Hypergraphs not containing a tight tree with a bounded trunk
Abstract
An -uniform hypergraph is a tight -tree if its edges can be ordered so that every edge contains a vertex that does not belong to any preceding edge and the set lies in some preceding edge. A conjecture of Kalai [Kalai], generalizing the Erd\H{o}s-S\'os Conjecture for trees, asserts that if is a tight -tree with edges and is an -vertex -uniform hypergraph containing no copy of then has at most edges. A trunk of a tight -tree is a tight subtree such that every edge of has vertices in some edge of and a vertex outside . For , the only nontrivial family of tight -trees for which this conjecture has been proved is the family of -trees with trunk size one in [FF] from 1987. Our main result is an asymptotic version of Kalai's conjecture for all tight trees of bounded trunk size. This follows from our upper bound on the size of a -free -uniform hypergraph in terms of the size of its shadow. We also give a short proof of Kalai's conjecture for tight -trees with at most four edges. In particular, for -uniform hypergraphs, our result on the tight path of length implies the intersection shadow theorem of Katona [Katona].
Cite
@article{arxiv.1712.04081,
title = {Hypergraphs not containing a tight tree with a bounded trunk},
author = {Zoltán Füredi and Tao Jiang and Alexandr Kostochka and Dhruv Mubayi and Jacques Verstraëte},
journal= {arXiv preprint arXiv:1712.04081},
year = {2017}
}
Comments
14 pages