Lower tails for triangles inside the critical window
Abstract
We study the probability that the random graph is triangle-free. When or the asymptotics of the logarithm of this probability are known via Janson's inequality in the former case and via regularity or hypergraph container methods in the latter case. We prove for the first time an asymptotic formula for the logarithm of this probability when for a sufficiently small constant. More generally, we study lower-tail large deviations for triangles in random graphs: the probability that has at most times its expected number of triangles, when for and constant. Our results apply for all if and for small enough otherwise. For small (including the case of triangle-freeness), we prove that a phase transition occurs as varies, in the sense of a non-analyticity of the rate function, while for we prove that no phase transition occurs. On the other hand for the random graph , with , we show that a phase transition occurs in the lower-tail problem for triangles as varies for \emph{every} . Our method involves ingredients from algorithms and statistical physics including the cluster expansion and concentration inequalities for contractive Markov chains.
Keywords
Cite
@article{arxiv.2411.18563,
title = {Lower tails for triangles inside the critical window},
author = {Matthew Jenssen and Will Perkins and Aditya Potukuchi and Michael Simkin},
journal= {arXiv preprint arXiv:2411.18563},
year = {2024}
}