Typical $T$-free graphs
Combinatorics
2025-06-03 v1
Abstract
We prove that for every tree which is not an edge, for almost every graph which does not contain as an induced subgraph, has a partition into parts certifying this fact. Each part induces a graph which is -free and has further properties which depend on . As a consequence we obtain good bounds (often tight up to a constant factor) on the number of -free graphs and show in a follow-up paper~\cite{RY} that almost every -free graph has chromatic number equal to the size of its largest clique.
Cite
@article{arxiv.2506.01067,
title = {Typical $T$-free graphs},
author = {Bruce Reed and Yelena Yuditsky},
journal= {arXiv preprint arXiv:2506.01067},
year = {2025}
}