English

The C_\ell-free process

Combinatorics 2017-12-12 v2 Probability

Abstract

The C_\ell-free process starts with the empty graph on n vertices and adds edges chosen uniformly at random, one at a time, subject to the condition that no copy of C_\ell is created. For every 4\ell \geq 4 we show that, with high probability as nn \to \infty, the maximum degree is O((nlogn)1/(1))O((n \log n)^{1/(\ell-1)}), which confirms a conjecture of Bohman and Keevash and improves on bounds of Osthus and Taraz. Combined with previous results this implies that the C_\ell-free process typically terminates with Θ(n/(1)(logn)1/(1))\Theta(n^{\ell/(\ell-1)}(\log n)^{1/(\ell-1)}) edges, which answers a question of Erd\H{o}s, Suen and Winkler. This is the first result that determines the final number of edges of the more general H-free process for a non-trivial \emph{class} of graphs H. We also verify a conjecture of Osthus and Taraz concerning the average degree, and obtain a new lower bound on the independence number. Our proof combines the differential equation method with a tool that might be of independent interest: we establish a rigorous way to `transfer' certain decreasing properties from the binomial random graph to the H-free process.

Keywords

Cite

@article{arxiv.1101.0693,
  title  = {The C_\ell-free process},
  author = {Lutz Warnke},
  journal= {arXiv preprint arXiv:1101.0693},
  year   = {2017}
}

Comments

34 pages, 5 figures. Minor revisions and additions

R2 v1 2026-06-21T17:07:14.666Z