Author:
Han Jie,Hu Jie,Ping Lidan,Wang Guanghui,Wang Yi,Yang Donglei
Abstract
Abstract
We show that for any
$\varepsilon \gt 0$
and
$\Delta \in \mathbb{N}$
, there exists
$\alpha \gt 0$
such that for sufficiently large
$n$
, every
$n$
-vertex graph
$G$
satisfying that
$\delta (G)\geq \varepsilon n$
and
$e(X, Y)\gt 0$
for every pair of disjoint vertex sets
$X, Y\subseteq V(G)$
of size
$\alpha n$
contains all spanning trees with maximum degree at most
$\Delta$
. This strengthens a result of Böttcher, Han, Kohayakawa, Montgomery, Parczyk, and Person.
Publisher
Cambridge University Press (CUP)
Subject
Applied Mathematics,Computational Theory and Mathematics,Statistics and Probability,Theoretical Computer Science