Vertex Tur\'an problems in the hypercube

TL;DR

None

Contribution

None

Abstract

Let $\mathcal{Q}_n$ be the $n$-dimensional hypercube: the graph with vertex set $\{0,1\}^n$ and edges between vertices that differ in exactly one coordinate. For $1\leq d\leq n$ and $F\subseteq \{0,1\}^d$ we say that $S\subseteq \{0,1\}^n$ is \emph{$F$-free} if every embedding $i:\{0,1\}^d\to \{0,1\}^n$ satisfies $i(F)\not\subseteq S$. We consider the question of how large $S\subseteq \{0,1\}^n$ can be if it is $F$-free. In particular we generalise the main prior result in this area, for $F=\{0,1\}^2$, due to E.A. Kostochka and prove a local stability result for the structure of near-extremal sets. We also show that the density required to guarantee an embedded copy of at least one of a family of forbidden configurations may be significantly lower than that required to ensure an embedded copy of any individual member of the family. Finally we show that any subset of the $n$-dimensional hypercube of positive density will contain exponentially many points from some embedded $d$-dimensional subcube if $n$ is sufficiently large.