Author:
Im Seonghyuk,Kim Jaehoon,Lee Joonkyung,Methuku Abhishek
Abstract
Abstract
Hypertrees are linear hypergraphs where every two vertices are connected by a unique path. Elliott and Rödl conjectured that for any given
$\mu>0$
, there exists
$n_0$
such that the following holds. Every n-vertex Steiner triple system contains all hypertrees with at most
$(1-\mu )n$
vertices whenever
$n\geq n_0$
. We prove this conjecture.
Publisher
Cambridge University Press (CUP)