First order distinguishability of sparse random graphs
Abstract
We study the problem of distinguishing between two independent samples of a binomial random graph by first order (FO) sentences. Shelah and Spencer proved that, for a constant , obeys FO zero-one law if and only if is irrational. Therefore, for irrational , any fixed FO sentence does not distinguish between with asymptotical probability 1 (w.h.p.) as . We show that the minimum quantifier depth of a FO sentence distinguishing between depends on how closely can be approximated by rationals: (1) for all non-Liouville , w.h.p.; (2) there are irrational with that grow arbitrarily slowly w.h.p.; (3) for all . The main ingredients in our proofs are a novel randomized algorithm that generates asymmetric strictly balanced graphs as well as a new method to study symmetry groups of randomly perturbed graphs.
Keywords
Cite
@article{arxiv.2405.09146,
title = {First order distinguishability of sparse random graphs},
author = {Tal Hershko and Maksim Zhukovskii},
journal= {arXiv preprint arXiv:2405.09146},
year = {2024}
}