A counterexample to the DeMarco-Kahn Upper Tail Conjecture
Probability
2019-12-09 v2 Combinatorics
Abstract
Given a fixed graph H, what is the (exponentially small) probability that the number X_H of copies of H in the binomial random graph G_{n,p} is at least twice its mean? Studied intensively since the mid 1990s, this so-called infamous upper tail problem remains a challenging testbed for concentration inequalities. In 2011 DeMarco and Kahn formulated an intriguing conjecture about the exponential rate of decay of \Pr(X_H \ge (1+\epsilon) \E X_H) for fixed \epsilon>0. We show that this upper tail conjecture is false, by exhibiting an infinite family of graphs violating the conjectured bound.
Keywords
Cite
@article{arxiv.1809.09595,
title = {A counterexample to the DeMarco-Kahn Upper Tail Conjecture},
author = {Matas Šileikis and Lutz Warnke},
journal= {arXiv preprint arXiv:1809.09595},
year = {2019}
}
Comments
15 pages; minor edits; to appear in Random Structures and Algorithms (RSA)