English

Triangle-free Subgraphs at the Triangle-Free Process

Combinatorics 2009-07-06 v5

Abstract

We consider the triangle-free process: given an integer n, start by taking a uniformly random ordering of the edges of the complete n-vertex graph K_n. Then, traverse the ordered edges and add each traversed edge to an (initially empty) evolving graph - unless its addition creates a triangle. We study the evolving graph at around the time where \Theta(n^{3/2 + \epsilon}) edges have been traversed for any fixed \epsilon \in (0,10^{-10}). At that time and for any fixed triangle-free graph F, we give an asymptotically tight estimation of the expected number of copies of F in the evolving graph. For F that is balanced and have density smaller than 2 (e.g., for F that is a cycle of length at least 4), our argument also gives a tight concentration result for the number of copies of F in the evolving graph. Our analysis combines Spencer's original branching process approach for analysing the triangle-free process and the semi-random method.

Keywords

Cite

@article{arxiv.0903.1756,
  title  = {Triangle-free Subgraphs at the Triangle-Free Process},
  author = {Guy Wolfovitz},
  journal= {arXiv preprint arXiv:0903.1756},
  year   = {2009}
}

Comments

26 pages. Title change from "4-Cycles at the Triangle-Free Process". Results generalized. Other revisions

R2 v1 2026-06-21T12:20:17.167Z