight tree with a bounded trunk ~II: 3-trees with a trunk of size 2

Abstract

A tight r-tree T is an r-uniform hypergraph that has an edge-ordering e1, e2, …, et such that for each i≥ 2, ei has a vertex vi that does not belong to any previous edge and ei-vi is contained in ej for some j<i. Kalai conjectured in 1984 that every n-vertex r-uniform hypergraph with more than t-1rnr-1 edges contains every tight r-tree T with t edges. A trunk T' of a tight r-tree T is a tight subtree T' of T such that vertices in V(T) V(T') are leaves in T. Kalai's Conjecture was proved in 1987 for tight r-trees that have a trunk of size one. In a previous paper we proved an asymptotic version of Kalai's Conjecture for all tight r-trees that have a trunk of bounded size. In this paper we continue that work to establish the exact form of Kalai's Conjecture for all tight 3-trees with at least 20 edges that have a trunk of size two.