Published online by Cambridge University Press: 02 September 2021
Given a hereditary property of graphs $\mathcal{H}$ and a $p\in [0,1]$ , the edit distance function $\textrm{ed}_{\mathcal{H}}(p)$ is asymptotically the maximum proportion of edge additions plus edge deletions applied to a graph of edge density p sufficient to ensure that the resulting graph satisfies $\mathcal{H}$ . The edit distance function is directly related to other well-studied quantities such as the speed function for $\mathcal{H}$ and the $\mathcal{H}$ -chromatic number of a random graph.
Let
$\mathcal{H}$
be the property of forbidding an Erdős–Rényi random graph
$F\sim \mathbb{G}(n_0,p_0)$
, and let
$\varphi$
represent the golden ratio. In this paper, we show that if
$p_0\in [1-1/\varphi,1/\varphi]$
, then a.a.s. as
$n_0\to\infty$
,
A primary tool in the proof is the categorization of p-core coloured regularity graphs in the range $p\in[1-1/\varphi,1/\varphi]$ . Such coloured regularity graphs must have the property that the non-grey edges form vertex-disjoint cliques.
Both authors’ research was partially supported by NSF award DMS-1839918 (RTG). Martin’s was partially supported by Simons Foundation Collaboration Grant #353292.